Estimation to structured distances to singularity for matrix pencils with symmetry structures: A linear algebra-based approach

Abstract

We study the structured distance to singularity for a given regular matrix pencil A+sE, where (A,E)∈ S ⊂eq ( Cn,n)2. This includes Hermitian, skew-Hermitian, *-even, *-odd, *-palindromic, T-palindromic, and dissipative Hamiltonian pencils. We present a purely linear algebra-based approach to derive explicit computable formulas for the distance to the nearest structured pencil (A-A)+s(E-E) such that A-A and E-E have a common null vector. We then obtain a family of computable lower bounds for the unstructured and structured distances to singularity. Numerical experiments suggest that in many cases, there is a significant difference between structured and unstructured distances. This approach extends to structured matrix polynomials with higher degrees.