Motivated by the study of the non-parametric area of the graph of the vortex map u (a two-codimensional singular surface in) over the disk of radius l, we perform a careful analysis of the singular part of the relaxation of computed at u. The precise description is given in terms of an area-minimizing surface in a vertical copy of, which is a sort of “catenoid” containing a segment corresponding to a radius of Ω. The problem involves an area-minimization with a free boundary part; several boundary regularity properties of the minimizer are inspected.
Bellettini, G., Elshorbagy, A., Scala, R. (2025). Relaxation of the area of the vortex map: A non-parametric Plateau problem for a catenoid containing a segment. JOURNAL OF FUNCTIONAL ANALYSIS, 289(5), 1-42 [10.1016/j.jfa.2025.110947].
Relaxation of the area of the vortex map: A non-parametric Plateau problem for a catenoid containing a segment
Giovanni Bellettini;Riccardo Scala
2025-01-01
Abstract
Motivated by the study of the non-parametric area of the graph of the vortex map u (a two-codimensional singular surface in) over the disk of radius l, we perform a careful analysis of the singular part of the relaxation of computed at u. The precise description is given in terms of an area-minimizing surface in a vertical copy of, which is a sort of “catenoid” containing a segment corresponding to a radius of Ω. The problem involves an area-minimization with a free boundary part; several boundary regularity properties of the minimizer are inspected.
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https://hdl.handle.net/11365/1290135