Universality of renormalisable mappings in two dimensions: the case of polar convex integrands
Abstract
We establish universality of the renormalised energy for mappings from a planar domain to a compact manifold, by approximating subquadratic polar convex functionals of the form ∫ f(|D u|)\,d x. The analysis relies on the condition that the vortex map x/ x has finite energy and that t f (t) is concave. We derive the leading order asymptotics and provide a detailed description of the convergence of W1,1-almost minimisers, leading to a characterization of second-order asymptotics. At the core of the method, we prove a ball merging construction (following Jerrard and Sandier's approach) for a general class of convex integrands. We therefore generalize the approximation by p-harmonic mappings when p 2 and can also cover linearly growing functionals, including those of area-type.
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