Anti Lie-Trotter formula

Abstract

Let A and B be positive semidefinite matrices. The limit of the expression Zp:=(Ap/2BpAp/2)1/p as p tends to 0 is given by the well known Lie-Trotter-Kato formula. A similar formula holds for the limit of Gp:=(Ap\,\#\,Bp)2/p as p tends to 0, where X\,\#\,Y is the geometric mean of X and Y. In this paper we study the complementary limit of Zp and Gp as p tends to ∞, with the ultimate goal of finding an explicit formula, which we call the anti Lie-Trotter formula. We show that the limit of Zp exists and find an explicit formula in a special case. The limit of Gp is shown for 2×2 matrices only.