Distance to nearest skew-symmetric matrix polynomials of bounded rank

Abstract

We propose an algorithm that approximates a given matrix polynomial of degree d by another skew-symmetric matrix polynomial of a specified rank and degree at most d. The algorithm is built on recent advances in the theory of generic eigenstructures and factorizations for skew-symmetric matrix polynomials of bounded rank and degree. Taking into account that the rank of a skew-symmetric matrix polynomial is even, the algorithm works for any prescribed even rank greater than or equal to 2 and produces a skew-symmetric matrix polynomial of that exact rank. We also adapt the algorithm for matrix pencils to achieve a better performance. Lastly, we present numerical experiments for testing our algorithms and for comparison to the previously known ones.