Related papers: Geometric aspects of analog quantum search evolutions

Geometric aspects of analog quantum search evolutions

URL: http://arxiv.org/abs/2008.07675v2
Date: Wed, 11 Nov 2020 10:52:29 GMT
Title: Geometric aspects of analog quantum search evolutions
Authors: Carlo Cafaro, Shannon Ray, Paul M. Alsing
Abstract summary: We show that the Farhi-Gutmann time optimal analog quantum search evolution is characterized by unit efficiency dynamical trajectories traced on a projective Hilbert space. We briefly discuss possible extensions of our work to the geometric analysis of the efficiency of thermal trajectories of relevance in quantum computing tasks.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We use geometric concepts originally proposed by Anandan and Aharonov to show that the Farhi-Gutmann time optimal analog quantum search evolution between two orthogonal quantum states is characterized by unit efficiency dynamical trajectories traced on a projective Hilbert space. In particular, we prove that these optimal dynamical trajectories are the shortest geodesic paths joining the initial and the final states of the quantum evolution. In addition, we verify they describe minimum uncertainty evolutions specified by an uncertainty inequality that is tighter than the ordinary time-energy uncertainty relation. We also study the effects of deviations from the time optimality condition from our proposed Riemannian geometric perspective. Furthermore, after pointing out some physically intuitive aspects offered by our geometric approach to quantum searching, we mention some practically relevant physical insights that could emerge from the application of our geometric analysis to more realistic time-dependent quantum search evolutions. Finally, we briefly discuss possible extensions of our work to the geometric analysis of the efficiency of thermal trajectories of relevance in quantum computing tasks.

Related papers

Quantum Natural Stochastic Pairwise Coordinate Descent [6.187270874122921]
Quantum machine learning through variational quantum algorithms (VQAs) has gained substantial attention in recent years. This paper introduces the quantum natural pairwise coordinate descent (2QNSCD) optimization method. We develop a highly sparse unbiased estimator of the novel metric tensor using a quantum circuit with gate complexity $Theta(1)$ times that of the parameterized quantum circuit and single-shot quantum measurements.
arXiv Detail & Related papers (2024-07-18T18:57:29Z)
Physical consequences of gauge optimization in quantum open systems evolutions [44.99833362998488]
We show that gauge transformations can be exploited, on their own, to optimize practical physical tasks. First, we describe the inherent structure of the underlying symmetries in quantum Markovian dynamics. We then analyze examples of optimization in quantum thermodynamics.
arXiv Detail & Related papers (2024-07-02T18:22:11Z)
Action formalism for geometric phases from self-closing quantum trajectories [55.2480439325792]
We study the geometric phase of a subset of self-closing trajectories induced by a continuous Gaussian measurement of a single qubit system. We show that the geometric phase of the most likely trajectories undergoes a topological transition for self-closing trajectories as a function of the measurement strength parameter.
arXiv Detail & Related papers (2023-12-22T15:20:02Z)
Upper limit on the acceleration of a quantum evolution in projective Hilbert space [0.0]
We derive an upper bound for the rate of change of the speed of transportation in an arbitrary finite-dimensional projective Hilbert space. We show that the acceleration squared of a quantum evolution in projective space is upper bounded by the variance of the temporal rate of change of the Hamiltonian operator.
arXiv Detail & Related papers (2023-11-30T11:22:59Z)
Geometric phases along quantum trajectories [58.720142291102135]
We study the distribution function of geometric phases in monitored quantum systems. For the single trajectory exhibiting no quantum jumps, a topological transition in the phase acquired after a cycle. For the same parameters, the density matrix does not show any interference.
arXiv Detail & Related papers (2023-01-10T22:05:18Z)
Qubit Geodesics on the Bloch Sphere from Optimal-Speed Hamiltonian Evolutions [0.0]
We present an explicit geodesic analysis of the trajectories that emerge from the quantum evolution of a single-qubit quantum state. In addition to viewing geodesics in ray space as paths of minimal length, we also verify the geodesicity of paths in terms of unit geometric efficiency and vanishing geometric phase.
arXiv Detail & Related papers (2022-10-17T14:44:03Z)
Nonadiabatic geometric quantum computation with shortened path on superconducting circuits [3.0726135239588164]
We present an effective scheme to find the shortest geometric path under the conventional conditions of geometric quantum computation. High-fidelity and robust geometric gates can be realized by only single-loop evolution. Our scheme is promising for large-scale fault-tolerant quantum computation.
arXiv Detail & Related papers (2021-11-02T08:03:38Z)
Minimum time for the evolution to a nonorthogonal quantum state and upper bound of the geometric efficiency of quantum evolutions [0.0]
We present a proof of the minimum time for the quantum evolution between two arbitrary states. We discuss the roles played by either minimum-time or maximum-energy uncertainty concepts in defining a geometric efficiency measure.
arXiv Detail & Related papers (2021-06-17T10:51:10Z)
Quantum simulation of gauge theory via orbifold lattice [47.28069960496992]
We propose a new framework for simulating $textU(k)$ Yang-Mills theory on a universal quantum computer. We discuss the application of our constructions to computing static properties and real-time dynamics of Yang-Mills theories.
arXiv Detail & Related papers (2020-11-12T18:49:11Z)
Optimization with Momentum: Dynamical, Control-Theoretic, and Symplectic Perspectives [97.16266088683061]
The article rigorously establishes why symplectic discretization schemes are important for momentum-based optimization algorithms. It provides a characterization of algorithms that exhibit accelerated convergence.
arXiv Detail & Related papers (2020-02-28T00:32:47Z)
Quantum probes for universal gravity corrections [62.997667081978825]
We review the concept of minimum length and show how it induces a perturbative term appearing in the Hamiltonian of any quantum system. We evaluate the Quantum Fisher Information in order to find the ultimate bounds to the precision of any estimation procedure. Our results show that quantum probes are convenient resources, providing potential enhancement in precision.
arXiv Detail & Related papers (2020-02-13T19:35:07Z)

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