A method for computing lowest eigenvalues of symmetric polynomial differential operators by semidefinite programming
Optimization and Control
2013-07-09 v4 Quantum Algebra
Abstract
A method for computing global minima of real multivariate polynomials based on semidefinite programming was developed by N. Z. Shor, J. B. Lasserre and P. A. Parrilo. The aim of this article is to extend a variant of their method to noncommutative symmetric polynomials in variables and satisfying and , . Global minima of such polynomials are defined and showed to be equal to minima of the spectra of the corresponding differential operators. We also discuss how to exploit sparsity and symmetry. Several numerical experiments are included. The last section explains how our theory fits into the framework of noncommutative real algebraic geometry.
Cite
@article{arxiv.0906.2214,
title = {A method for computing lowest eigenvalues of symmetric polynomial differential operators by semidefinite programming},
author = {Jaka Cimpric},
journal= {arXiv preprint arXiv:0906.2214},
year = {2013}
}
Comments
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