Trace arithmetic--p inequality

Abstract

Let A be a unital C-algebra equipped with a faithful tracial positive linear functional τ. Denote by A+ its positive cone. For p>0 and A,B∈A+, we consider the operations Ap B := (Ap/4 Bp/2 Ap/4)1/p, A∇ B := A+B2. We prove that, for all p>0 and all A,B∈A+, τ(Ap B) τ(A)τ(B) τ(A∇ B), thereby answering [Problem~1]KM24, posed by \'A.~Kom\'alovics and L.~Moln\'ar, in the affirmative. We also record a unitarily invariant norm analogue of the key estimate in the matrix case, and we provide explicit 2×2 counterexamples showing that the triangle inequality for dp may fail when 0<p<1 (already for p=12), giving a partial answer to [Problem~2]KM24.