Some remarks on non-symmetric polarization

Abstract

Let P:Cn→ C be an m-homogeneous polynomial given by \[P(x)= Σ1≤ j1≤ … ≤ jm ≤ n cj1 … jm xj1… xjm.\] Defant and Schl\"uters defined a non-symmetric associated m-form LP: (Cn )m→ C by \[LP (x(1),…,x(m) )= Σ1≤ j1≤ … ≤ jm ≤ n cj1 … jm xj1(1)… xjm(m).\] They estimated the norm of LP on (Cn, \| ·\|)m by the norm of P on (Cn, \| ·\|) times a (c n)m2 factor for every 1-unconditional norm \|·\| on Cn. A symmetrization procedure based on a card-shuffling algorithm which (together with Defant and Schl\"uters' argument) brings the constant term down to (c m n)m-1 is provided. Regarding the lower bound, it is shown that the optimal constant is bigger than (c n)m/2 when n m. Finally, the case of p-norms \|· \|p with 1≤ p <2 is addressed.