A new approach to topological singularities via a weak notion of Jacobian for functions of bounded variation
Abstract
We introduce a weak notion of 2× 2-minors of gradients of a suitable subclass of BV functions. In the case of maps in BV(R2;R2) such a notion extends the standard definition of Jacobian determinant to non-Sobolev maps. We use this distributional Jacobian to prove a compactness and -convergence result for a new model describing the emergence of topological singularities in two dimensions, in the spirit of Ginzburg-Landau and core-radius approaches. Within our framework, the order parameter is an SBV map u taking values in S1 and the energy is made by the sum of the squared L2 norm of ∇ u and of the length of (the closure of) the jump set of u multiplied by 1 . Here, is a length-scale parameter. We show that, in the || regime, the Jacobian distributions converge, as 0+, to a finite sum μ of Dirac deltas with weights multiple of π, and that the corresponding effective energy is given by the total variation of μ.
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