Distribution properties of generalized van der Corput–Halton sequences and their subsequences R Hofer, P Kritzer, G Larcher, F Pillichshammer International Journal of Number Theory 5 (04), 719-746, 2009 | 47 | 2009 |

Multivariate integration of infinitely many times differentiable functions in weighted Korobov spaces P Kritzer, F Pillichshammer, H Woźniakowski Mathematics of Computation 83 (287), 1189-1206, 2014 | 44 | 2014 |

Approximation of analytic functions in Korobov spaces J Dick, P Kritzer, F Pillichshammer, H Woźniakowski Journal of Complexity 30 (2), 2-28, 2014 | 40 | 2014 |

Improved upper bounds on the star discrepancy of (t, m, s)-nets and (t, s)-sequences P Kritzer Journal of Complexity 22 (3), 336-347, 2006 | 34 | 2006 |

Integration in Hermite spaces of analytic functions C Irrgeher, P Kritzer, G Leobacher, F Pillichshammer Journal of Complexity 31 (3), 380-404, 2015 | 32 | 2015 |

Tractability of multivariate approximation defined over Hilbert spaces with exponential weights C Irrgeher, P Kritzer, F Pillichshammer, H Woźniakowski Journal of Approximation Theory 207, 301-338, 2016 | 28 | 2016 |

From van der Corput to modern constructions of sequences for quasi-Monte Carlo rules H Faure, P Kritzer, F Pillichshammer Indagationes Mathematicae 26 (5), 760-822, 2015 | 27 | 2015 |

Tractability of multivariate analytic problems. P Kritzer, F Pillichshammer, H Wozniakowski Uniform distribution and quasi-Monte Carlo methods, 147-170, 2014 | 27 | 2014 |

Lattice-Nyström method for Fredholm integral equations of the second kind with convolution type kernels J Dick, P Kritzer, FY Kuo, IH Sloan Journal of Complexity 23 (4-6), 752-772, 2007 | 24 | 2007 |

Component-by-component construction of low-discrepancy point sets of small size B Doerr, M Gnewuch, P Kritzer, F Pillichshammer Monte Carlo Methods and Applications 14 (2), 129-149, 2008 | 23 | 2008 |

An exact formula for the L2 discrepancy of the shifted Hammersley point set PKF Pillichshammer Uniform Distribution Theory 1 (1), 1-13, 2006 | 23 | 2006 |

New star discrepancy bounds for -nets and -sequences H Faure, P Kritzer Monatshefte für Mathematik 172 (1), 55-75, 2013 | 20 | 2013 |

On hybrid sequences built from Niederreiter–Halton sequences and Kronecker sequences R Hofer, P Kritzer Bulletin of the Australian Mathematical Society 84 (2), 238-254, 2011 | 19 | 2011 |

Duality theory and propagation rules for generalized digital nets J Dick, P Kritzer Mathematics of computation 79 (270), 993-1017, 2010 | 19 | 2010 |

On some remarkable properties of the two-dimensional Hammersley point set in base 2 P Kritzer Journal de théorie des nombres de Bordeaux 18 (1), 203-221, 2006 | 19 | 2006 |

A thorough analysis of the discrepancy of shifted Hammersley and van der Corput point sets P Kritzer, G Larcher, F Pillichshammer Annali di Matematica Pura ed Applicata 186 (2), 229-250, 2007 | 18 | 2007 |

Very low truncation dimension for high dimensional integration under modest error demand P Kritzer, F Pillichshammer, GW Wasilkowski Journal of Complexity 35, 63-85, 2016 | 17 | 2016 |

Constructions of general polynomial lattice rules based on the weighted star discrepancy J Dick, P Kritzer, G Leobacher, F Pillichshammer Finite Fields and Their Applications 13 (4), 1045-1070, 2007 | 17 | 2007 |

A reduced fast component-by-component construction of lattice points for integration in weighted spaces with fast decreasing weights J Dick, P Kritzer, G Leobacher, F Pillichshammer Journal of Computational and Applied Mathematics 276, 1-15, 2015 | 15 | 2015 |

On the existence of higher order polynomial lattices based on a generalized figure of merit J Dick, P Kritzer, F Pillichshammer, WC Schmid Journal of Complexity 23 (4-6), 581-593, 2007 | 15 | 2007 |