How to generalize D-stability

Abstract

In this paper, we introduce the following concept which generalizes known definitions of multiplicative and additive D-stability, Schur D-stability, H-stability, D-hyperbolicity and many others. Given a subset D ⊂ C, a matrix class G ⊂ Mn × n and a binary operation on Mn × n, an n × n matrix A is called ( D, G, )-stable if σ( G A) ⊂ D for any G ∈ G. Such an approach allows us to unite several well-known matrix problems and to consider common ways of their analysis. Here, we make a survey of existing results and open problems on different types of stability, study basic properties of ( D, G, )-stable matrices and relations between different ( D, G, )-stability classes.