An overwhelming variety of different constructions for (t, m, s)-nets and (t, s)-sequences are known today. Propagation rules as well as connections to other mathematical objects make it a difficult task to determine the best net available in a given setting. We present the web-based database system MinT for querying best known (t, m, s)-net and (t, s)-sequence parameters. This new system provides a number of hitherto unavailable services to the research community.

References in zbMATH (referenced in 30 articles , 1 standard article )

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  1. Bernardo, Fernando P.: Performance of cubature formulae in probabilistic model analysis and optimization (2015)
  2. Kritzer, Peter; Niederreiter, Harald: Propagation rules for $(u, m, \bolde, s)$-nets and $(u, \bolde, s)$-sequences (2015)
  3. Berg, James; Wakefield, Max: Skeleton simplicial evaluation codes (2014)
  4. Feulner, Thomas: Classification and nonexistence results for linear codes with prescribed minimum distances (2014)
  5. Suzuki, Kosuke: An explicit construction of point sets with large minimum Dick weight (2014)
  6. Dick, Josef; Kritzer, Peter: A higher order Blokh-Zyablov propagation rule for higher order nets (2012)
  7. Faure, Henri; Lemieux, Christiane: Improvements on the star discrepancy of $(t,s)$-sequences (2012)
  8. Nuyens, Dirk; Waterhouse, Benjamin J.: A global adaptive quasi-Monte Carlo algorithm for functions of low truncation dimension applied to problems from finance (2012)
  9. Couvreur, Alain: Differential approach for the study of duals of algebraic-geometric codes on surfaces (2011)
  10. Couvreur, Alain: Construction of rational surfaces yielding good codes (2011)
  11. Trinker, Horst: Cubic and higher degree bounds for codes and $(t,m,s)$-nets (2011)
  12. Dick, Josef; Kritzer, Peter: Duality theory and propagation rules for generalized digital nets (2010)
  13. Schürer, Rudolf; Schmid, Wolfgang Ch.: MinT-architecture and applications of the $(t, m, s)$-net and OOA database (2010)
  14. Trinker, Horst: New explicit bounds for ordered codes and $(t,m,s)$-nets (2010)
  15. Dick, Josef; Niederreiter, Harald: Duality for digital sequences (2009)
  16. L’Ecuyer, Pierre: Quasi-Monte Carlo methods with applications in finance (2009)
  17. Lemieux, Christiane: Monte Carlo and quasi-Monte Carlo sampling (2009)
  18. Maruta, Tatsuya; Shinohara, Maori; Kikui, Ayako: On optimal linear codes over $\Bbb F_5$ (2009)
  19. Schürer, Rudolf; Schmid, Wolfgang Ch.: MinT -- new features and new results (2009)
  20. Dick, Josef; Niederreiter, Harald: On the exact $t$-value of Niederreiter and Sobol’ sequences (2008)

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