Mathematical mindsets increase student motivation: Evidence from the EEG I Daly, J Bourgaize, A Vernitski Trends in Neuroscience and Education 15, 18-28, 2019 | 49 | 2019 |
The proof and the generalization of Higgins' theorem on divisors of semigroups of order-preserving mappings AS Vernitskii, MV Volkov Russian Mathematics-New York 39 (1), 34-39, 1995 | 33 | 1995 |
An approximate dynamic programming approach for improving accuracy of lossy data compression by Bloom filters X Yang, A Vernitski, L Carrea European Journal of Operational Research 252 (3), 985-994, 2016 | 29 | 2016 |
Optimized hash for network path encoding with minimized false positives L Carrea, A Vernitski, M Reed Computer networks 58, 180-191, 2014 | 26 | 2014 |
A generalization of symmetric inverse semigroups A Vernitski Semigroup Forum 75, 417-426, 2007 | 12 | 2007 |
Routing in hexagonal computer networks: How to present paths by Bloom filters without false positives GÇ Kayaturan, A Vernitski 2016 8th Computer Science and Electronic Engineering (CEEC), 95-100, 2016 | 10 | 2016 |
Automated Reasoning for Knot Semigroups and -orbifold Groups of Knots A Lisitsa, A Vernitski International Conference on Mathematical Aspects of Computer and Information …, 2017 | 9 | 2017 |
Yes-no bloom filter: A way of representing sets with fewer false positives L Carrea, A Vernitski, M Reed arXiv preprint arXiv:1603.01060, 2016 | 9 | 2016 |
“Too taxing on the mind!” Authentication grids are not for everyone K Krol, C Papanicolaou, A Vernitski, MA Sasse Human Aspects of Information Security, Privacy, and Trust: Third …, 2015 | 9 | 2015 |
Untangling braids with multi-agent q-learning A Khan, A Vernitski, A Lisitsa 2021 23rd International Symposium on Symbolic and Numeric Algorithms for …, 2021 | 8 | 2021 |
Filters in (quasiordered) semigroups and lattices of filters Z Juhasz, A Vernitski Communications in Algebra 39 (11), 4319-4335, 2011 | 8 | 2011 |
Orientation-preserving and orientation-reversing mappings: a new description PM Higgins, A Vernitski Semigroup Forum 104 (2), 509-514, 2022 | 7 | 2022 |
A way of eliminating errors when using bloom filters for routing in computer networks GC Kayaturan, A Vernitski Networks, ICN, 52-57, 2016 | 7 | 2016 |
Describing semigroups with defining relations of the form and and connections with knot theory A Vernitski Semigroup Forum 95, 66-82, 2017 | 6 | 2017 |
Performance modelling and analysis of dynamic virtual optical network composition S Peng, R Nejabati, E Escalona, D Simeonidou, M Anastasopoulos, ... 2012 16th International Conference on Optical Network Design and Modelling …, 2012 | 6 | 2012 |
Finite quasivarieties and self-referential conditions A Vernitski Studia Logica 78, 337-348, 2004 | 6 | 2004 |
The finite basis problem for the semigroups of order-preserving mappings AS Vernitskii Proceedings of the Royal Society of Edinburgh Section A: Mathematics 129 (3 …, 1999 | 6 | 1999 |
Circle graphs (chord interlacement graphs) of Gauss diagrams: Descriptions of realizable Gauss diagrams, algorithms, enumeration A Khan, A Lisitsa, V Lopatkin, A Vernitski arXiv preprint arXiv:2108.02873, 2021 | 5 | 2021 |
Gauss-Lintel, an Algorithm Suite for Exploring Chord Diagrams A Khan, A Lisitsa, A Vernitski International Conference on Intelligent Computer Mathematics, 197-202, 2021 | 5 | 2021 |
Experimental mathematics approach to Gauss diagrams realizability A Khan, A Lisitsa, A Vernitski arXiv preprint arXiv:2103.02102, 2021 | 5 | 2021 |