On the best constants of Schur multipliers of higher order divided difference functions

Abstract

Let f ∈ Cn(R) be such that f(n) ∞ < ∞. Let f[n] ∈ C(Rn+1) be the nth order divided difference. A special case of our main result states that for 1 < p < ∞ we have \[ Tf[n]: Snp × … × Snp → Sp p pn f(n) ∞, \] where p = p/(p-1) is the H\"older conjugate of p and Tf[n] is the multilinear Schur multiplier with symbol f[n]. In case of the generalized absolute value map f(λ) = λn-1 λ , λ ∈ R, we show that \[p pn Tf[n]: Snp × … × Snp → Sp .\] This provides an alternative proof to one of the key theorems in the solution of Koplienko's problem on higher order spectral shift [Invent. Math. 193, No. 3, 501-538 (2013)], which is moreover sharp as p 1 and as p ∞ for any n.

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