Speaker: Roger A. Horn Title: Canonical Forms for Congruence and *Congruence of Complex Matrices Abstract: Recent work has produced sets of simple canonical matrices for both congruence (A -> S^TAS) and *congruence (A -> S^*AS) of complex matrices, together with algorithms to compute them. The theory for these two equivalence relations is an analog of the classical Jordan Canonical Form, for which the equivalence relation is similarity, but it is different in very interesting ways. Applications include a new theory of canonical pairs for Hermitian/Hermitian and symmetric/skew-symmetric pairs of complex matrices, characterization of matrices with positive semidefinite Hermitian part, stability of canonical forms under perturbation.