The geometry of ℒ(³Ɩ²∞) and optimal constants in the Bohnenblust-Hille inequality for multilinear forms and polynomials

Abstract

Clasificamos las formas 3-lineales extremas y expuestas de la bola unitaria de ℒ(³Ɩ²∞). Introducimos constantes óptimas en la desigualdad de Bohnenblust-Hille para formas multilineales y polinomios simétricos e investigamos sobre sus relaciones.

We classify the extreme and exposed 3-linear forms of the unit ball of ℒ(³Ɩ²∞). We introduce optimal constants in the Bohnenblust-Hille inequality for symmetric forms and polynomials and investigate about their relations.