Non-symmetric polarization

Abstract

Let P be an m-homogeneous polynomial in n-complex variables x1, …c, xn. Clearly, P has a unique representation in the form equation* P(x)= Σ1 ≤ j1 ≤ …c ≤ jm ≤ n c(j1, …c, jm) \, xj1 …b xjm \,, equation* and the m"~form equation* LP(x(1), …c, x(m))= Σ1 ≤ j1 ≤ …c ≤ jm ≤ n c(j1, …c, jm) \, x(1)j1 …b x(m)jm equation* satisfies LP(x,…c, x) = P(x) for every x∈Cn. We show that, although LP in general is non-symmetric, for a large class of reasonable norms · on Cn the norm of LP on (Cn, · )m up to a logarithmic term (c n)m2 can be estimated by the norm of P on (Cn, · ); here c 1 denotes a universal constant. Moreover, for the p"~norms · p, 1 ≤ p < 2 the logarithmic term in the number n of variables is even superfluous.