Real order (an)-isotropic total variation in image processing - Part I: analytical analysis and functional properties

Abstract

In this paper, a variational, multi-dimensional model for image reconstruction is proposed, in which the regularization term consists of the r-order (an)-isotropic total variation seminorms TVr, with r∈ R+, defined via the Riemann-Liouville fractional derivative. Key properties, such as the lower semi-continuity and compactness with respect to both the function u and the order of derivative r, are studied. This paper, the first of our series works on analytical and numerical aspects of the model, as well as the learning of optimal order r for particular imaging tasks, provides a comprehensive analysis of the behavior of TVr in the space of functions with bounded (fractional order) total variation.