Singular value transformation for unknown quantum channels
Abstract
Given the ability to apply an unknown quantum channel acting on a -dimensional system, we develop a quantum algorithm for transforming its singular values. The spectrum of a quantum channel as a superoperator is naturally tied to its Liouville representation, which is in general non-Hermitian. Our key contribution is an approximate block-encoding scheme for this representation in a Hermitized form, given only black-box access to the channel; this immediately allows us to apply polynomial transformations to the channel's singular values by quantum singular value transformation (QSVT). We then demonstrate an upper bound and an lower bound for the query complexity of constructing a quantum channel that is -close in diamond norm to a block-encoding of the Hermitized Liouville representation. We show our method applies practically to the problem of learning the -th singular value moments of unknown quantum channels for arbitrary , which has implications for testing if a quantum channel is entanglement breaking.
Cite
@article{arxiv.2506.24112,
title = {Singular value transformation for unknown quantum channels},
author = {Ryotaro Niwa and Zane Marius Rossi and Philip Taranto and Mio Murao},
journal= {arXiv preprint arXiv:2506.24112},
year = {2025}
}
Comments
5+14 pages, 6 figures. v2; Due to an erroneous analysis of the 2nd order term, claims have been weakened. The upper-bound and query complexity have been correspondingly fixed