Open AccessEuler equations and trace properties of minimizers of a functional for motion compensated inpainting
Author(s) -
Riccardo March,
Giuseppe Riey
Publication year - 2022
Publication title -
inverse problems and imaging
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.755
H-Index - 40
eISSN - 1930-8345
pISSN - 1930-8337
DOI - 10.3934/ipi.2021072
Subject(s) - inpainting , mathematics , pointwise , euler equations , bounded function , euler's formula , mathematical analysis , type (biology) , jump , trace (psycholinguistics) , pure mathematics , image (mathematics) , computer science , artificial intelligence , physics , ecology , quantum mechanics , biology , linguistics , philosophy
We compute the Euler equations of a functional useful for simultaneous video inpainting and motion estimation, which was obtained in [ 17 ] as the relaxation of a modified version of the functional proposed in [ 16 ]. The functional is defined on vectorial functions of bounded variations, therefore we also get the Euler equations holding on the singular sets of minimizers, highlighting in particular the conditions on the jump sets. Such conditions are expressed by means of traces of geometrically meaningful vector fields and characterized as pointwise limits of averages on cylinders with axes parallel to the unit normals to the jump sets.