A combinatorial proof of Shapiroʼs Catalan convolution GV Nagy
Advances in Applied Mathematics 49 (3-5), 391-396, 2012
12 2012 Bijective enumerations of Γ-free 0–1 matrices B Bényi, GV Nagy
Advances in Applied Mathematics 96, 195-215, 2018
9 2018 Some identities involving central binomial coefficients and Catalan numbers H Alzer, GV Nagy
Integers 20, A59, 2020
7 2020 A bijective proof of Shapiro's Catalan convolution P Hajnal, GV Nagy
The Electronic Journal of Combinatorics, P2. 42-P2. 42, 2014
5 2014 Simply sequentially additive labelings of 2-regular graphs P Hajnal, G Nagy
Discrete mathematics 310 (4), 922-928, 2010
5 2010 Lonesum and Γ-free 0-1 fillings of Ferrers shapes B Bényi, GV Nagy
European Journal of Combinatorics 89, 103180, 2020
3 2020 A convexity property of discrete random walks GV Nagy, V Totik
Combinatorics, Probability and Computing 25 (6), 928-940, 2016
1 2016 On the convexity of a hitting distribution for discrete random walks GV Nagy, A Szalai
Acta Scientiarum Mathematicarum 82, 305-312, 2016
1 2016 Horst Alzer Waldbröl, Germany h. alzer@ gmx. de Gábor V. Nagy1 Bolyai Institute, University of Szeged, Hungary GV Nagy
INTEGERS 20, 2, 2020
2020 Lonesum and -free - fillings of Ferrers shapes GV Nagy, B Bényi
arXiv preprint arXiv:1911.10342, 2019
2019 On the staircases of Gyárfás J Csányi, P Hajnal, G Nagy
ELECTRONIC JOURNAL OF COMBINATORICS 23 (2), Terjedelem: 10 p.-Azonosító: P2. 17., 2016
2016 On the staircases of Gy\'arf\'as J Csányi, P Hajnal, GV Nagy
arXiv preprint arXiv:1511.03504, 2015
2015 Rácsséták bijektív leszámlálása G Nagy
szte, 2014
2014 Bijective enumeration of lattice walks Outline of Ph. D. thesis G Nagy