(9) An exploration of reversible septenary number-conserving cellular automata using a range of known methodsB. Wolnik, A. Dzedzej, M. Dziemiańczuk, A. Wardyn and B. De Baets(2023) NATURAL COMPUTING. 22, 463-475. |
(8) Seven-state rotation-symmetric number-conserving cellular automaton that is not isomorphic to any septenary oneB. Wolnik, A. Nenca, A. Dzedzej and B. De Baets(2023) PHYSICAL REVIEW E. 107, 024211. |
(7) Reversibility of number-conserving 1D cellular automata: unlocking insights into the dynamics for larger state setsB. Wolnik, M. Dziemiańczuk, A. Dzedzej and B. De Baets(2022) PHYSICA D: NONLINEAR PHENOMENA. 429, 133075. |
(6) Two-dimensional rotation-symmetric number-conserving cellular automataA. Dzedzej, B. Wolnik, A. Nenca, J.M. Baetens and B. De Baets(2021) INFORMATION SCIENCES. 577, 599-621. |
(5) Three-dimensional rotation-symmetric number-conserving cellular automataB. Wolnik, N. Mrożek, A. Dzedzej and B. De Baets(2020) JOURNAL OF CELLULAR AUTOMATA. 15, 243-259. |
(4) Efficient enumeration of three-state two-dimensional number-conserving cellular automataA. Dzedzej, B. Wolnik, A. Nenca, J.M. Baetens and B. De Baets(2020) INFORMATION AND COMPUTATION. 274, 104534. |
(3) A two-layer representation of four-state reversible number-conserving 2D cellular automataA. Dzedzej, B. Wolnik, M. Dziemiańczuk, A. Nenca, J.M. Baetens and B. De Baets(2019) JOURNAL OF STATISTICAL MECHANICS: THEORY AND EXPERIMENT. 2019, 073202. |
(2) A note on reversibility of 2D cellular automata on hexagonal gridsA. Augustynowicz, J.M. Baetens, B. De Baets, A. Dzedzej, A. Nenca and B. Wolnik(2018) JOURNAL OF CELLULAR AUTOMATA. 13, 521-525. |
(1) Number-conserving cellular automata with a von Neumann neighborhood of range oneB. Wolnik, A. Dzedzej, J.M. Baetens and B. De Baets(2017) JOURNAL OF PHYSICS A: MATHEMATICAL AND THEORETICAL. 50, 435101. |