Discrepancy of generalized Hammersley type point sets in Besov spaces of dominating mixed smoothness

Abstract

The symmetrized Hammersley point set is known to achieve the best possible rate for the L2-norm of the discrepancy function. Also lower bounds for the norm in Besov spaces of dominating mixed smoothness are known. In this paper a large class of point sets which are generalizations of the Hammersley type point sets are proved to asymptotically achieve the known lower bound of the Besov norm. The proof uses a b-adic generalization of the Haar system. This result can be regarded as a preparation for the proof in arbitrary dimension.