One dimensional fractional order TGV: Gamma-convergence and bilevel training scheme

Abstract

New fractional r-order seminorms, TGVr, r∈ R, r≥ 1, are proposed in the one-dimensional (1D) setting, as a generalization of the integer order TGVk-seminorms, k∈N. The fractional r-order TGVr-seminorms are shown to be intermediate between the integer order TGVk-seminorms. A bilevel training scheme is proposed, where under a box constraint a simultaneous optimization with respect to parameters and order of derivation is performed. Existence of solutions to the bilevel training scheme is proved by -convergence. Finally, the numerical landscape of the cost function associated to the bilevel training scheme is discussed for two numerical examples.