Weak majorization inequalities for the cubic and quartic coefficients of e(A+B)t versus eAteBt

Abstract

Let A,B∈Hn and set H=A+B. For each integer k 1 define Qk:=Σp=0k kp ApBk-p, Rk:=\,Qk=Qk+Qk*2. Then Hk=.dkdtkeHt|t=0 and Qk=.dkdtk(eAteBt)|t=0. We prove that, for k=3,4, λ(Hk)w σ(Qk). Equivalently, the eigenvalues of the cubic and quartic Taylor coefficients of e(A+B)t are weakly majorized by the singular values of the corresponding coefficients of the Golden--Thompson product eAteBt. Our argument combines Ky Fan variational principles with explicit commutator identitiesfor Rk-Hk at orders k=3,4, reducing the problem to the positivity of certain double-commutator trace forms tested against Ky Fan maximizing projections. We also record a general sufficient condition for higher orders based on commutator decompositions.