A variant of Hilbert's inequality and the norm of the Hilbert Matrix on Kp

Abstract

We prove the nontrivial variant \[ Σm,n=1∞(nm)1q-1pambnm+n-1≤ππp ( Σm=1∞amp) 1p( Σn=1∞bnq) 1q \] of the well known Hilbert's inequality. Then we use this to determine the exact value ππp of the norm of the Hilbert matrix as an operator acting on the Hardy-Littlewood space Kp. This space consists of all functions f(z)=Σm=0∞amzm analytic in the unit disc with \|f\|Kpp=Σm=0∞(m+1)p-2|am|p<+∞.