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Autori principali: Nemkov, Nikita A., Kiktenko, Evgeniy O., Fedorov, Aleksey K.
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2405.05332
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author Nemkov, Nikita A.
Kiktenko, Evgeniy O.
Fedorov, Aleksey K.
author_facet Nemkov, Nikita A.
Kiktenko, Evgeniy O.
Fedorov, Aleksey K.
contents Two main challenges preventing efficient training of variational quantum algorithms and quantum machine learning models are local minima and barren plateaus. Typically, barren plateaus are associated with deep circuits, while shallow circuits have been shown to suffer from suboptimal local minima. We point out a simple mechanism that creates exponentially many poor local minima specifically in the barren plateau regime. These local minima are trivial solutions, optimizing only a few terms in the loss function, leaving the rest on their barren plateaus. More precisely, we show the existence of approximate local minima, optimizing a single loss term, and conjecture the existence of exact local minima, optimizing only a logarithmic fraction of all loss function terms. One implication of our findings is that simply yielding large gradients is not sufficient to render an initialization strategy a meaningful solution to the barren plateau problem.
format Preprint
id arxiv_https___arxiv_org_abs_2405_05332
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Barren plateaus are swamped with traps
Nemkov, Nikita A.
Kiktenko, Evgeniy O.
Fedorov, Aleksey K.
Quantum Physics
Two main challenges preventing efficient training of variational quantum algorithms and quantum machine learning models are local minima and barren plateaus. Typically, barren plateaus are associated with deep circuits, while shallow circuits have been shown to suffer from suboptimal local minima. We point out a simple mechanism that creates exponentially many poor local minima specifically in the barren plateau regime. These local minima are trivial solutions, optimizing only a few terms in the loss function, leaving the rest on their barren plateaus. More precisely, we show the existence of approximate local minima, optimizing a single loss term, and conjecture the existence of exact local minima, optimizing only a logarithmic fraction of all loss function terms. One implication of our findings is that simply yielding large gradients is not sufficient to render an initialization strategy a meaningful solution to the barren plateau problem.
title Barren plateaus are swamped with traps
topic Quantum Physics
url https://arxiv.org/abs/2405.05332