2020-03-31 15:35:03 +02:00
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#+PROPERTY: header-args :exports both :output-dir results :session xs :kernel python3
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2020-04-06 19:17:48 +02:00
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#+HTML_HEAD: <link rel="stylesheet" href="tufte.css" />
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#+OPTIONS: html-style:nil
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#+HTML_CONTAINER: section
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#+TITLE: Investigaton of Monte-Carlo Methods
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#+AUTHOR: Valentin Boettcher
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2020-03-27 15:43:13 +01:00
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2020-03-27 13:39:00 +01:00
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* Init
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** Required Modules
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#+NAME: e988e3f2-ad1f-49a3-ad60-bedba3863283
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2020-03-31 15:35:03 +02:00
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#+begin_src jupyter-python :exports both :tangle tangled/xs.py
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2020-03-27 19:34:22 +01:00
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import numpy as np
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import matplotlib.pyplot as plt
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2020-03-31 15:19:51 +02:00
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import monte_carlo
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2020-03-27 19:34:22 +01:00
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#+end_src
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2020-03-27 13:39:00 +01:00
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#+RESULTS: e988e3f2-ad1f-49a3-ad60-bedba3863283
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** Utilities
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#+NAME: 53548778-a4c1-461a-9b1f-0f401df12b08
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2020-03-31 15:35:03 +02:00
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#+BEGIN_SRC jupyter-python :exports both
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2020-03-27 13:39:00 +01:00
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%run ../utility.py
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2020-03-30 19:19:48 +02:00
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%load_ext autoreload
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%aimport monte_carlo
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2020-03-31 15:19:51 +02:00
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%autoreload 1
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2020-03-27 13:39:00 +01:00
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#+END_SRC
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#+RESULTS: 53548778-a4c1-461a-9b1f-0f401df12b08
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2020-04-06 18:21:10 +02:00
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: The autoreload extension is already loaded. To reload it, use:
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: %reload_ext autoreload
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2020-03-27 13:39:00 +01:00
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2020-03-30 15:43:55 +02:00
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* Implementation
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2020-03-27 13:39:00 +01:00
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#+NAME: 777a013b-6c20-44bd-b58b-6a7690c21c0e
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2020-03-31 15:35:03 +02:00
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#+BEGIN_SRC jupyter-python :exports both :results raw drawer :exports code :tangle tangled/xs.py
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2020-03-27 13:39:00 +01:00
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"""
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Implementation of the analytical cross section for q q_bar ->
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gamma gamma
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Author: Valentin Boettcher <hiro@protagon.space>
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"""
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import numpy as np
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# NOTE: a more elegant solution would be a decorator
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def energy_factor(charge, esp):
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"""
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Calculates the factor common to all other values in this module
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Arguments:
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esp -- center of momentum energy in GeV
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charge -- charge of the particle in units of the elementary charge
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"""
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2020-04-01 15:03:38 +02:00
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return charge**4/(137.036*esp)**2/6
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2020-03-27 13:39:00 +01:00
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2020-03-28 11:43:21 +01:00
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def diff_xs(θ, charge, esp):
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2020-03-27 13:39:00 +01:00
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"""
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Calculates the differential cross section as a function of the
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2020-03-30 15:43:55 +02:00
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azimuth angle θ in units of 1/GeV².
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2020-03-27 13:39:00 +01:00
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2020-04-01 12:14:35 +02:00
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Here dΩ=sinθdθdφ
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2020-03-27 13:39:00 +01:00
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Arguments:
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2020-03-28 11:43:21 +01:00
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θ -- azimuth angle
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2020-03-27 13:39:00 +01:00
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esp -- center of momentum energy in GeV
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charge -- charge of the particle in units of the elementary charge
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"""
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f = energy_factor(charge, esp)
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2020-03-30 19:19:48 +02:00
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return f*((np.cos(θ)**2+1)/np.sin(θ)**2)
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2020-03-27 13:39:00 +01:00
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2020-03-30 19:56:02 +02:00
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def diff_xs_cosθ(cosθ, charge, esp):
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"""
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Calculates the differential cross section as a function of the
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cosine of the azimuth angle θ in units of 1/GeV².
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2020-04-01 12:14:35 +02:00
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Here dΩ=d(cosθ)dφ
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2020-03-30 19:56:02 +02:00
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Arguments:
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2020-03-30 20:26:10 +02:00
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cosθ -- cosine of the azimuth angle
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2020-03-30 19:56:02 +02:00
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esp -- center of momentum energy in GeV
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charge -- charge of the particle in units of the elementary charge
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"""
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f = energy_factor(charge, esp)
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return f*((cosθ**2+1)/(1-cosθ**2))
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2020-04-02 15:55:07 +02:00
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2020-03-28 11:53:45 +01:00
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def diff_xs_eta(η, charge, esp):
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2020-03-27 13:39:00 +01:00
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"""
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Calculates the differential cross section as a function of the
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pseudo rapidity of the photons in units of 1/GeV^2.
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2020-04-01 12:14:35 +02:00
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This is actually the crossection dσ/(dφdη).
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2020-03-30 20:26:10 +02:00
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Arguments:
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2020-04-01 12:14:35 +02:00
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η -- pseudo rapidity
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2020-03-30 20:26:10 +02:00
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esp -- center of momentum energy in GeV
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charge -- charge of the particle in units of the elementary charge
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"""
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f = energy_factor(charge, esp)
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2020-04-02 09:05:21 +02:00
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return f*(np.tanh(η)**2 + 1)
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2020-03-30 20:26:10 +02:00
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2020-04-02 15:55:07 +02:00
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def diff_xs_p_t(p_t, charge, esp):
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"""
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Calculates the differential cross section as a function of the
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transverse momentum (p_t) of the photons in units of 1/GeV^2.
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This is actually the crossection dσ/(dφdp_t).
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Arguments:
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p_t -- transverse momentum in GeV
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esp -- center of momentum energy in GeV
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charge -- charge of the particle in units of the elementary charge
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"""
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f = energy_factor(charge, esp)
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sqrt_fact = np.sqrt(1-(2*p_t/esp)**2)
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return f/p_t*(1/sqrt_fact + sqrt_fact)
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2020-03-28 11:53:45 +01:00
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def total_xs_eta(η, charge, esp):
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2020-03-27 13:39:00 +01:00
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"""
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Calculates the total cross section as a function of the pseudo
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rapidity of the photons in units of 1/GeV^2. If the rapditiy is
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specified as a tuple, it is interpreted as an interval. Otherwise
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2020-03-28 11:43:21 +01:00
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the interval [-η, η] will be used.
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2020-03-27 13:39:00 +01:00
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Arguments:
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2020-03-28 11:43:21 +01:00
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η -- pseudo rapidity (tuple or number)
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2020-03-27 13:39:00 +01:00
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esp -- center of momentum energy in GeV
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charge -- charge of the particle in units of the elementar charge
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"""
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f = energy_factor(charge, esp)
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2020-03-28 11:43:21 +01:00
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if not isinstance(η, tuple):
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η = (-η, η)
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2020-03-27 13:39:00 +01:00
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2020-03-28 11:43:21 +01:00
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if len(η) != 2:
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raise ValueError('Invalid η cut.')
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2020-03-27 13:39:00 +01:00
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def F(x):
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return np.tanh(x) - 2*x
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2020-03-28 11:43:21 +01:00
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return 2*np.pi*f*(F(η[0]) - F(η[1]))
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2020-03-27 13:39:00 +01:00
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#+END_SRC
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#+RESULTS: 777a013b-6c20-44bd-b58b-6a7690c21c0e
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* Calculations
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First, set up the input parameters.
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2020-03-31 15:35:03 +02:00
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#+BEGIN_SRC jupyter-python :exports both :results raw drawer
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2020-03-28 11:43:21 +01:00
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η = 2.5
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2020-03-27 13:39:00 +01:00
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charge = 1/3
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esp = 200 # GeV
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#+END_SRC
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2020-04-02 17:37:31 +02:00
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#+RESULTS:
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2020-03-31 16:40:10 +02:00
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2020-03-31 12:16:57 +02:00
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Set up the integration and plot intervals.
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2020-03-31 15:35:03 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer
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2020-03-31 12:16:57 +02:00
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interval_η = [-η, η]
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interval = η_to_θ([-η, η])
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interval_cosθ = np.cos(interval)
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2020-04-02 15:55:07 +02:00
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interval_pt = np.sort(η_to_pt([0, η], esp/2))
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2020-03-31 12:16:57 +02:00
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plot_interval = [0.1, np.pi-.1]
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#+end_src
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2020-03-31 15:19:51 +02:00
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#+RESULTS:
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2020-04-05 13:55:28 +02:00
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#+begin_note
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Note that we could utilize the symetry of the integrand throughout,
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but that doen't reduce variance and would complicate things now.
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#+end_note
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2020-04-05 12:30:38 +02:00
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** Analytical Integration
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And now calculate the cross section in picobarn.
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#+BEGIN_SRC jupyter-python :exports both :results raw file :file xs.tex
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xs_gev = total_xs_eta(η, charge, esp)
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xs_pb = gev_to_pb(xs_gev)
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tex_value(xs_pb, unit=r'\pico\barn', prefix=r'\sigma = ',
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prec=6, save=('results', 'xs.tex'))
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#+END_SRC
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2020-03-27 13:39:00 +01:00
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2020-04-05 12:30:38 +02:00
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#+RESULTS:
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: \(\sigma = \SI{0.053793}{\pico\barn}\)
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2020-03-27 14:30:55 +01:00
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2020-04-05 12:30:38 +02:00
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Lets plot the total xs as a function of η.
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#+begin_src jupyter-python :exports both :results raw drawer
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fig, ax = set_up_plot()
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η_s = np.linspace(0, 3, 1000)
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ax.plot(η_s, gev_to_pb(total_xs_eta(η_s, charge, esp)))
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ax.set_xlabel(r'$\eta$')
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ax.set_ylabel(r'$\sigma$ [pb]')
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ax.set_xlim([0, max(η_s)])
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ax.set_ylim(0)
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save_fig(fig, 'total_xs', 'xs', size=[2.5, 2])
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#+end_src
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2020-04-01 15:03:38 +02:00
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2020-04-05 12:30:38 +02:00
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#+RESULTS:
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[[file:./.ob-jupyter/b709b22e5727fe27a94a18f9d31d40567f035376.png]]
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2020-04-01 15:03:38 +02:00
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2020-04-05 12:30:38 +02:00
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Compared to sherpa, it's pretty close.
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#+NAME: 81b5ed93-0312-45dc-beec-e2ba92e22626
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#+BEGIN_SRC jupyter-python :exports both :results raw drawer
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sherpa = 0.05380
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xs_pb - sherpa
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#+END_SRC
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2020-03-27 14:30:55 +01:00
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2020-04-05 12:30:38 +02:00
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#+RESULTS: 81b5ed93-0312-45dc-beec-e2ba92e22626
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: -6.7112594623469635e-06
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2020-03-27 15:43:13 +01:00
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2020-04-05 12:30:38 +02:00
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I had to set the runcard option ~EW_SCHEME: alpha0~ to use the pure
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QED coupling constant.
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2020-03-30 19:19:48 +02:00
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2020-04-05 12:30:38 +02:00
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** Numerical Integration
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2020-03-30 19:19:48 +02:00
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Plot our nice distribution:
|
2020-03-31 15:35:03 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer
|
2020-03-30 19:19:48 +02:00
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plot_points = np.linspace(*plot_interval, 1000)
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fig, ax = set_up_plot()
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ax.plot(plot_points, gev_to_pb(diff_xs(plot_points, charge=charge, esp=esp)))
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ax.set_xlabel(r'$\theta$')
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2020-04-01 15:03:38 +02:00
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ax.set_ylabel(r'$d\sigma/d\Omega$ [pb]')
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2020-03-30 19:19:48 +02:00
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ax.axvline(interval[0], color='gray', linestyle='--')
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ax.axvline(interval[1], color='gray', linestyle='--', label=rf'$|\eta|={η}$')
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ax.legend()
|
2020-04-01 15:03:38 +02:00
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save_fig(fig, 'diff_xs', 'xs', size=[2.5, 2])
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2020-03-30 19:19:48 +02:00
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#+end_src
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#+RESULTS:
|
2020-04-01 15:03:38 +02:00
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[[file:./.ob-jupyter/aa1aab15903411e94de8fd1d6f9b8c1de0e95b67.png]]
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2020-03-30 19:19:48 +02:00
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Define the integrand.
|
2020-03-31 15:35:03 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer
|
2020-03-30 19:19:48 +02:00
|
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|
|
def xs_pb_int(θ):
|
2020-04-01 13:55:22 +02:00
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return 2*np.pi*gev_to_pb(np.sin(θ)*diff_xs(θ, charge=charge, esp=esp))
|
2020-04-02 09:16:33 +02:00
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|
|
|
|
|
|
|
|
def xs_pb_int_η(η):
|
|
|
|
|
|
return 2*np.pi*gev_to_pb(diff_xs_eta(η, charge, esp))
|
2020-03-30 19:19:48 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
|
|
|
|
|
|
|
|
|
|
|
Plot the integrand. # TODO: remove duplication
|
2020-03-31 15:35:03 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-03-30 19:19:48 +02:00
|
|
|
|
fig, ax = set_up_plot()
|
|
|
|
|
|
ax.plot(plot_points, xs_pb_int(plot_points))
|
|
|
|
|
|
ax.set_xlabel(r'$\theta$')
|
2020-04-02 09:16:33 +02:00
|
|
|
|
ax.set_ylabel(r'$\sin(\theta)\cdot\frac{d\sigma}{d\Omega}$ [pb]')
|
2020-03-30 19:19:48 +02:00
|
|
|
|
ax.axvline(interval[0], color='gray', linestyle='--')
|
|
|
|
|
|
ax.axvline(interval[1], color='gray', linestyle='--', label=rf'$|\eta|={η}$')
|
|
|
|
|
|
ax.legend()
|
|
|
|
|
|
save_fig(fig, 'xs_integrand', 'xs', size=[4, 4])
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-02 11:31:44 +02:00
|
|
|
|
[[file:./.ob-jupyter/a84ac9746f0f4b0c2f1038dc249e557fc1fe48f5.png]]
|
2020-04-05 12:30:38 +02:00
|
|
|
|
*** Integral over θ
|
2020-03-30 19:19:48 +02:00
|
|
|
|
Intergrate σ with the mc method.
|
2020-03-31 15:35:03 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-02 09:05:21 +02:00
|
|
|
|
xs_pb_mc, xs_pb_mc_err = monte_carlo.integrate(xs_pb_int, interval, 1000)
|
2020-04-01 13:55:22 +02:00
|
|
|
|
xs_pb_mc = xs_pb_mc
|
2020-03-30 19:19:48 +02:00
|
|
|
|
xs_pb_mc, xs_pb_mc_err
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
| 0.05338160186959831 | 0.0008391426563695812 |
|
2020-03-30 19:19:48 +02:00
|
|
|
|
|
2020-03-31 15:19:51 +02:00
|
|
|
|
We gonna export that as tex.
|
2020-03-31 16:40:10 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-01 13:55:22 +02:00
|
|
|
|
tex_value(xs_pb_mc, unit=r'\pico\barn', prefix=r'\sigma = ', err=xs_pb_mc_err, save=('results', 'xs_mc.tex'))
|
2020-03-30 19:19:48 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
: \(\sigma = \SI{0.0534\pm 0.0008}{\pico\barn}\)
|
2020-04-02 09:05:21 +02:00
|
|
|
|
|
2020-04-05 12:30:38 +02:00
|
|
|
|
*** Integration over η
|
2020-04-02 09:16:33 +02:00
|
|
|
|
Plot the intgrand of the pseudo rap.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
fig, ax = set_up_plot()
|
|
|
|
|
|
points = np.linspace(*interval_η, 1000)
|
|
|
|
|
|
ax.plot(points, xs_pb_int_η(points))
|
|
|
|
|
|
ax.set_xlabel(r'$\eta$')
|
|
|
|
|
|
ax.set_ylabel(r'$\frac{d\sigma}{d\theta}$ [pb]')
|
|
|
|
|
|
save_fig(fig, 'xs_integrand_η', 'xs', size=[4, 4])
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
|
|
|
|
|
[[file:./.ob-jupyter/09de667c0ccb1d17fef74918e3f462a1340df113.png]]
|
|
|
|
|
|
|
2020-04-02 09:05:21 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-02 09:16:33 +02:00
|
|
|
|
xs_pb_η = monte_carlo.integrate(xs_pb_int_η,
|
2020-04-02 15:55:07 +02:00
|
|
|
|
interval_η, 1000)
|
2020-04-02 09:05:21 +02:00
|
|
|
|
xs_pb_η
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
| 0.05357376653184792 | 0.00015904214943041251 |
|
2020-04-02 09:05:21 +02:00
|
|
|
|
|
2020-04-05 12:34:51 +02:00
|
|
|
|
As we see, the result is a little better if we use pseudo rapidity,
|
|
|
|
|
|
because the differential cross section does not difverge anymore. But
|
|
|
|
|
|
becase our η interval is covering the range where all the variance is
|
|
|
|
|
|
occuring, the improvement is rather marginal.
|
|
|
|
|
|
|
2020-04-02 09:05:21 +02:00
|
|
|
|
And yet again export that as tex.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
tex_value(*xs_pb_η, unit=r'\pico\barn', prefix=r'\sigma = ', save=('results', 'xs_mc_eta.tex'))
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
: \(\sigma = \SI{0.05357\pm 0.00016}{\pico\barn}\)
|
2020-04-04 22:20:48 +02:00
|
|
|
|
|
2020-04-05 12:30:38 +02:00
|
|
|
|
*** Using =VEGAS=
|
2020-04-04 22:20:48 +02:00
|
|
|
|
Now we use =VEGAS= on the θ parametrisation and see what happens.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
xs_pb_vegas, xs_pb_vegas_σ, xs_θ_intervals = \
|
|
|
|
|
|
monte_carlo.integrate_vegas(xs_pb_int, interval,
|
|
|
|
|
|
num_increments=20, alpha=4,
|
|
|
|
|
|
point_density=1000, acumulate=True)
|
|
|
|
|
|
xs_pb_vegas, xs_pb_vegas_σ
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 21:16:31 +02:00
|
|
|
|
| 0.05381811134391227 | 5.139124553909084e-05 |
|
2020-04-04 22:20:48 +02:00
|
|
|
|
|
|
|
|
|
|
This is pretty good, although the variance reduction may be achieved
|
|
|
|
|
|
partially by accumulating the results from all runns. The uncertainty
|
|
|
|
|
|
is being overestimated!
|
|
|
|
|
|
|
|
|
|
|
|
And export that as tex.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
tex_value(xs_pb_vegas, xs_pb_vegas_σ, unit=r'\pico\barn',
|
|
|
|
|
|
prefix=r'\sigma = ', save=('results', 'xs_mc_θ_vegas.tex'))
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 21:16:31 +02:00
|
|
|
|
: \(\sigma = \SI{0.05382\pm 0.00005}{\pico\barn}\)
|
2020-04-04 22:20:48 +02:00
|
|
|
|
|
|
|
|
|
|
Surprisingly, without acumulation, the result ain't much different.
|
|
|
|
|
|
This depends, of course, on the iteration count.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
monte_carlo.integrate_vegas(xs_pb_int, interval, num_increments=20,
|
|
|
|
|
|
alpha=4, point_density=1000,
|
|
|
|
|
|
acumulate=False)[0:2]
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
| 0.053972586551143995 | 8.059547531934951e-05 |
|
2020-04-02 09:05:21 +02:00
|
|
|
|
|
2020-04-05 12:30:38 +02:00
|
|
|
|
*** Testing the Statistics
|
2020-04-02 17:37:31 +02:00
|
|
|
|
Let's battle test the statistics.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
num_runs = 1000
|
|
|
|
|
|
num_within = 0
|
|
|
|
|
|
|
|
|
|
|
|
for _ in range(num_runs):
|
|
|
|
|
|
val, err = monte_carlo.integrate(xs_pb_int_η, interval_η, 1000)
|
|
|
|
|
|
if abs(xs_pb - val) <= err:
|
|
|
|
|
|
num_within += 1
|
|
|
|
|
|
|
|
|
|
|
|
num_within/num_runs
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 20:33:37 +02:00
|
|
|
|
: 0.677
|
2020-04-02 17:37:31 +02:00
|
|
|
|
|
|
|
|
|
|
So we see: the standard deviation is sound.
|
|
|
|
|
|
|
2020-04-04 22:20:48 +02:00
|
|
|
|
Doing the same thing with =VEGAS= shows, that we overestimate σ here.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-05 13:55:28 +02:00
|
|
|
|
num_runs = 1000
|
|
|
|
|
|
num_within = 0
|
|
|
|
|
|
for _ in range(num_runs):
|
|
|
|
|
|
val, err, _ = \
|
|
|
|
|
|
monte_carlo.integrate_vegas(xs_pb_int, interval,
|
2020-04-06 21:16:31 +02:00
|
|
|
|
num_increments=8, alpha=1,
|
2020-04-05 13:55:28 +02:00
|
|
|
|
point_density=1000, acumulate=False)
|
2020-04-06 20:33:37 +02:00
|
|
|
|
|
2020-04-05 13:55:28 +02:00
|
|
|
|
if abs(xs_pb - val) <= err:
|
|
|
|
|
|
num_within += 1
|
|
|
|
|
|
num_within/num_runs
|
2020-04-04 22:20:48 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 21:16:31 +02:00
|
|
|
|
: 0.667
|
2020-04-04 22:20:48 +02:00
|
|
|
|
|
2020-04-05 12:30:38 +02:00
|
|
|
|
** Sampling and Analysis
|
2020-03-31 15:19:51 +02:00
|
|
|
|
Define the sample number.
|
2020-03-31 15:35:03 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-03-31 15:19:51 +02:00
|
|
|
|
sample_num = 1000
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-02 15:55:07 +02:00
|
|
|
|
Let's define shortcuts for our distributions. The 2π are just there
|
|
|
|
|
|
for formal correctnes. Factors do not influecence the outcome.
|
2020-03-31 19:06:14 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-05 13:55:28 +02:00
|
|
|
|
def dist_cosθ(x):
|
2020-03-31 19:06:14 +02:00
|
|
|
|
return gev_to_pb(diff_xs_cosθ(x, charge, esp))*2*np.pi
|
2020-04-02 15:55:07 +02:00
|
|
|
|
|
|
|
|
|
|
def dist_η(x):
|
|
|
|
|
|
return gev_to_pb(diff_xs_eta(x, charge, esp))*2*np.pi
|
2020-03-31 19:06:14 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
|
|
|
|
|
|
2020-04-05 12:30:38 +02:00
|
|
|
|
*** Sampling the cosθ cross section
|
2020-04-02 15:55:07 +02:00
|
|
|
|
|
2020-03-31 19:06:14 +02:00
|
|
|
|
Now we monte-carlo sample our distribution. We observe that the efficiency his very bad!
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
cosθ_sample, cosθ_efficiency = \
|
2020-04-05 13:55:28 +02:00
|
|
|
|
monte_carlo.sample_unweighted_array(sample_num, dist_cosθ,
|
2020-03-31 19:06:14 +02:00
|
|
|
|
interval_cosθ, report_efficiency=True)
|
|
|
|
|
|
cosθ_efficiency
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
: 0.026783904317859316
|
2020-03-31 19:06:14 +02:00
|
|
|
|
|
|
|
|
|
|
Our distribution has a lot of variance, as can be seen by plotting it.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-05 13:55:28 +02:00
|
|
|
|
pts = np.linspace(*interval_cosθ, 100)
|
|
|
|
|
|
fig, ax = set_up_plot()
|
|
|
|
|
|
ax.plot(pts, dist_cosθ(pts))
|
|
|
|
|
|
ax.set_xlabel(r'$\cos\theta$')
|
|
|
|
|
|
ax.set_ylabel(r'$\frac{d\sigma}{d\Omega}$')
|
2020-03-31 19:06:14 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-03 14:05:30 +02:00
|
|
|
|
:RESULTS:
|
2020-04-05 13:55:28 +02:00
|
|
|
|
: Text(0, 0.5, '$\\frac{d\\sigma}{d\\Omega}$')
|
|
|
|
|
|
[[file:./.ob-jupyter/368891d7c82ba167083c1d8b382256526672bcd7.png]]
|
2020-04-03 14:05:30 +02:00
|
|
|
|
:END:
|
2020-03-31 19:06:14 +02:00
|
|
|
|
|
|
|
|
|
|
We define a friendly and easy to integrate upper limit function.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-05 13:55:28 +02:00
|
|
|
|
upper_limit = dist_cosθ(interval_cosθ[0]) \
|
2020-03-31 19:06:14 +02:00
|
|
|
|
/interval_cosθ[0]**2
|
2020-04-05 13:55:28 +02:00
|
|
|
|
upper_base = dist_cosθ(0)
|
2020-03-31 19:06:14 +02:00
|
|
|
|
|
|
|
|
|
|
def upper(x):
|
|
|
|
|
|
return upper_base + upper_limit*x**2
|
|
|
|
|
|
|
|
|
|
|
|
def upper_int(x):
|
|
|
|
|
|
return upper_base*x + upper_limit*x**3/3
|
|
|
|
|
|
|
|
|
|
|
|
ax.plot(pts, upper(pts), label='Upper bound')
|
|
|
|
|
|
ax.legend()
|
|
|
|
|
|
ax.set_xlabel(r'$\cos\theta$')
|
|
|
|
|
|
ax.set_ylabel(r'$\frac{d\sigma}{d\Omega}$')
|
|
|
|
|
|
save_fig(fig, 'upper_bound', 'xs_sampling', size=(4, 4))
|
|
|
|
|
|
fig
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
[[file:./.ob-jupyter/8c7c128898710041f80d8fde24a5e3c63b084e1c.png]]
|
2020-03-31 19:06:14 +02:00
|
|
|
|
|
2020-03-30 20:26:10 +02:00
|
|
|
|
|
2020-03-31 19:06:14 +02:00
|
|
|
|
To increase our efficiency, we have to specify an upper bound. That is
|
|
|
|
|
|
at least a little bit better. The numeric inversion is horribly inefficent.
|
2020-03-31 15:35:03 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-03-31 19:06:14 +02:00
|
|
|
|
cosθ_sample, cosθ_efficiency = \
|
2020-04-05 13:55:28 +02:00
|
|
|
|
monte_carlo.sample_unweighted_array(sample_num, dist_cosθ,
|
2020-03-31 19:06:14 +02:00
|
|
|
|
interval_cosθ, report_efficiency=True,
|
|
|
|
|
|
upper_bound=[upper, upper_int])
|
|
|
|
|
|
cosθ_efficiency
|
2020-03-30 19:56:02 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 19:17:48 +02:00
|
|
|
|
: 0.08012365700385161
|
|
|
|
|
|
<<cosθ-bare-eff>>
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2020-03-30 19:56:02 +02:00
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Nice! And now draw some histograms.
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We define an auxilliary method for convenience.
|
2020-04-05 12:30:38 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer :tangle tangled/plot_utils.py
|
2020-04-05 13:55:28 +02:00
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"""
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Some shorthands for common plotting tasks related to the investigation
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of monte-carlo methods in one rimension.
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Author: Valentin Boettcher <hiro at protagon.space>
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"""
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2020-04-05 12:30:38 +02:00
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import matplotlib.pyplot as plt
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2020-03-30 19:56:02 +02:00
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def draw_histo(points, xlabel, bins=20):
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2020-04-02 16:33:30 +02:00
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heights, edges = np.histogram(points, bins)
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centers = (edges[1:] + edges[:-1])/2
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deviations = np.sqrt(heights)
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2020-03-30 19:56:02 +02:00
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fig, ax = set_up_plot()
|
2020-04-02 16:33:30 +02:00
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ax.errorbar(centers, heights, deviations, linestyle='none', color='orange')
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ax.step(edges, [heights[0], *heights], color='#1f77b4')
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2020-03-30 19:56:02 +02:00
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ax.set_xlabel(xlabel)
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ax.set_xlim([points.min(), points.max()])
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return fig, ax
|
2020-03-30 19:19:48 +02:00
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#+end_src
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2020-03-30 19:56:02 +02:00
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#+RESULTS:
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The histogram for cosθ.
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2020-03-31 15:35:03 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer
|
2020-03-30 19:56:02 +02:00
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fig, _ = draw_histo(cosθ_sample, r'$\cos\theta$')
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2020-03-31 15:19:51 +02:00
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save_fig(fig, 'histo_cos_theta', 'xs', size=(4,3))
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#+end_src
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#+RESULTS:
|
2020-04-06 18:21:10 +02:00
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[[file:./.ob-jupyter/232ab8e8ba0cad843729bc144b2e252dbf878a99.png]]
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2020-03-31 15:19:51 +02:00
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2020-04-05 12:30:38 +02:00
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*** Observables
|
2020-04-02 15:55:07 +02:00
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Now we define some utilities to draw real 4-momentum samples.
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2020-03-31 15:35:03 +02:00
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#+begin_src jupyter-python :exports both :tangle tangled/xs.py
|
2020-04-02 16:35:43 +02:00
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def sample_momenta(sample_num, interval, charge, esp, seed=None):
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"""Samples `sample_num` unweighted photon 4-momenta from the
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2020-04-02 16:33:30 +02:00
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cross-section.
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2020-03-31 15:19:51 +02:00
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:param sample_num: number of samples to take
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:param interval: cosθ interval to sample from
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:param charge: the charge of the quark
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:param esp: center of mass energy
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:param seed: the seed for the rng, optional, default is system
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time
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|
2020-04-02 16:35:43 +02:00
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:returns: an array of 4 photon momenta
|
2020-04-02 16:33:30 +02:00
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2020-03-31 15:19:51 +02:00
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:rtype: np.ndarray
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"""
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cosθ_sample = \
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monte_carlo.sample_unweighted_array(sample_num,
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lambda x:
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diff_xs_cosθ(x, charge, esp),
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interval_cosθ)
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φ_sample = np.random.uniform(0, 1, sample_num)
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|
2020-04-02 15:55:07 +02:00
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def make_momentum(esp, cosθ, φ):
|
2020-03-31 15:19:51 +02:00
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sinθ = np.sqrt(1-cosθ**2)
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return np.array([1, sinθ*np.cos(φ), sinθ*np.sin(φ), cosθ])*esp/2
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|
2020-04-02 16:35:43 +02:00
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momenta = np.array([make_momentum(esp, cosθ, φ) \
|
2020-03-31 15:19:51 +02:00
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for cosθ, φ in np.array([cosθ_sample, φ_sample]).T])
|
2020-04-02 16:35:43 +02:00
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return momenta
|
2020-03-31 15:19:51 +02:00
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#+end_src
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#+RESULTS:
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|
2020-03-31 15:35:03 +02:00
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To generate histograms of other obeservables, we have to define them
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as functions on 4-impuleses. Using those to transform samples is
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analogous to transforming the distribution itself.
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|
#+begin_src jupyter-python :exports both :results raw drawer :tangle tangled/observables.py
|
2020-03-31 15:19:51 +02:00
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|
"""This module defines some observables on arrays of 4-pulses."""
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import numpy as np
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def p_t(p):
|
2020-04-02 15:55:07 +02:00
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"""Transverse momentum
|
2020-03-31 15:19:51 +02:00
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|
2020-04-02 16:35:43 +02:00
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:param p: array of 4-momenta
|
2020-03-31 15:19:51 +02:00
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"""
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return np.linalg.norm(p[:,1:3], axis=1)
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def η(p):
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"""Pseudo rapidity.
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|
2020-04-02 16:35:43 +02:00
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:param p: array of 4-momenta
|
2020-03-31 15:19:51 +02:00
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"""
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return np.arccosh(np.linalg.norm(p[:,1:], axis=1)/p_t(p))*np.sign(p[:, 3])
|
2020-03-30 19:56:02 +02:00
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#+end_src
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|
#+RESULTS:
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|
2020-03-31 15:19:51 +02:00
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|
Lets try it out.
|
2020-03-31 15:35:03 +02:00
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|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-02 16:35:43 +02:00
|
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|
momentum_sample = sample_momenta(2000, interval_cosθ, charge, esp)
|
2020-04-02 15:55:07 +02:00
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momentum_sample
|
2020-03-30 19:56:02 +02:00
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|
#+end_src
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|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
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|
: array([[100. , 71.11224364, 66.31153844, -23.36297659],
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|
: [100. , 58.54352186, 54.45149767, 60.06405289],
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: [100. , 46.31471014, 30.52838901, -83.20435739],
|
2020-03-31 15:35:03 +02:00
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|
: ...,
|
2020-04-06 18:21:10 +02:00
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|
: [100. , 45.7527456 , 30.1415044 , 83.65510135],
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|
: [100. , 33.32760816, 39.96210329, -85.39496961],
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|
: [100. , 96.46223117, 21.72143559, -14.94045492]])
|
2020-03-30 20:26:10 +02:00
|
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|
2020-03-31 15:19:51 +02:00
|
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|
|
Now let's make a histogram of the η distribution.
|
2020-03-31 15:35:03 +02:00
|
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|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-02 15:55:07 +02:00
|
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|
|
η_sample = η(momentum_sample)
|
2020-03-31 15:19:51 +02:00
|
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|
|
draw_histo(η_sample, r'$\eta$')
|
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|
#+end_src
|
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|
#+RESULTS:
|
2020-04-03 14:05:30 +02:00
|
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|
|
:RESULTS:
|
2020-04-06 18:21:10 +02:00
|
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|
|
| <Figure | size | 432x288 | with | 1 | Axes> | <matplotlib.axes._subplots.AxesSubplot | at | 0x7f76ad3d08b0> |
|
|
|
|
|
|
[[file:./.ob-jupyter/d79b1242a38a86dcf278461577afb324772302bf.png]]
|
2020-04-03 14:05:30 +02:00
|
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|
|
:END:
|
2020-03-31 15:19:51 +02:00
|
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|
2020-04-02 15:55:07 +02:00
|
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|
|
And the same for the p_t (transverse momentum) distribution.
|
2020-03-31 15:35:03 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
2020-04-02 15:55:07 +02:00
|
|
|
|
p_t_sample = p_t(momentum_sample)
|
2020-04-02 16:33:30 +02:00
|
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|
|
draw_histo(p_t_sample, r'$p_T$ [GeV]')
|
2020-04-02 15:55:07 +02:00
|
|
|
|
#+end_src
|
|
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|
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|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-03 14:05:30 +02:00
|
|
|
|
:RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
| <Figure | size | 432x288 | with | 1 | Axes> | <matplotlib.axes._subplots.AxesSubplot | at | 0x7f76acf46d30> |
|
|
|
|
|
|
[[file:./.ob-jupyter/d98ab9ce26ed95da70f60706a946709c16d3e5dc.png]]
|
2020-04-03 14:05:30 +02:00
|
|
|
|
:END:
|
2020-04-02 15:55:07 +02:00
|
|
|
|
|
|
|
|
|
|
That looks somewhat fishy, but it isn't.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
fig, ax = set_up_plot()
|
|
|
|
|
|
points = np.linspace(interval_pt[0], interval_pt[1] - .01, 1000)
|
|
|
|
|
|
ax.plot(points, gev_to_pb(diff_xs_p_t(points, charge, esp)))
|
|
|
|
|
|
ax.set_xlabel(r'$p_T$')
|
|
|
|
|
|
ax.set_xlim(interval_pt[0], interval_pt[1] + 1)
|
|
|
|
|
|
ax.set_ylim([0, gev_to_pb(diff_xs_p_t(interval_pt[1] -.01, charge, esp))])
|
|
|
|
|
|
ax.set_ylabel(r'$\frac{d\sigma}{dp_t}$ [pb]')
|
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|
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|
|
save_fig(fig, 'diff_xs_p_t', 'xs_sampling', size=[4, 3])
|
|
|
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|
|
#+end_src
|
|
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|
|
|
|
|
|
|
|
|
#+RESULTS:
|
|
|
|
|
|
[[file:./.ob-jupyter/739fdde6357d58890ef7847d0afc3277cffa9062.png]]
|
|
|
|
|
|
this is strongly peaked at p_t=100GeV. (The jacobian goes like 1/x there!)
|
|
|
|
|
|
|
2020-04-05 12:30:38 +02:00
|
|
|
|
*** Sampling the η cross section
|
2020-04-02 16:33:30 +02:00
|
|
|
|
An again we see that the efficiency is way, way! better...
|
2020-04-02 15:55:07 +02:00
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
η_sample, η_efficiency = \
|
|
|
|
|
|
monte_carlo.sample_unweighted_array(sample_num, dist_η,
|
|
|
|
|
|
interval_η, report_efficiency=True)
|
|
|
|
|
|
η_efficiency
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
: 0.40768
|
2020-04-06 19:17:48 +02:00
|
|
|
|
<<η-eff>>
|
2020-04-02 15:55:07 +02:00
|
|
|
|
|
|
|
|
|
|
Let's draw a histogram to compare with the previous results.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
draw_histo(η_sample, r'$\eta$')
|
2020-03-30 20:26:10 +02:00
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-03 14:05:30 +02:00
|
|
|
|
:RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
| <Figure | size | 432x288 | with | 1 | Axes> | <matplotlib.axes._subplots.AxesSubplot | at | 0x7f76acf44520> |
|
|
|
|
|
|
[[file:./.ob-jupyter/67c729625da77d98f246cc41287bc648e5f3e233.png]]
|
2020-04-03 14:05:30 +02:00
|
|
|
|
:END:
|
2020-04-02 15:55:07 +02:00
|
|
|
|
Looks good to me :).
|
2020-04-05 12:34:51 +02:00
|
|
|
|
*** Sampling with =VEGAS=
|
2020-04-05 13:55:28 +02:00
|
|
|
|
Let's define some little helpers.
|
|
|
|
|
|
#+begin_src jupyter-python :exports both :tangle tangled/plot_utils.py
|
|
|
|
|
|
def plot_increments(ax, increment_borders, label=None, *args, **kwargs):
|
|
|
|
|
|
"""Plot the increment borders from a list. The first and last one
|
|
|
|
|
|
|
|
|
|
|
|
:param ax: the axis on which to draw
|
|
|
|
|
|
:param list increment_borders: the borders of the increments
|
|
|
|
|
|
:param str label: the label to apply to one of the vertical lines
|
|
|
|
|
|
"""
|
|
|
|
|
|
|
|
|
|
|
|
ax.axvline(x=increment_borders[1], label=label, *args, **kwargs)
|
|
|
|
|
|
|
|
|
|
|
|
for increment in increment_borders[2:-1]:
|
|
|
|
|
|
ax.axvline(x=increment, *args, **kwargs)
|
|
|
|
|
|
|
|
|
|
|
|
def plot_vegas_weighted_distribution(ax, points, dist, increment_borders, *args,
|
|
|
|
|
|
,**kwargs):
|
|
|
|
|
|
"""Plot the distribution with VEGAS weights applied.
|
|
|
|
|
|
|
|
|
|
|
|
:param ax: axis
|
|
|
|
|
|
:param points: points
|
|
|
|
|
|
:param dist: distribution
|
|
|
|
|
|
:param increment_borders: increment borders
|
|
|
|
|
|
"""
|
|
|
|
|
|
|
|
|
|
|
|
num_increments = increment_borders.size
|
|
|
|
|
|
weighted_dist = dist.copy()
|
|
|
|
|
|
|
|
|
|
|
|
for left_border, right_border in zip(increment_borders[:-1],
|
|
|
|
|
|
increment_borders[1:]):
|
|
|
|
|
|
length = right_border - left_border
|
|
|
|
|
|
mask = (left_border <= points) & (points <= right_border)
|
|
|
|
|
|
weighted_dist[mask] = dist[mask]*num_increments*length
|
|
|
|
|
|
|
|
|
|
|
|
ax.plot(points, weighted_dist, *args, **kwargs)
|
|
|
|
|
|
#+end_src
|
|
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|
|
|
|
|
|
|
|
|
#+RESULTS:
|
|
|
|
|
|
|
|
|
|
|
|
To get the increments, we have to let =VEGAS= loose on our
|
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|
|
|
|
distribution. We throw away the integral, but keep the increments.
|
|
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|
|
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|
|
|
|
|
|
#+begin_src jupyter-python :exports both :results raw drawer
|
|
|
|
|
|
_, _, increments = monte_carlo.integrate_vegas(dist_cosθ,
|
|
|
|
|
|
interval_cosθ,
|
|
|
|
|
|
num_increments=10, alpha=1,
|
|
|
|
|
|
epsilon=.01)
|
|
|
|
|
|
increments
|
|
|
|
|
|
#+end_src
|
|
|
|
|
|
|
|
|
|
|
|
#+RESULTS:
|
2020-04-06 18:21:10 +02:00
|
|
|
|
: array([-0.9866143 , -0.96792394, -0.92699951, -0.8308518 , -0.58953227,
|
|
|
|
|
|
: -0.00301925, 0.58870729, 0.83008478, 0.92657422, 0.96805422,
|
2020-04-05 13:55:28 +02:00
|
|
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: 0.9866143 ])
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Visualizing the increment borders gives us the information we want.
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#+begin_src jupyter-python :exports both :results raw drawer
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pts = np.linspace(*interval_cosθ, 100)
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fig, ax = set_up_plot()
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ax.plot(pts, dist_cosθ(pts))
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ax.set_xlabel(r'$\cos\theta$')
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ax.set_ylabel(r'$\frac{d\sigma}{d\Omega}$')
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ax.set_xlim(*interval_cosθ)
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plot_increments(ax, increments,
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label='Increment Borderds', color='gray', linestyle='--')
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ax.legend()
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#+end_src
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#+RESULTS:
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:RESULTS:
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2020-04-06 18:21:10 +02:00
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: <matplotlib.legend.Legend at 0x7f76ac0e2a90>
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[[file:./.ob-jupyter/d36bc582af58790c173d3616d20c8365f0709d4e.png]]
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2020-04-05 13:55:28 +02:00
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:END:
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We can now plot the reweighted distribution to observe the variance
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reduction visually.
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#+begin_src jupyter-python :exports both :results raw drawer
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pts = np.linspace(*interval_cosθ, 1000)
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fig, ax = set_up_plot()
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plot_vegas_weighted_distribution(ax, pts, dist_cosθ(pts), increments)
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ax.set_xlabel(r'$\cos\theta$')
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ax.set_ylabel(r'$\frac{d\sigma}{d\Omega}$')
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ax.set_xlim(*interval_cosθ)
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plot_increments(ax, increments,
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label='Increment Borderds', color='gray', linestyle='--')
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ax.legend()
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#+end_src
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#+RESULTS:
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:RESULTS:
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2020-04-06 18:21:10 +02:00
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: <matplotlib.legend.Legend at 0x7f76ae0c4850>
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[[file:./.ob-jupyter/d2c93d61c2e37889a4e519dc1edd5eb32c6ca99c.png]]
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2020-04-05 13:55:28 +02:00
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:END:
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2020-04-06 19:17:48 +02:00
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2020-04-05 13:55:28 +02:00
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I am batman!
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2020-04-06 19:17:48 +02:00
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Now, draw a sample and look at the efficiency.
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2020-04-06 18:21:10 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer
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cosθ_sample_strat, cosθ_efficiency_strat = \
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monte_carlo.sample_unweighted_array(sample_num, dist_cosθ,
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increment_borders=increments,
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report_efficiency=True)
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cosθ_efficiency_strat
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#+end_src
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#+RESULTS:
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: 0.5785
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2020-04-05 21:12:02 +02:00
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2020-04-06 19:17:48 +02:00
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If we compare that to [[cosθ-bare-eff]], we can see the improvement :P.
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It is even better the [[η-eff]]. The histogram looks just the same.
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2020-04-06 18:21:10 +02:00
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#+begin_src jupyter-python :exports both :results raw drawer
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fig, _ = draw_histo(cosθ_sample_strat, r'$\cos\theta$')
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save_fig(fig, 'histo_cos_theta_strat', 'xs', size=(4,3))
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#+end_src
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#+RESULTS:
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[[file:./.ob-jupyter/04dece7789d8b6daa17c861dce213c385c9344bc.png]]
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