Related papers: Unitary operator bases as universal averaging sets

Unitary operator bases as universal averaging sets

URL: http://arxiv.org/abs/2503.17091v1
Date: Fri, 21 Mar 2025 12:19:16 GMT
Title: Unitary operator bases as universal averaging sets
Authors: Marcin Markiewicz, Konrad Schlichtholz,
Abstract summary: We provide a generalization of the idea of unitary designs to cover finite averaging over much more general operations on quantum states.<n> Namely, we construct finite averaging sets for averaging quantum states over arbitrary reductive Lie groups, on condition that the averaging is performed uniformly over the compact component of the group.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We provide a generalization of the idea of unitary designs to cover finite averaging over much more general operations on quantum states. Namely, we construct finite averaging sets for averaging quantum states over arbitrary reductive Lie groups, on condition that the averaging is performed uniformly over the compact component of the group. Our construction comprises probabilistic mixtures of unitary 1-designs on specific operator subspaces. Provided construction is very general, competitive in the size of the averaging set when compared to other known constructions, and can be efficiently implemented in the quantum circuit model of computation.

Related papers

Quantum Reference Frames on Homogeneous Spaces [0.0]
Properties of operator-valued integration are first studied and then employed to define general relativization maps and show their properties. The relativization maps presented here are defined for QRFs based on arbitrary homogeneous spaces of locally compact second countable topological groups.
arXiv Detail & Related papers (2024-09-11T12:44:34Z)
Absolute dimensionality of quantum ensembles [41.94295877935867]
The dimension of a quantum state is traditionally seen as the number of superposed distinguishable states in a given basis. We propose an absolute, i.e.basis-independent, notion of dimensionality for ensembles of quantum states.
arXiv Detail & Related papers (2024-09-03T09:54:15Z)
Classification of qubit cellular automata on hypercubic lattices [45.279573215172285]
We classify qubit QCAs on lattices $mathbb Zs$ with von Neumann neighbourhood scheme, in terms of feasibility as finite depth quantum circuits. We show the most general structure of such quantum circuit and use its characterisation to simulate a few steps of evolution and evaluate the rate of entanglement production between one cell and its surroundings.
arXiv Detail & Related papers (2024-08-08T14:42:39Z)
Equivalence of dynamics of disordered quantum ensembles and semi-infinite lattices [44.99833362998488]
We develop a formalism for mapping the exact dynamics of an ensemble of disordered quantum systems onto the dynamics of a single particle propagating along a semi-infinite lattice. This mapping provides a geometric interpretation on the loss of coherence when averaging over the ensemble and allows computation of the exact dynamics of the entire disordered ensemble in a single simulation.
arXiv Detail & Related papers (2024-06-25T18:13:38Z)
Sufficient condition for universal quantum computation using bosonic circuits [44.99833362998488]
We focus on promoting circuits that are otherwise simulatable to computational universality. We first introduce a general framework for mapping a continuous-variable state into a qubit state. We then cast existing maps into this framework, including the modular and stabilizer subsystem decompositions.
arXiv Detail & Related papers (2023-09-14T16:15:14Z)
Determining the ability for universal quantum computing: Testing controllability via dimensional expressivity [39.58317527488534]
Controllability tests can be used in the design of quantum devices to reduce the number of external controls. We devise a hybrid quantum-classical algorithm based on a parametrized quantum circuit.
arXiv Detail & Related papers (2023-08-01T15:33:41Z)
Duality of averaging of quantum states over arbitrary symmetry groups revealing Schur-Weyl duality [0.0]
We introduce a name for this property: duality of averaging. We show, that in the case of finite dimensional quantum systems such duality of averaging holds for any pairs of symmetry groups being dual reductive pairs.
arXiv Detail & Related papers (2022-08-16T11:58:13Z)
The vacuum provides quantum advantage to otherwise simulatable architectures [49.1574468325115]
We consider a computational model composed of ideal Gottesman-Kitaev-Preskill stabilizer states. We provide an algorithm to calculate the probability density function of the measurement outcomes.
arXiv Detail & Related papers (2022-05-19T18:03:17Z)
Classical shadows with Pauli-invariant unitary ensembles [0.0]
We consider the class of Pauli-invariant unitary ensembles that are invariant under multiplication by a Pauli operator. Our results pave the way for more efficient or robust protocols for predicting important properties of quantum states.
arXiv Detail & Related papers (2022-02-07T15:06:30Z)
Generalization Metrics for Practical Quantum Advantage in Generative Models [68.8204255655161]
Generative modeling is a widely accepted natural use case for quantum computers. We construct a simple and unambiguous approach to probe practical quantum advantage for generative modeling by measuring the algorithm's generalization performance. Our simulation results show that our quantum-inspired models have up to a $68 times$ enhancement in generating unseen unique and valid samples.
arXiv Detail & Related papers (2022-01-21T16:35:35Z)
Compressing Many-Body Fermion Operators Under Unitary Constraints [0.6445605125467573]
We introduce a numerical algorithm for performing factorization that has an complexity no worse than single particle basis transformations of the two-body operators. As an application of this numerical procedure, we demonstrate that our protocol can be used to approximate generic unitary coupled cluster operators.
arXiv Detail & Related papers (2021-09-10T17:42:18Z)
On construction of finite averaging sets for $SL(2, \mathbb{C})$ via its Cartan decomposition [0.0]
Averaging physical quantities over Lie groups appears in many contexts like quantum information science or quantum optics. In this work we investigate the problem of constructing finite averaging sets for averaging over general non-compact matrix Lie groups. We provide an explicit calculation of such sets for the group $SL(2, mathbbC)$, although our construction can be applied to other cases.
arXiv Detail & Related papers (2020-10-29T17:26:33Z)

This list is automatically generated from the titles and abstracts of the papers in this site.