The following publications are possibly variants of this publication:
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- Stateless multicounter 5′ → 3′ Watson-Crick automataÖmer Egecioglu, László Hegedüs, Benedek Nagy. bic-ta 2010: 1599-1606 [doi]
- Stateless multicounter 5′ → 3′ Watson-Crick automata: the deterministic caseLászló Hegedüs, Benedek Nagy, Ömer Egecioglu. nc, 11(3):361-368, 2012. [doi]
- On String Reading Stateless Multicounter 5′ → 3′ Watson-Crick Automata - (Extended Abstract)László Hegedüs, Benedek Nagy. uc 2013: 257-258 [doi]
- A Survey of Results on Stateless Multicounter AutomataOscar H. Ibarra, Ömer Egecioglu. FUIN, 116(1-4):129-140, 2012. [doi]
- On a hierarchy of 5′ → 3′ sensing Watson-Crick finite automata languagesBenedek Nagy. logcom, 23(4):855-872, 2013. [doi]
- 5' → 3' Watson-Crick Automata with Several RunsPeter Leupold, Benedek Nagy. ncma 2009: 167-180
- 5′→3′ Watson-Crick pushdown automataBenedek Nagy. isci, 537:452-466, 2020. [doi]
- On deterministic sensing $5'\rightarrow 3'$ Watson-Crick finite automata: a full hierarchy in 2detLINBenedek Nagy, Shaghayegh Parchami. ACTA, 58(3):153-175, 2021. [doi]
- A jumping 5' → 3' Watson-Crick finite automata modelRadim Kocman, Benedek Nagy, Zbynek Krivka, Alexander Meduna. ncma 2018: 117-132
- On 5 --> 3 Sensing Watson-Crick Finite AutomataBenedek Nagy. dna 2008: 256-262 [doi]
- $5'\rightarrow 3'$ Watson-Crick automata languages-without sensing parameterBenedek Nagy, Shaghayegh Parchami. nc, 21(4):679-691, 2022. [doi]
- A jumping $5'\rightarrow 3'$ Watson-Crick finite automata modelRadim Kocman, Zbynek Krivka, Alexander Meduna, Benedek Nagy. ACTA, 59(5):557-584, 2022. [doi]
- State-deterministic $5'\rightarrow 3'$ Watson-Crick automataBenedek Nagy. nc, 20(4):725-737, 2021. [doi]