A general approach to strong laws of large numbers for fields of random variables C Noszály, T Tómács Annales Univ. Sci. Budapest 43, 61-78, 2000 | 18 | 2000 |
Weights of cliques in a random graph model based on three-interactions I Fazekas, C Noszály, A Perecsényi Lithuanian Mathematical Journal 55 (2), 207-221, 2015 | 12 | 2015 |
The N-star network evolution model I Fazekas, C Noszály, A Perecsényi Journal of Applied Probability 56 (2), 416-440, 2019 | 6 | 2019 |
Strong laws of large numbers for sequences and fields O Klesov, I Fazekas, C Noszály, T Tómács Theory of Stochastic Processes 5 (3-4), 91-104, 2008 | 6 | 2008 |
A continuous-time network evolution model describing 3-interactions I Fazekas, A Barta, C Noszály, B Porvázsnyik Communications in Statistics-Theory and Methods 52 (11), 4001-4020, 2023 | 5 | 2023 |
A continuous-time network evolution model describing 2-and 3-interactions I Fazekas, A Barta Mathematics 9 (23), 3143, 2021 | 4 | 2021 |
A Robbins–Monro-type algorithm for computing global minimizer of generalized conic functions M Barczy, Á Nagy, C Noszály, C Vincze Optimization 64 (9), 1999-2020, 2015 | 4 | 2015 |
Simulation results on a triangle-based network evolution model I Fazekas, A Barta, C Noszály Annales Mathematicae et Informaticae 51, 7-15, 2020 | 3 | 2020 |
Taylor’s power law for the N-stars network evolution model I Fazekas, C Noszály, N Uzonyi Modern Stochastics: Theory and Applications 6 (3), 311-331, 2019 | 1 | 2019 |
A Random Graph Evolution Procedure and Asymptotic Results B Porvázsnyik, I Fazekas, C Noszály, A Perecsényi 19th European Young Statisticians Meeting, 117, 2015 | | 2015 |
Empirical results on distance of two-dimensional samples C Noszály Studia Scientiarum Mathematicarum Hungarica 50 (4), 413-422, 2013 | | 2013 |
A stochastic algorithm for computing global minimizer of generalized conic functions M Barczy, A Nagy, C Noszály, C Vincze arXiv preprint arXiv:1301.6112, 2013 | | 2013 |
Experiments on the distance of two-dimensional samples C Noszály Annales Mathematicae et Informaticae, 193-206, 2012 | | 2012 |
Is Taylor’s power law true for random networks? I Fazekas, C Noszály, N Uzonyi | | |
A comparison of two interaction based random graph models C Noszály, N Uzonyi XXXIV. International Seminar on Stability Problems for Stochastic Models, 113, 0 | | |
A scale-free random graph model I Fazekas, C Noszály, A Perecsényi, B Porvázsnyik | | |