Schatten-von neumann properties of bilinear hankel forms of higher weights

Journal article, 2006

Hankel forms of higher weights, on weighted Bergman spaces in the unit ball of Cd, were introduced by Peetre. Each Hankel form corresponds to a vector-valued holomorphic function, called the symbol of the form. In this paper we characterize bounded, compact and Schatten-von Neumann struct J sign p class (2 ≤ p < ∞) Hankel forms in terms of the membership of the symbols in certain Besov spaces.