Related papers: Error bounds for Lie Group representations in quantum mechanics

Error bounds for Lie Group representations in quantum mechanics

URL: http://arxiv.org/abs/2211.08582v2
Date: Mon, 26 Feb 2024 23:24:34 GMT
Title: Error bounds for Lie Group representations in quantum mechanics
Authors: Lauritz van Luijk, Niklas Galke, Alexander Hahn, Daniel Burgarth
Abstract summary: We provide state-dependent error bounds for strongly continuous unitary representations of Lie groups. Our method works for any connected Lie group and the metric is independent of the chosen representation.
Score: 44.99833362998488
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We provide state-dependent error bounds for strongly continuous unitary representations of connected Lie groups. That is, we bound the difference of two unitaries applied to a state in terms of the energy with respect to a reference Hamiltonian associated to the representation and a left-invariant metric distance on the group. Our method works for any connected Lie group and the metric is independent of the chosen representation. The approach also applies to projective representations and allows us to provide bounds on the energy constrained diamond norm distance of any suitably continuous channel representation of the group.

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