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arxiv: 2408.02572 · v3 · pith:JFOMR5O6new · submitted 2024-08-05 · 🪐 quant-ph · math.OC

Non-commutative optimization problems with differential constraints

classification 🪐 quant-ph math.OC
keywords problemsdifferentialhierarchyoperatorpolynomialproblemcompleteconstraints
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Non-commutative polynomial optimization (NPO) problems seek to minimize the state average of a polynomial of some operator variables, subject to polynomial constraints, over all states and operators, as well as the Hilbert spaces where those might be defined. Many of these problems are known to admit a complete hierarchy of semidefinite programming (SDP) relaxations. In this work, we consider a variant of NPO problems where a subset of the operator variables satisfies a system of ordinary differential equations. We find that, under mild conditions of operator boundedness, for every such problem one can construct a standard NPO problem with the same solution. This allows us to define a complete hierarchy of SDPs to tackle the original differential problem. We apply this method to bound averages of local observables in quantum spin systems subject to a Hamiltonian evolution (i.e., a quench). We find that, even in the thermodynamic limit of infinitely many sites, low levels of the hierarchy provide very good approximations for reasonably long evolution times.

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  1. Reachability and optimal-time certificates for quantum control

    quant-ph 2026-06 unverdicted novelty 6.0

    Moment relaxations with time-dependent differential constraints yield upper bounds on fidelities and lower bounds on optimal times for quantum control tasks including qubit gates and excitation transfer.