Convergence rates and source conditions for Tikhonov regularization with sparsity constraints

Abstract

This paper addresses the regularization by sparsity constraints by means of weighted p penalties for 0≤ p≤ 2. For 1≤ p≤ 2 special attention is payed to convergence rates in norm and to source conditions. As main result it is proven that one gets a convergence rate in norm of δ for 1≤ p≤ 2 as soon as the unknown solution is sparse. The case p=1 needs a special technique where not only Bregman distances but also a so-called Bregman-Taylor distance has to be employed. For p<1 only preliminary results are shown. These results indicate that, different from p≥ 1, the regularizing properties depend on the interplay of the operator and the basis of sparsity. A counterexample for p=0 shows that regularization need not to happen.