On reverses of the Golden-Thompson type inequalities

Abstract

In this paper we present some reverses of the Golden-Thompson type inequalities: Let H and K be Hermitian matrices such that es eH ols eK ols et eH for some scalars s ≤ t, and α ∈ [0 , 1]. Then for all p>0 and k =1,2,…, n align* λk (e(1-α)H + α K ) ≤ ( S(esp), S(etp))1p λk (epH α epK)1p, align* where Aα B = A12 ( A-12 B12 A-12 ) α A12 is α-geometric mean, S(t) is the so called Specht's ratio and ols is the so called Olson order. The same inequalities are also provided with other constants. The obtained inequalities improve some known results.