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Hauptverfasser: Dias, Beatriz, Koenig, Robert
Format: Preprint
Veröffentlicht: 2025
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2501.17071
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author Dias, Beatriz
Koenig, Robert
author_facet Dias, Beatriz
Koenig, Robert
contents We consider the problem of sampling from the distribution of measurement outcomes when applying a POVM to a superposition $|Ψ\rangle = \sum_{j=0}^{χ-1} c_j |ψ_j\rangle$ of $χ$ pure states. We relate this problem to that of drawing samples from the outcome distribution when measuring a single state $|ψ_j\rangle$ in the superposition. Here $j$ is drawn from the distribution $p(j)=|c_j|^2/\|c\|^2_2$ of normalized amplitudes. We give an algorithm which $-$ given $O(χ\|c\|_2^2 \log1/δ)$ such samples and calls to oracles evaluating the involved probability density functions $-$ outputs a sample from the target distribution except with probability at most $δ$. In many cases of interest, the POVM and individual states in the superposition have efficient classical descriptions allowing to evaluate matrix elements of POVM elements and to draw samples from outcome distributions. In such a scenario, our algorithm gives a reduction from strong classical simulation (i.e., the problem of computing outcome probabilities) to weak simulation (i.e., the problem of sampling). In contrast to prior work focusing on finite-outcome POVMs, this reduction also applies to continuous-outcome POVMs. An example is homodyne or heterodyne measurements applied to a superposition of Gaussian states. Here we obtain a sampling algorithm with time complexity $O(N^3 χ^3 \|c\|_2^2 \log1/δ)$ for a state of $N$ bosonic modes.
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the sampling complexity of coherent superpositions
Dias, Beatriz
Koenig, Robert
Quantum Physics
We consider the problem of sampling from the distribution of measurement outcomes when applying a POVM to a superposition $|Ψ\rangle = \sum_{j=0}^{χ-1} c_j |ψ_j\rangle$ of $χ$ pure states. We relate this problem to that of drawing samples from the outcome distribution when measuring a single state $|ψ_j\rangle$ in the superposition. Here $j$ is drawn from the distribution $p(j)=|c_j|^2/\|c\|^2_2$ of normalized amplitudes. We give an algorithm which $-$ given $O(χ\|c\|_2^2 \log1/δ)$ such samples and calls to oracles evaluating the involved probability density functions $-$ outputs a sample from the target distribution except with probability at most $δ$. In many cases of interest, the POVM and individual states in the superposition have efficient classical descriptions allowing to evaluate matrix elements of POVM elements and to draw samples from outcome distributions. In such a scenario, our algorithm gives a reduction from strong classical simulation (i.e., the problem of computing outcome probabilities) to weak simulation (i.e., the problem of sampling). In contrast to prior work focusing on finite-outcome POVMs, this reduction also applies to continuous-outcome POVMs. An example is homodyne or heterodyne measurements applied to a superposition of Gaussian states. Here we obtain a sampling algorithm with time complexity $O(N^3 χ^3 \|c\|_2^2 \log1/δ)$ for a state of $N$ bosonic modes.
title On the sampling complexity of coherent superpositions
topic Quantum Physics
url https://arxiv.org/abs/2501.17071