Related papers: On Commutative Penalty Functions in Parent-Hamiltonian Constructions

On Commutative Penalty Functions in Parent-Hamiltonian Constructions

URL: http://arxiv.org/abs/2311.17249v1
Date: Tue, 28 Nov 2023 22:00:05 GMT
Title: On Commutative Penalty Functions in Parent-Hamiltonian Constructions
Authors: Jacob Biamonte
Abstract summary: We consider the framework that enables one to engineer exact parent Hamiltonians from commutings. This work presents a framework that captures components of what is known about exact parent Hamiltonians and bridges a few techniques that are concerned with such constructions.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: There are several known techniques to construct a Hamiltonian with an expected value that is minimized uniquely by a given quantum state. Common approaches include the parent Hamiltonian construction from matrix product states, building approximate ground state projectors, and, in a common case, developing penalty functions from the generalized Ising model. Here we consider the framework that enables one to engineer exact parent Hamiltonians from commuting polynomials. We derive elementary classification results of quadratic Ising parent Hamiltonians and to generally derive a non-injective parent Hamiltonian construction. We also consider that any $n$-qubit stabilizer state has a commutative parent Hamiltonian with $n+1$ terms and we develop an approach that allows the derivation of parent Hamiltonians by composition of network elements that embed the truth tables of discrete functions into a kernel space. This work presents a unifying framework that captures components of what is known about exact parent Hamiltonians and bridges a few techniques across the domains that are concerned with such constructions.

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