2023-06-08 16:26:31 -04:00
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\documentclass[fontsize=11pt,paper=a4,open=any,
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twoside=no,toc=listof,toc=bibliography,headings=optiontohead,
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captions=nooneline,captions=tableabove,english,DIV=15,numbers=noenddot,final,parskip=half-,
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headinclude=true,footinclude=false,BCOR=0mm]{scrartcl}
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\pdfvariable suppressoptionalinfo 512\relax
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\synctex=1
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\author{Valentin Boettcher}
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\usepackage{hirostyle}
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\usepackage{hiromacros}
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\addbibresource{references.bib}
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\title{Input-Output Theory for Modulated Fibre-Loops}
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\date{2023}
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\graphicspath{{graphics}}
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\newcommand{\inputf}[0]{\ensuremath{\mathrm{in}}}
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\newcommand{\outputf}[0]{\ensuremath{\mathrm{out}}}
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\begin{document}
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\maketitle
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\tableofcontents
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\section{Microscopic Derivation}
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\label{sec:micr-deriv}
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The setup we are describing consists of a general driven photonic
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system \(A\) and a transmission line \(B\). The \(A\) system is
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considered to have the Hamiltonian
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\begin{equation}
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\label{eq:1}
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H_{A}=H_{0}+V(t) = ∑_{m} ω^{0}_{m} c_{m}^†c_{m} + V(t),
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\end{equation}
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where we are working in the basis that diagonalizes \(H_{0}\) and the
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\(c_{m}\) are linear combinations of the bare modes in the photonic
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system. We designate the bare modes of the EM field that are actually
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in contact with the transmission line as \(a_{β}\) with
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\begin{equation}
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\label{eq:4}
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E_{A}(x,t)= \iu \sqrt{\frac{\hbar}{2ε_{0}n_{A}^{2} L_{A,\perp}^{2} L_{A}}} ∑_{β}
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\sqrt{ω_{k_β}} \pqty{a_{β}(t)
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\eu^{\iu k_{β} x } - a_{β}^†(t) \eu^{-\iu k_{β} x}},
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\end{equation}
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where \(L_{A,\perp}\) is a length scale that can be interpreted as the
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diameter of the transmission line~\cite{Jacobs} and \(L_{A}\) is the
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length of the cavity/resonator that hosts the electric field. The
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modes have wave numbers \(k_{β} = 2πβ/L_{A}\) for \(β \in \ZZ\) and
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frequencies \(ω_{k_β} = c \abs{k_{β}}/n_{A}\), where \(n_{A}\) is the
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refractive index inside the cavity. For simplicity we set \(\hbar
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= 1\) such that time is measured in units of inverse energy.
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The bare \(a_{β}\) modes are linear combinations of the \(c_{m}\) and
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can be related through
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\begin{equation}
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\label{eq:5}
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a_{β} = ∑_{m} U_{βm} c_{m},
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\end{equation}
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where \(U\) is a not necessarily square matrix that obeys the
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unitarity relation \(U U^† = \id\).
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Transitioning into a rotating frame with respect to \(H_{0}\) and
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employing the rotating wave approximation removes the time dependence
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from the interaction
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\begin{equation}
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\label{eq:12}
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\tilde{c}(t)_{m} = c_{m}(t)\eu^{\iu ω^{0}_{m}t} \implies H_{A} \to \tilde{H}_{A}=
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∑_{mn}V_{mn}(t) \eu^{-\iu t (ω^{0}_{n}-ω^{0}_{m})}
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\tilde{c}_{m}^†\tilde{c}_{n} \approx ∑_{mn}V^{0}_{mn} \tilde{c}_{m}^†\tilde{c}_{n}.
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\end{equation}
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We can subsequently find a unitary transformation that diagonalizes
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the RWA interaction
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\begin{equation}
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\label{eq:30}
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∑_{mn}\pqty{O^{†}}_{im}V_{mn}^{0}O_{nj} = ω_{j} δ_{ij},
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\end{equation}
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where the columns of \(O\) are the normalized eigenvectors of
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\(V_{mn}^{0}=\mel{m}{V^{0}}{n}\). So if \(\ket{ψ_{j}}\) is an
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eigenvector of \(V\), then \(\braket{i}{ψ_{j}} = O_{ij}\)
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\footnote{This is just a reminder for Valentin who can't seem to keep
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this in his head.}.
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Transforming the \(\tilde{c}_{m}\) according to
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\begin{equation}
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\label{eq:13}
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d_{γ} = ∑_{n}O^{\ast}_{nγ} \tilde{c}_{n} \implies \tilde{H}_{A} = ∑_{γ}ω_{γ} d_{γ}^†d_{γ}
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\end{equation}
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leaves us with a very simple Hamiltonian.
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Let us list the relation between the \(a\), \(c\) and \(d\) operators
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for later reference
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\begin{align}
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\label{eq:15}
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c_{n} &= \eu^{-\iu
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ω^{0}_{n} t}\tilde{{c}}_{n} = \eu^{-\iu
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ω^{0}_{n} t} ∑_{γ} O_{nγ}d_{γ} \\
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a_{β} &= ∑_{m} U_{β,m} c_{m} = ∑_{m} U_{β,m} \tilde{c}_{m}\eu^{-\iu
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ω^{0}_{m} t} = ∑_{mγ} U_{β,m} \eu^{-\iu
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ω^{0}_{m} t} O_{mγ}d_{γ} \equiv ∑_{γ}\mathcal{U}(t)_{β,γ} d_{γ}.
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\end{align}
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The transmission line is considered to only
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have one polarization direction and one dimension of
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propagation, so that the vector potential is effectively scalar and we
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have
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\begin{equation}
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\label{eq:2}
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E_{B}(x, t) = \iu\sqrt{\frac{\hbar}{2ε_{0}n_{B}^{2}
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(2π)^{3}L_{B,\perp}^{2}}} ∫{\sqrt{ω^{B}_{k}}} \pqty{b_{k}(t)
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\eu^{\iu k x } - b_{k}^†(t) \eu^{-\iu k x}}\dd{k},
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\end{equation}
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with \(\comm{b_{k}}{b_{q}^†}=δ(k-q)\), \(ω^{B}_{k} = c \abs{k}/n_{B}\)
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with \(n_{B}\) being the refractive index of the fibre and
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\(L_{B,\perp}\) being the perpendicular length scale as discussed
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above. Note that the \(b_{k}\) here have dimensions of \(\sqrt{[L]}\)
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as opposed to \(\sqrt{[t]}\), as is the usual convention in
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input-output theory. If a stochastic theory is desired, the latter
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convention is preferrable and can be obtained through substituting
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\(k\to \pm ω/c n_{B}\) and rescaling
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\(b_{k}\to b_{k}/ \sqrt{c n_{B}^{-1}}\).
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A phenomenological interaction between the transmission line and the
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system \(A\) roughly inspired by coupled mode theory is
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\begin{equation}
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\label{eq:3}
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H_{I} = g_{0} ∫ E_{A,+}(x,t)E_{B,-}(x,t) f(x) \dd{x} + \hc,
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\end{equation}
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where the subscripts \(\pm\) denote positive or negative frequency
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portions of the fields and \(f(x)\) is a dimensionless weighting
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function with compact support \([-Δx/2, Δx/2]\) whose maximum is
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unity. Coupling only the positive/negative parts simplifies the
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calculations and is consistent with the later application of the
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rotating wave approximation. A possible phase shift between the fields
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has been absorbed into the definition of the creation and annihilation
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operators.
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Expanding the fields in \cref{eq:3} we obtain
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\begin{equation}
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\label{eq:6}
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H_{I} = {g_{0}} \frac{\hbar Δx}{2 ε_{0}n_{A}n_{B} (2π)^{3}
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L_{A,\perp}L_{B,\perp}\sqrt{L_{A}}} ∑_{β}∫
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\sqrt{ω^{B}_{k}ω_{k_{β}}}\,\tilde{f}(k-k_{β})\, b^†_{k}
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a_{β} \dd{k} + \hc
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\end{equation}
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The Fourier transform of the weighting function
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\begin{equation}
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\label{eq:7}
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\tilde{f}(k) = \frac{1}{Δx} ∫f(x)\eu^{-\iu k x} \dd{x}
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\end{equation}
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controls how ``far'' the interaction reaches in \(k\)-space. In the
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extreme case \(Δx\to 0\) every \(b_{k}\) couples to every \(a_{β}\),
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whereas for \(Δx\to ∞\) only modes with matching wave-numbers
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couple. As the \(b_{k}\) will contain both the coherent drive with a
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laser and the output field amplitudes it is desirable to have this
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coupling to be as local in \(k\)-space as possible for targeted
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control and precise readout. In the limit of weak coupling between
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transmission line and system, which we will assume in a short while,
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the rotating wave approximation will ensure that our result won't
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depend significantly on the choice of \(f\).
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The coupling constant \(g_{0}\) in \cref{eq:6} has the dimensions of
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\([L]^{2}\times [ε_{0}]\). We define a new coupling constant that has
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units of energy as
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\begin{equation}
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\label{eq:8}
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g_{0} = g\frac{n_{A}n_{B}ε_{0} L_{A,\perp}L_{B,\perp} 2(2π)^{3}}{\hbar ω_{0}},
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\end{equation}
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where \(ω_{0}\) is a typical frequency\footnote{For example, the
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frequency of the drive laser.}.
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Using this, \cref{eq:6} becomes
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\begin{equation}
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\label{eq:9}
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\begin{aligned}
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H_{I} &= \frac{gΔx}{
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\sqrt{L_{A}}} ∑_{β}∫
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G_{β}(k) b^†_{k}
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a_{β} \dd{k} + \hc
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&G_{β}(k) &= \frac{\sqrt{ω^{B}_{k}ω_{k_β}}}{ω_{0}} \tilde{f}(k-k_{β}).
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\end{aligned}
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\end{equation}
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We note that for
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a \(ω_{k_{β}}= ω_{0} + δω\) with \(δω \ll ω_{0}\) the coupling factor
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\(G_{β}(k)\) only depends on the difference \(k-k_{β}\). By defining
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\begin{equation}
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\label{eq:11}
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\mathcal{O(k)} = \frac{Δx}{\sqrt{L_{A}}} ∑_{β} G_β(k)a_{β} =
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\frac{Δx}{\sqrt{L_{A}}} ∑_{β,m} G_β(k)U_{β,m}c_{m}
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\end{equation}
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the interaction takes on the more familiar form
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\begin{equation}
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\label{eq:14}
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H_{I} = {g} ∫
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b^†_{k} \mathcal{O}(k)
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\dd{k} + \hc
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\end{equation}
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Changing variables from \(k\) to\footnote{This is a bit
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unconventional.} \(ω^{B}_{k}=k c / n_{B}\) in
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\cref{eq:9} we obtain
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\begin{equation}
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\label{eq:17}
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H_{I} = \frac{gΔx}{\sqrt{L_{A}}} ∑_{β}∫_{-∞}^{∞}
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G'_{β}(ω)f^†_{ω}
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{a_{β}} \dd{ω} + \hc,
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\end{equation}
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where \(f_{ω}=\sqrt{\frac{n_{B}}{c}}b_{\frac{ω n_{B}}{c}}\) with
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\(\comm{f_{ω}}{f_{ω'}^†}=δ(ω-ω')\) and
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\(G'_{β}(ω)=G_{β}\pqty{\frac{ω n_{B}}{c}}\).
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\subsection{Rotating Wave and First Markov Approximation}
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\label{sec:rotating-wave-first}
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Following the route taken in \cite{Jacobs}, the next step would be to
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transition into a rotating frame so that
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\(\tilde{H}_{A}=\tilde{H}_{B}=0\) and apply the rotating wave
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approximation. Here, the rotating terms that would occur have the
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frequencies of the form \(ω^{0}_m + ω_{γ}\) which are not guaranteed
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to be spaced sufficiently far apart for the RWA to
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apply\footnote{Consider, for example the SSH model where the
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\(k\)-space density can be arbitrarily high depending on the length
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of the chain.}. We therefore work in the frame of the
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\(\tilde{c}_{m}\) and \(\tilde{f}_{ω} = f_{ω}\eu^{\iu \abs{ω}t}\) to
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obtain
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\begin{equation}
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\label{eq:10}
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\tilde{H}_{I}= \frac{gΔx}{
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\sqrt{L_{A}}} ∑_{β,m}∫
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G'_{β}(ω) \eu^{-\iu
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(ω^{0}_{m}-\abs{ω}) t}
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U_{β,m} \tilde{f}_k^†\tilde{c}_{m} \dd{ω} + \hc
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\end{equation}
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\begin{figure}[H]
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\centering
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{\fontsize{8pt}{1em}
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\input{graphics/rwa_illustr.pdf_tex}}
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\caption{\label{fig:rwa_illustr} In the rotating wave approximation
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The bare frequencies of the resonator only couple to the
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transmission line in frequency sub-intervals
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\([ω_{m}-λ_{m}, ω_{m}+λ_{m}]\). A second effect that comes into
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play is the geometrically induced coupling amplitude \(\tilde{G'}_{m}(ω)\),
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which is visualized around \(ω_{m}\) under the assumption \(ω_{β}
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\approx ω_{0}^{m}\) for some small range of \(m\).}
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\end{figure}
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For \(g \ll ω_{m}^{0}\) each \(\tilde{c}_{m}\) in \cref{eq:10} only
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interacts with non-overlapping sub-intervals
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\([ω^{0}_{m}-λ_{m}, ω^{0}_{m}+λ_{m}]\) of the transmission frequency axis
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|
|
|
|
|
(rotating wave approximation) with \(g\ll λ_{m} \ll ω_{m}^{0}\). This
|
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|
|
|
situation is illustrated in \cref{fig:rwa_illustr}. Also, the coupling
|
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|
|
amplitude \(G_{β}(ω)\) is local in frequency space and can assist the
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|
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|
|
|
RWA depending on the choice of parameters and how close the
|
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\(ω^{0}_{m}\) are to the \(ω_{k_{β}}\). We obtain
|
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|
\begin{equation}
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|
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|
\label{eq:16}
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\tilde{H}_{I}\approx \frac{gΔx}{
|
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\sqrt{L_{A}}} ∑_{β,m}∫_{ω^{0}_{m}-λ_{m}}^{ω^{0}_{m}+λ_{m}}
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\eu^{-\iu
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(ω^{0}_{m}-\abs{ω}) t}
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|
U_{β,m} \pqty{G'_{β}(ω) \tilde{f}_{ω}^† + G'_{β}(-ω)
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\tilde{f}_{-ω}^†}\tilde{c}_{m} \dd{ω} + \hc
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|
\end{equation}
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|
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For any finite \(Δx\) and
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\(ω_{0}^{m},ω_{k_{β}}\gg \frac{2πc}{Δx n_{A}}\) we can assume
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\begin{equation}
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|
\label{eq:44}
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G'_{β}\pqty{-\sgn(β) ω}\approx 0
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|
\end{equation}
|
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in \cref{eq:16}.
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As each \(\tilde{c}_{m}\) is now interacting with non-overlapping
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|
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transmission-line field modes, we can introduce a separate field for
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each \(\tilde{c}_{m}\) that commutes with all other fields and extend
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the integration bounds to infinity again\footnote{This is called the
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|
|
``First Markov Approximation'' in \refcite{Gardiner1985}.}.
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Care has to be taken to maintain consistency with \cref{eq:44},
|
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\begin{equation}
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|
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|
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|
\label{eq:16}
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\tilde{H}_{I}= \frac{gΔx}{
|
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\sqrt{L_{A}}} ∑_{β,m}∫_{0}^{∞}
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|
\eu^{-\iu
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|
|
(ω^{0}_{m}-\abs{ω}) t}
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|
U_{β,m} G'_{β}(\sgn({β})ω) \tilde{f}^{m,†}_{\sgn({β})ω}{c}_{m} \dd{ω} + \hc
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|
|
|
|
\end{equation}
|
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|
|
which becomes\footnote{A lot of discussion for a simple result :).}
|
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|
|
\begin{equation}
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|
|
\label{eq:18}
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H_{I}= ∑_{m}∫_{-∞}^{∞}
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|
|
\tilde{G}_{m}(k) {b}^{m,†}_{k}{c}_{m} \dd{k}
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|
\end{equation}
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|
|
upon transitioning out of the rotating frame with \(\tilde{G}_{m}(k) =
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|
|
\frac{gΔx}{
|
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|
|
\sqrt{L_{A}}} ∑_{β\gtrless 0}U_{β,m} G_{β}(k)δ_{\sgn(β),\sgn(k)}\). The equation of motion
|
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|
|
for the transmission line modes become
|
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|
\begin{gather}
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|
\iu\dot{b}^{m}_{k} = ω^{B}_{k} b_{k}^{m,†} +
|
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|
|
\tilde{G}_{m}(k) c_{m}\\
|
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|
|
\label{eq:19}
|
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|
|
\implies b^{m}_{k}(t) = b^{m}_{k}(0) \eu^{-\iu ω_{k}^{B}t} -\iu
|
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|
|
\tilde{G}_{m}(k) ∫_{0}^{t}\eu^{-\iu
|
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|
|
ω_{k}^{B}(t-s)} c_{m}(s)\dd{s}.
|
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|
|
\end{gather}
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|
|
The equation of motion for \(\tilde{c}_{m}\) is
|
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|
|
\begin{equation}
|
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|
|
\label{eq:21}
|
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|
|
\iu\dot{\tilde{c}}_{m} = ∑_{n}V^{0}_{mn} \tilde{c}_n +
|
|
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|
|
\underbrace{\eu^{\iu ω_{m}^{0}t}∫_{-∞}^{∞}\tilde{G}^\ast_{m}(k)
|
|
|
|
|
|
b_{k}^{m}(t)\dd{k}}_{\equiv I}.
|
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|
|
\end{equation}
|
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|
|
Further inspection of the rightmost term in \cref{eq:21} yields
|
|
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|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:22}
|
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|
|
\begin{aligned}
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|
|
I &= \eu^{\iu ω_{m}^{0}t} ∫_{-∞}^{∞}\tilde{G}^\ast_{m}(k)
|
|
|
|
|
|
b_{k}^{m}(t)\dd{k} \\
|
|
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|
|
&= ∫_{-∞}^{∞}\tilde{G}^\ast_{m}(k)
|
|
|
|
|
|
b_{k}^{m}(0)\eu^{-\iu (ω^{B}_{k} - ω^{0}_{m})t}\dd{k} -\iu ∫_{0}^{t}∫_{-∞}^{∞}\abs{\tilde{G}_{m}(k)}^{2}
|
|
|
|
|
|
\tilde{c}_{m}(s)\eu^{-\iu ω^{B}_{k}(t-s)} \eu^{\iu
|
|
|
|
|
|
ω^{0}_{m}(t-s)}\dd{k}\dd{s}\\
|
|
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|
|
&=II + III.
|
|
|
|
|
|
\end{aligned}
|
|
|
|
|
|
\end{equation}
|
|
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|
|
|
Inspired by the RWA, we now assume
|
|
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|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:23}
|
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|
|
|
\begin{aligned}
|
|
|
|
|
|
\tilde{G}_{m}(k) &\approx
|
|
|
|
|
|
δ_{m}\tilde{G}_{m}\pqty{\sgn(k) ω_{m}^{0}\frac{n_{B}}{c n_{A}}} =
|
|
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|
|
|
δ_{m}\frac{gΔx}{\sqrt{L_{A}}}∑_{β}U_{βm}G_{β}\pqty{\sgn(k) ω_{m}^{0}\frac{n_{B}}{c
|
|
|
|
|
|
n_{A}}} δ_{\sgn(β),\sgn(k)} \\
|
|
|
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|
|
&\equiv ∑_{β}g^{0}_{β} U_{βm}δ_{\sgn(β),\sgn(k)} \equiv g_{m, \sgn(k)}
|
|
|
|
|
|
\end{aligned}
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
in the interval \([ω^{0}_{m}-λ_{m}, ω^{0}_{m}+λ_{m}]\) (see
|
|
|
|
|
|
\cref{eq:16}) where \(δ_{m}\) is a possible scaling factor to better approximate
|
|
|
|
|
|
\(\tilde{G}_{m}(k)\) as a constant in \cref{eq:16}.
|
|
|
|
|
|
|
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|
|
Additionally we resurrect\footnote{Within
|
|
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|
|
|
the RWA this is all equivalent, but I prefer having the input field
|
|
|
|
|
|
proportional to the electric field!} the \(ω_{k}^{B}\) dependence of
|
|
|
|
|
|
\(G_{m}(k)\) in \(I\) to obtain
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:24}
|
|
|
|
|
|
\begin{aligned}
|
|
|
|
|
|
II &= \frac{\eu^{\iu ω_{m}^{0}t}}{\sqrt{ω_{m}^{0}}} \bqty{g_{m,+}^\ast ∫_{0}^{∞}\sqrt{ω^{B}_{k}}b^{m}_{k}(0)\eu^{-\iu
|
|
|
|
|
|
ω^{B}_{k}t}\dd{k} + g_{m,-}^\ast∫_{-∞}^{0}\sqrt{ω^{B}_{k}}b^{m}_{k}(0)\eu^{-\iu
|
|
|
|
|
|
ω^{B}_{k}t}\dd{k}}\\
|
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|
|
|
|
&\equiv \frac{\eu^{\iu ω_{m}^{0}t}}{\sqrt{ω_{m}^{0}}}\pqty{
|
|
|
|
|
|
g_{m,+}^\ast b_{\inputf,+}^{m}(t) + g_{m,-}^\ast b_{\inputf,-}^{m}(t)},
|
|
|
|
|
|
\end{aligned}
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
where \(b_{\inputf,+(-)}^{m}(t)\) is identified as the
|
|
|
|
|
|
right(left)-moving input field and is proportional to the annihilation
|
|
|
|
|
|
part of the electric field. The second part of \cref{eq:22} becomes
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:25}
|
|
|
|
|
|
III= -\iu ∫_{0}^{t}\eu^{\iu ω^{0}_{m}(t-s)}\tilde{c}_{m}(s)
|
|
|
|
|
|
\bqty{ \abs{g_{m,+}}^{2} ∫_{0}^{∞}\eu^{-\iu ω^{B}_{k}(t-s)} \dd{k} + \abs{g_{m,-}}^{2} ∫_{-∞}^{0}\eu^{-\iu ω^{B}_{k}(t-s)} \dd{k}}\dd{s}.
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
Now we use the identity
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:26}
|
|
|
|
|
|
∫_{0}^{∞}\eu^{-\iu ω^{B}_{k}(t-s)} \dd{k} = \frac{n_{B}}{c}
|
|
|
|
|
|
\bqty{\mathcal{P}\frac{-i}{t-s} + π δ(t-s)},
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
but neglect the principal value, as it leads only to rapidly
|
|
|
|
|
|
oscillating terms that are inconsistent with the RWA, to obtain
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:27}
|
|
|
|
|
|
III= -2\iu η_{m}∫_{0}^{t}\eu^{\iu ω^{0}_m(t-s)}\tilde{c}_{m}(s)
|
|
|
|
|
|
δ(t-s)\dd{s} = -\iu η_{m} \tilde{c}_{m}(t),
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
where the factor \(1/2\) in the last equality stems from the fact that
|
|
|
|
|
|
we only use half of the delta function and
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:45}
|
|
|
|
|
|
η_{m}\equiv π\frac{n_{B}}{c}\bqty{\abs{g_{m,-}}^{2}+\abs{g_{m,+}}^{2}}.
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
Note that \cref{eq:45} is an incoherent sum of the couplings to the
|
|
|
|
|
|
right moving and left moving fields in the transmission line.
|
|
|
|
|
|
Altogether we arrive at
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:28}
|
|
|
|
|
|
\dot{\tilde{c}}_{m} = -\iu\bqty{∑_{n}V^{0}_{mn} \tilde{c}_n +
|
|
|
|
|
|
\frac{\eu^{\iu ω_{m}^{0}t}}{\sqrt{ω_{m}^{0}}}
|
2023-06-08 16:30:56 -04:00
|
|
|
|
∑_{σ=\pm}g_{m,σ}^\ast b_{\inputf,+}^{m}(t)} - η_{m}\tilde{c}_{m}(t).
|
2023-06-08 16:26:31 -04:00
|
|
|
|
\end{equation}
|
|
|
|
|
|
The usual situation is that \(b^{m}_{\inputf, -} = 0\) and we can
|
|
|
|
|
|
restrict ourselves to the coupling to the right-moving input field.
|
|
|
|
|
|
|
|
|
|
|
|
\subsection{Input-Output Relation and further Simplifications}
|
|
|
|
|
|
\label{sec:input-outp-relat}
|
|
|
|
|
|
Integrating \cref{eq:19} over all \(k\) yields
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:29}
|
|
|
|
|
|
\begin{aligned}
|
|
|
|
|
|
\frac{b_{\outputf}^{m}(x,t)}{\sqrt{ω^{0}_{m}}} &\equiv
|
|
|
|
|
|
\frac{1}{\sqrt{ω_{m}^{0}}}∫ \sqrt{ω^{B}_{k}} b_{k}^{m}(t) \eu^{\iu k
|
|
|
|
|
|
t}\dd{k}\\
|
|
|
|
|
|
&=
|
|
|
|
|
|
\frac{1}{\sqrt{ω_{m}^{0}}} b_{\inputf}^{m}(x, t) -\iu
|
|
|
|
|
|
g_{m,\sgn(x)}\frac{π n_{B}}{c}
|
|
|
|
|
|
\tilde{c}_{m}(τ(x,t))\eu^{-i ω^{0}_{m}τ(x,t)}Θ(τ(x,t)),
|
|
|
|
|
|
\end{aligned}
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
which is the input-output relation with the retarded time
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:20}
|
|
|
|
|
|
τ(x,t)=t - \frac{\abs{x}n_{B}}{c}.
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
The coupling constant accounts for the direction of propagation and
|
|
|
|
|
|
the time argument is properly retarded. We defined
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:48}
|
|
|
|
|
|
b_{\inputf}^{m}(x,t) = ∫\sqrt{ω^{B}_{k}} b_{k}^{m}(0)\eu^{\iu \pqty{kx -
|
|
|
|
|
|
ω_{k}^{B}t}}\dd{k}
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
used that
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:42}
|
|
|
|
|
|
∫_{0}^{∞}\eu^{-\iu ω^{B}_{k}(t-s)}\eu^{\pm\iu k x} \dd{k} =
|
|
|
|
|
|
\frac{n_{B}}{c}
|
|
|
|
|
|
\bqty{\mathcal{P}\frac{-i}{t-s \pm \frac{x n_{B}}{c}} + π δ\pqty{t-s\mp
|
|
|
|
|
|
\frac{x n_{B}}{c}}}.
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
|
|
|
|
|
|
The case of \(x=0\) is recovered by defining
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:47}
|
|
|
|
|
|
\lim_{x\to0} g_{m,\sgn(x)=0} = \frac{1}{2} \pqty{g_{m,+} + g_{m,-}},
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
which amounts to taking half of each delta function in
|
|
|
|
|
|
\cref{eq:42}. It shall be noted, that it is physical to assume
|
|
|
|
|
|
\(x>0\), as we necessarily measure outside the fibre-coupler between
|
|
|
|
|
|
transmission line and resonator. By neglecting the \(k\)-depnedence of
|
|
|
|
|
|
the coupling in \cref{eq:23} through invocation of the RWA we have
|
|
|
|
|
|
effectively ignored length \(Δx\), but to maintain consistency with
|
|
|
|
|
|
\cref{eq:44} we should assume it to be finite.
|
|
|
|
|
|
We can also neglect the retardation if \(x / v_{g}\) is
|
|
|
|
|
|
much smaller than a typical timescale we're interested in.
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
To integrate \cref{eq:28}, we
|
|
|
|
|
|
first diagonalize \(V^{0}_{mn}\)
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:32}
|
|
|
|
|
|
\dot{d}_{γ} = ∑_{m}O^{\ast}_{mγ}\dot{\tilde{c}}_{m} = -\iu\bqty{ω_{ω_{γ}}d_{γ} +
|
|
|
|
|
|
∑_{σ=\pm}∑_{m}O^{\ast}_{mγ}\frac{g_{m,σ}^\ast }{\sqrt{ω_{m}^{0}}} \eu^{\iu ω_{m}^{0}t}
|
|
|
|
|
|
b_{\inputf,σ}^{m}(t)} - π∑_{m}O^{\ast}_{mγ}η_{m}\tilde{c}_{m}(t).
|
|
|
|
|
|
\end{equation}
|
|
|
|
|
|
|
|
|
|
|
|
We now introduce some additional simplifications. As the coupling to
|
|
|
|
|
|
the transmission line is likely not the only source of loss it is
|
|
|
|
|
|
justified to replace \(η_{m}\) with a constant \(η\) as the simplest
|
|
|
|
|
|
choice. Further, we equate all input fields \(b_{\inputf}^{m}\). This
|
|
|
|
|
|
is allowed, as we will transition to the classical picture later,
|
|
|
|
|
|
where the commutation relations do not matter. We also assume that
|
|
|
|
|
|
we're working in a region in \(m\) space, where the
|
|
|
|
|
|
\(g_{β}^{0}\approx \sqrt{κ}\) and
|
|
|
|
|
|
\(\sqrt{ω^{0}_{m}}\approx\sqrt{ω_{0}}\), where \(ω_{0}\) is a typical
|
|
|
|
|
|
frequency in the input field, can be assumed to be approximately
|
|
|
|
|
|
constant. With these considerations in mind we can simplify
|
|
|
|
|
|
\cref{eq:32} to
|
|
|
|
|
|
\begin{gather}
|
|
|
|
|
|
\label{eq:34}
|
|
|
|
|
|
\dot{d}_{γ} = ∑_{m}O^{\ast}_{mγ}\dot{\tilde{c}}_{m} =
|
|
|
|
|
|
-\iu\bqty{{ω_{γ}}d_{γ} + \sqrt{κ} ∑_{σ=\pm}
|
|
|
|
|
|
U^{\pm}_{γ}(t) \frac{b_{\inputf}(t)}{\sqrt{ω_{0}}}} - η d_{γ}\\
|
|
|
|
|
|
U^{σ}_{γ}(t) = ∑_{m,β} δ_{\sgn({β}),σ}U^\ast_{βm}O^\ast_{mγ} \eu^{\iu ω_{m}^{0}t}
|
|
|
|
|
|
\end{gather}
|
|
|
|
|
|
These simplifications still capture the essence of the physics, as
|
|
|
|
|
|
demonstrated in the current long-range SSH experiment.
|
|
|
|
|
|
|
|
|
|
|
|
We can now proceed to integrate \cref{eq:34} to obtain
|
|
|
|
|
|
\begin{equation}
|
|
|
|
|
|
\label{eq:36}
|
|
|
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d_{γ}(t)= d_{γ}(0) \eu^{-\pqty{\iu ω_{γ} + η}t} -
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\frac{i}{\sqrt{κ}} Σ_{σ=\pm} ∫_{0}^{t}χ_{γ}(t-s) U^{σ}_{γ}(s)
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\frac{b_{\inputf,σ}(t)}{\sqrt{ω_{0}}}\dd{s}
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\end{equation}
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with
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\begin{equation}
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\label{eq:37}
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χ_{γ}(t) = κ \eu^{-\pqty{\iu ω_{γ} + η}t}.
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\end{equation}
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When constructing the total output field, we have to remember how the
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separate fields \(b_{\outputf,m}\) came about. We assumed that each
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\(c_{m}\) only interacted with a finite range of modes (see
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\cref{eq:16}) in the transmission line and then just extended the
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resulting sub-fields back to full independent fields for
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simplicity. Now, we have to perform the reverse process, which amounts
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to summing together all system (resonator) contributions in
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\cref{eq:34} as these only excite the sub-fields and we can safely
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glue them back together. To be consistent, we have to sum together the
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finite ranges of the input fields which amounts to having \emph{one}
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whole copy of the input field.
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This leads us to
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\begin{equation}
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\label{eq:38}
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\frac{b_{\outputf}(x,t)}{\sqrt{ω_{0}}} \equiv
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\frac{1}{\sqrt{ω_{0}}} b_{\inputf}(x, t) -i θ(τ(x,t)) \frac{\sqrt{κ}πn_{B}}{c}
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∑_{γ}\bqty{U^{\sgn(x)}_{γ}\pqty{τ(x,t)}}^\ast d_{γ}(τ(x,t))
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\end{equation}
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Transitioning to expectation values and using \(\ev{d_{γ}(0)}=0\) we
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find
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\begin{equation}
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\label{eq:39}
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\ev{{b_{\outputf}(x,t)}} =
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\ev{b_{\inputf}(x,t)} - ∑_{σ=\pm}∫_{0}^{τ(x,t)}χ_{σ,\sgn(x)}(τ(x,t),s) \ev{b_{\inputf,σ}(s)} \dd{s}
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\end{equation}
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with the time non-local susceptibility for the left and right moving
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input fields
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\begin{equation}
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\label{eq:40}
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χ_{σ,δ}(t,s) = \frac{π n_{B}}{c}Θ(t) ∑_{γ}\pqty{U^{δ}_{γ}(t)}^\astχ_{γ}(t-s)U^{σ}_{γ}(s).
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\end{equation}
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For an input field with no left-moving components and a measurement
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position \(x>0\) we have
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\begin{equation}
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\label{eq:31}
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\ev{{b_{\outputf}(x>0,t)}} =
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\ev{b_{\inputf}(x,t)} -∫_{0}^{τ(x,t)}χ_{++}(τ(x,t),s) \ev{b_{\inputf}(s)} \dd{s}.
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\end{equation}
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with \(b_{\inputf}(s) = b_{\inputf,+}(s) + b_{\inputf,-}(s) = b_{\inputf,+}(s)\).
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\newpage
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\printbibliography{}
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\end{document}
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