Constraints for the spectra of generators of quantum dynamical semigroups
Abstract
Motivated by a spectral analysis of the generator of completely positive trace-preserving semigroup, we analyze a real functional A,B ∈ Mn(C) r(A,B) = 12( [B,A],BA + [B,A],BA ) ∈ R where A,B := tr (A B) is the Hilbert-Schmidt inner product, and [A,B]:= AB - BA is the commutator. In particular we discuss the upper and lower bounds of the form c- \|A\|2 \|B\|2 r(A,B) c+ \|A\|2 \|B\|2 where \|A\| is the Frobenius norm. We prove that the optimal upper and lower bounds are given by c = 1 22. If A is restricted to be traceless, the bounds are further improved to be c = 1 2(1-1n)2. Interestingly, these upper bounds, especially the latter one, provide new constraints on relaxation rates for the quantum dynamical semigroup tighter than previously known constraints in the literature. A relation with B\"ottcher-Wenzel inequality is also discussed.
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