Computing Truncated Joint Approximate Eigenbases for Model Order Reduction

Abstract

In this document, some elements of the theory and algorithmics corresponding to the existence and computability of approximate joint eigenpairs for finite collections of matrices with applications to model order reduction, are presented. More specifically, given a finite collection X1,…,Xd of Hermitian matrices in Cn× n, a positive integer r n, and a collection of complex numbers xj,k∈ C for 1≤ j≤ d, 1≤ k≤ r. First, we study the computability of a set of r vectors w1,…,wr∈ Cn, such that wk=w∈ CnΣj=1d\|Xjw-xj,k w\|2 for each 1≤ k ≤ r, then we present a model order reduction procedure based on the truncated joint approximate eigenbases computed with the aforementioned techniques. Some prototypical algorithms together with some numerical examples are presented as well.