From Symmetric Toeplitz Hamiltonians to Quantum Circuits
Abstract
This work introduces a quantum circuit synthesis framework for simulating the unitary time evolution under a subclass of symmetric Toeplitz Hamiltonians by decomposing them into specific diagonal matrices Mk. These matrices are then classified, to achieve significant simplification, into, Mk when k is a power of two, and congruence classes with constant coefficients. Finally, we construct the explicit quantum circuit for the one-dimensional discrete Poisson equation. This research was conducted under the supervision of Benoit Valiron during a Master's internship.
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