Polynomial inequalities on the π/4-circle sector

Abstract

A number of sharp inequalities are proved for the space P(2D(π4)) of 2-homogeneous polynomials on R2 endowed with the supremum norm on the sector D(π4):=\eiθ:θ∈ [0,π4]\. Among the main results we can find sharp Bernstein and Markov inequalities and the calculation of the polarization constant and the unconditional constant of the canonical basis of the space P(2D(π4)).