High Fidelity Quantum State Transfer by Pontryagin Maximum Principle

• URL: http://arxiv.org/abs/2203.04361v2
• Date: Thu, 10 Mar 2022 10:33:27 GMT
• Title: High Fidelity Quantum State Transfer by Pontryagin Maximum Principle
• Authors: Nahid Binandeh Dehaghani and Fernando Lobo Pereira
• Abstract summary: We address the problem of maximizing the fidelity in a quantum state transformation process satisfying the Liouville-von Neumann equation. By introducing fidelity as the performance index, we aim at maximizing the similarity of the final state density operator with the one of the desired target state.
• Score: 68.8204255655161
• License: http://creativecommons.org/licenses/by/4.0/
• Abstract: High fidelity quantum state transfer is an essential part of quantum information processing. In this regard, we address the problem of maximizing the fidelity in a quantum state transformation process satisfying the Liouville-von Neumann equation. By introducing fidelity as the performance index, we aim at maximizing the similarity of the final state density operator with the one of the desired target state. Optimality conditions in the form of a Maximum Principle of Pontryagin are given for the matrix-valued dynamic control systems propagating the probability density function. These provide a complete set of relations enabling the computation of the optimal control strategy.

Related papers

• An Application of Pontryagin Neural Networks to Solve Optimal Quantum Control Problems [1.5469452301122175]
  Pontryagin maximum principle has proved to play an important role to achieve the maximum fidelity in an optimum time or energy. We formulate a control constrained optimal control problem where we aim to minimize time and also energy subjected to a quantum system satisfying the bilinear Schrodinger equation. We make use of the so-called "qutip" package in python, and the newly developed "tfc" python package.
  arXiv  Detail & Related papers  (2023-02-01T17:48:07Z)
• Quantum State Transfer Optimization: Balancing Fidelity and Energy Consumption using Pontryagin Maximum Principle [1.0819408603463425]
  We aim to navigate a quantum system from an initial state to a desired state while adhering to the principles of the Liouville-von Neumann equation. We derive optimality conditions in the form of the Pontryagin Principle (PMP) for the matrix-valued dynamics associated with this problem. We present a time-discretized computational scheme designed to solve the optimal control problem.
  arXiv  Detail & Related papers  (2023-01-30T12:53:48Z)
• A self-consistent field approach for the variational quantum eigensolver: orbital optimization goes adaptive [52.77024349608834]
  We present a self consistent field approach (SCF) within the Adaptive Derivative-Assembled Problem-Assembled Ansatz Variational Eigensolver (ADAPTVQE) This framework is used for efficient quantum simulations of chemical systems on nearterm quantum computers.
  arXiv  Detail & Related papers  (2022-12-21T23:15:17Z)
• Evaluating the Convergence of Tabu Enhanced Hybrid Quantum Optimization [58.720142291102135]
  We introduce the Tabu Enhanced Hybrid Quantum Optimization metaheuristic approach useful for optimization problem solving on a quantum hardware. We address the theoretical convergence of the proposed scheme from the viewpoint of the collisions in the object which stores the tabu states, based on the Ising model.
  arXiv  Detail & Related papers  (2022-09-05T07:23:03Z)
• Improved Quantum Algorithms for Fidelity Estimation [77.34726150561087]
  We develop new and efficient quantum algorithms for fidelity estimation with provable performance guarantees. Our algorithms use advanced quantum linear algebra techniques, such as the quantum singular value transformation. We prove that fidelity estimation to any non-trivial constant additive accuracy is hard in general.
  arXiv  Detail & Related papers  (2022-03-30T02:02:16Z)
• A Quantum Optimal Control Problem with State Constrained Preserving Coherence [68.8204255655161]
  We consider a three-level $Lambda$-type atom subjected to Markovian decoherence characterized by non-unital decoherence channels. We formulate the quantum optimal control problem with state constraints where the decoherence level remains within a pre-defined bound.
  arXiv  Detail & Related papers  (2022-03-24T21:31:34Z)
• Realization of arbitrary doubly-controlled quantum phase gates [62.997667081978825]
  We introduce a high-fidelity gate set inspired by a proposal for near-term quantum advantage in optimization problems. By orchestrating coherent, multi-level control over three transmon qutrits, we synthesize a family of deterministic, continuous-angle quantum phase gates acting in the natural three-qubit computational basis.
  arXiv  Detail & Related papers  (2021-08-03T17:49:09Z)
• Optimal Control for Quantum Metrology via Pontryagin's principle [8.920103626492315]
  We apply Pontryagin's Maximum Principle to determine the optimal protocol that maximizes the quantum Fisher information for a given evolution time. The proposed formalism is generalized to problems with control constraints, and can also be used to maximize the classical Fisher information for a chosen measurement.
  arXiv  Detail & Related papers  (2021-05-14T16:22:57Z)
• High-fidelity State Transfer Between Leaky Quantum Memories [0.0]
  We derive the optimal analytical quantum-state-transfer control solutions for two disparate quantum memory blocks. Using the SLH formalism description of quantum network theory, we calculate the full quantum dynamics of system populations.
  arXiv  Detail & Related papers  (2020-05-26T21:53:03Z)

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

This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.