Variational quantum algorithms to estimate rank, quantum entropies, fidelity, and Fisher information via purity minimization
Kok Chuan Tan, Tyler Volkoff
Abstract
Variational quantum algorithms (VQAs) that estimate values of widely used physical quantities such as the rank, the quantum entropies, the Bures fidelity, and the quantum Fisher information of mixed quantum states are developed. In addition, variations of these VQAs are also adapted to perform other useful functions such as quantum state learning and approximate fractional inverses. The common theme shared by the proposed algorithms is that their cost functions are all based on minimizing the quantum purity of a quantum state. Strategies to mitigate or avoid the problem of exponentially vanishing cost function gradients are also discussed.
Topics & Concepts
Quantum algorithmQuantum phase estimation algorithmQuantumMinificationMathematicsAlgorithmFunction (biology)Quantum stateFisher informationQuantum operationQuantum error correctionQuantum informationState (computer science)Statistical physicsQuantum processQuantum discordQuantum capacityApplied mathematicsQuantum channelQuantum systemComputer scienceQuantum computerQuantum Fourier transformAmplitude damping channelQuantum sortQuantum networkOpen quantum systemQuantum Computing Algorithms and ArchitectureQuantum Information and CryptographyMetaheuristic Optimization Algorithms Research