One parameter generalization of BW inequality and its application to open quantum dynamics

Abstract

In this paper, we introduce a one parameter generalization of the famous B\"ottcher-Wenzel (BW) inequality in terms of a q-deformed commutator. For n × n matrices A and B, we consider the inequality \[ [B,A],[B,A]q c(q) \|A\|2 \|B\|2, \] where A,B = tr(A*B) is the Hilbert-Schmidt inner product, \|A\| is the Frobenius norm, [A,B] =AB-BA is the commutator, and [A,B]q =AB-qBA is the q-deformed commutator. We prove that when n=2, or when A is normal with any size n, the optimal bound is given by \[ c(q) = (1+q) +2(1+q2)2. \] We conjecture that this is also true for any matrices, and this conjecture is perfectly supported for n up to 15 by numerical optimization. When q=1, this inequality is exactly BW inequality. When q=0, this inequality leads the sharp bound for the r-function which is recently derived for the application to universal constraints of relaxation rates in open quantum dynamics.