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Quantum algorithm for time-dependent differential equations using Dyson series

Dominic W. Berry, Pedro C. S. Costa

2024Quantum25 citationsDOIOpen Access PDF

Abstract

Time-dependent linear differential equations are a common type of problem that needs to be solved in classical physics. Here we provide a quantum algorithm for solving time-dependent linear differential equations with logarithmic dependence of the complexity on the error and derivative. As usual, there is an exponential improvement over classical approaches in the scaling of the complexity with the dimension, with the caveat that the solution is encoded in the amplitudes of a quantum state. Our method is to encode the Dyson series in a system of linear equations, then solve via the optimal quantum linear equation solver. Our method also provides a simplified approach in the case of time-independent differential equations.

Topics & Concepts

MathematicsLinear differential equationQuantumQuantum algorithmDimension (graph theory)Series (stratigraphy)Differential equationApplied mathematicsLogarithmQuantum algorithm for linear systems of equationsAlgorithmMathematical analysisQuantum processQuantum mechanicsQuantum dynamicsPhysicsPure mathematicsPaleontologyBiologyQuantum Computing Algorithms and ArchitectureQuantum Information and CryptographyQuantum Mechanics and Applications
Quantum algorithm for time-dependent differential equations using Dyson series | Litcius