@article{10902/35963,
year = {2018},
month = {6},
url = {https://hdl.handle.net/10902/35963},
abstract = {We introduce a hybridization of digital sequences with uniformly distributed sequences in the domain of b-adic integers, Zb, b ∈ N \ {1}, by using such sequences as input for generating matrices. The generating matrices are then naturally required to have finite row-lengths. We exhibit some relations of the ‘classical’ digital method to our extended version, and also give several examples of new constructions with their respective quality assessments in terms of t, T and discrepancy.},
organization = {We would like to thank the anonymous referees, whose suggestions helped to improve the quality of the paper. The first author is supported by the Austrian Science Fund (FWF): Project F5505-N26, which is a part of the Special Research Program “Quasi-Monte Carlo Methods: Theory and Applications”, the second by the Austrian Science Fund (FWF): Project F5511-N26, which is a part of the Special Research Program “Quasi-Monte Carlo Methods: Theory and Applications” as well as Project P27351-N26.},
publisher = {De Gruyter Bril},
publisher = {Uniform Distribution Theory, 2018, 13(1), 87-107},
title = {An extension of the digital method based on b-adic integers},
author = {Hofer, Roswitha and Pirsic, Ísabel},
}