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All issues Volume 59 (2025) RAIRO-Theor. Inf. Appl., 59 (2025) 14 References
Issue
RAIRO-Theor. Inf. Appl.
Volume 59, 2025
Generation, enumeration and tiling
Article Number 14
Number of page(s) 14
DOI https://doi.org/10.1051/ita/2025007
Published online 29 October 2025
  1. M. Vamvakari, On multivariate discrete q-distributions: a multivariate q-Cauchy’s formula. Commun. Statist. Theory Methods 49 (2020) 6080–6095. [CrossRef] [Google Scholar]
  2. A. Kyriakoussis and M. Vamvakari, Heine process as a q-analog of the Poisson process: waiting and interarrival times. Commun. Statist. Theory Methods 46 (2017) 4088–4102. [CrossRef] [Google Scholar]
  3. C.A. Charalambides, q-multinomial and negative q-multinomial distributions. Commun. Statist. Theory Methods 50 (2021) 5673–5898. [Google Scholar]
  4. C.A. Charalambides, Multivariate q-pólya and inverse q-pólya distributions. Commun. Statist. Theory Methods 51 (2022) 4854–4876. [Google Scholar]
  5. C.A. Charalambides, Multivariate Discrete q-Distributions. Synthesis Lectures on Mathematics & Statistics. Springer Nature, Cham, Switzerland (2024). [Google Scholar]
  6. A. Kyriakoussis and M. Vamvakari, On a q-analogue of the Stirling formula and a continuous limiting behaviour of the q-binomial distribution-numerical calculations. Methodol. Comput. Appl. Probab. 15 (2013) 187–213. [Google Scholar]
  7. A. Kyriakoussis and M. Vamvakari, Continuous Stieltjes–Wigert limiting behaviour of a family of confluent q-chuvandermonde distributions. Axioms 3 (2014) 140–152. [CrossRef] [Google Scholar]
  8. A. Kyriakoussis and M. Vamvakari, Asymptotic behaviour of certain q-Poisson, q-binomial and negative q-binomial distributions. Lattice Path Combinatorics and Applications, edited by G.E. Andrews, C. Krattenthaler and A. Krinik Dev. Math. 58 (2019) 283–306. [Google Scholar]
  9. M. Vamvakari, Asymptotic behaviour of univariate and multivariate absorption distributions. Randomness Combinatorics, edited by L. Ferrari and P. Massazza. RAIRO Theor. Inform. Appl. 58 (2024). [Google Scholar]
  10. C.A. Charalambides, Discrete q-Distributions. John Wiley & Sons, Hoboken, NJ (2016). [Google Scholar]
  11. M. Vamvakari, Local limit theorems for q-multinomial and multiple Heine Distributions, in Srečko Brlek and Luca Ferrari: Proceedings of the 13th edition of the conference on Random Generation of Combinatorial Structures. Polyominoes and Tilings (GASCom 2024), Bordeaux, France, 24–28th June 2024, Electronic Proceedings in Theoretical Computer Science, Vol. 403 (2024). [Google Scholar]

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