The normal contraction property for non-bilinear Dirichlet forms

Abstract

We analyse the class of convex functionals E over L2(X,m) for a measure space (X,m) introduced by Cipriani and Grillo and generalising the classic bilinear Dirichlet forms. We investigate whether such non-bilinear forms verify the normal contraction property, i.e., if E(φ f) ≤ E(f) for all f ∈ L2(X,m), and all 1-Lipschitz functions φ: R R with φ(0)=0. We prove that normal contraction holds if and only if E is symmetric in the sense E(-f) = E(f), for all f ∈ L2(X,m). An auxiliary result, which may be of independent interest, states that it suffices to establish the normal contraction property only for a simple two-parameter family of functions φ.

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