Continuous products of matrices

Abstract

We answer the question if the continuous product of square matrices M(t) over t∈ [0,1] can be correctly defined. The case where all M(t) are taken from a finite set is studied. We find necessary and sufficient conditions on that ensure the convergence of products M(t0=0)M(t1)… M(tN=1) as the partition 0<t1<…<1 refines. These conditions are properties LCP (left convergent product) and RCP (right convergent product) of the set . That is, it suffices to require the convergence of all finite products M1M2… MK and MK… M2M1 as K∞, where Mi∈. The theory of joint spectral radius is heavily used.