Topological classification of sesquilinear forms: reduction to the nonsingular case

Abstract

Two sesquilinear forms : Cm× Cm C and : Cn× Cn C are called topologically equivalent if there exists a homeomorphism : Cm Cn (i.e., a continuous bijection whose inverse is also a continuous bijection) such that (x,y)=( (x), (y)) for all x,y∈ Cm. R.A.Horn and V.V.Sergeichuk in 2006 constructed a regularizing decomposition of a square complex matrix A; that is, a direct sum SAS*=R Jn1… Jnp, in which S and R are nonsingular and each Jni is the ni-by-ni singular Jordan block. In this paper, we prove that and are topologically equivalent if and only if the regularizing decompositions of their matrices coincide up to permutation of the singular summands Jni and replacement of R∈ Cr× r by a nonsingular matrix R'∈ Cr× r such that R and R' are the matrices of topologically equivalent forms. Analogous results for real and complex bilinear forms are also obtained.