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Author Aledo, J.A.; Goles, E.; Montalva-Medel, M.; Montealegre, P.; Valverde, J.C.
Title Symmetrizable Boolean networks Type
Year 2023 Publication Information Sciences Abbreviated Journal Inf. Sci.
Volume 626 Issue Pages 787-804
Keywords Generalized parallel dynamical system; Period structure; Limit cycles, Symmetric and anti-symmetric networks; Symmetrizable networks
Abstract In this work, we provide a procedure that allows us to transform certain kinds of deterministic Boolean networks on minterm or maxterm functions into symmetric ones, so inferring that such symmetrizable networks can present only periodic points of periods 1 or 2. In particular, we deal with generalized parallel (or synchronous) dynamical systems (GPDS) over undirected graphs, i. e., discrete parallel dynamical systems over undirected graphs where some of the self-loops may not appear. We also study the class of anti-symmetric GPDS (which are non-symmetrizable), proving that their periodic orbits have period 4. In addition, we introduce a class of non-symmetrizable systems which admit periodic orbits with arbitrary large periods.
Address
Corporate Author Thesis
Publisher Place of Publication Editor
Language Summary Language Original Title
Series Editor Series Title Abbreviated Series Title
Series Volume Series Issue Edition
ISSN 0020-0255 ISBN Medium
Area Expedition Conference
Notes WOS:000925957000001 Approved
Call Number UAI @ alexi.delcanto @ Serial 1745
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Author Goles, E.; Montalva-Medel, M.; Montealegre, P.; Rios-Wilson, M.
Title On the complexity of generalized Q2R automaton Type
Year 2022 Publication Advances In Applied Mathematics Abbreviated Journal Adv. Appl. Math.
Volume 138 Issue Pages 102355
Keywords Q2R networks; Computational complexity; Limit cycles; P-complete
Abstract We study the dynamic and complexity of the generalized Q2R automaton. We show the existence of non-polynomial cycles as well as its capability to simulate with the synchronous update the classical version of the automaton updated under a block sequential update scheme. Furthermore, we show that the decision problem consisting in determine if a given node in the network changes its state is P-Hard.
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Corporate Author Thesis
Publisher Place of Publication Editor
Language Summary Language Original Title
Series Editor Series Title Abbreviated Series Title
Series Volume Series Issue Edition
ISSN 0196-8858 ISBN Medium
Area Expedition Conference
Notes WOS:000830087300008 Approved
Call Number UAI @ alexi.delcanto @ Serial 1610
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Author Goles, E.; Montealegre, P.; Vera, J.
Title Naming Game Automata Networks Type
Year 2016 Publication Journal Of Cellular Automata Abbreviated Journal J. Cell. Autom.
Volume 11 Issue 5-6 Pages 497-521
Keywords Automata networks; cellular automata; majority functions; energy operator; naming game; fixed points; limit cycles
Abstract In this paper we introduce automata networks to model some features of the emergence of a vocabulary related with the naming game model. We study the dynamical behaviour (attractors and convergence) of extremal and majority local functions.
Address [Goles, Eric; Vera, Javier] Univ Adolfo Ibanez, Fac Ingn & Ciencias, Avda Diagonal Las Torres 2640, Santiago, Chile, Email: eric.chacc@uai.cl;
Corporate Author Thesis
Publisher Old City Publishing Inc Place of Publication Editor
Language English Summary Language Original Title
Series Editor Series Title Abbreviated Series Title
Series Volume Series Issue Edition
ISSN 1557-5969 ISBN Medium
Area Expedition Conference
Notes WOS:000382426500007 Approved
Call Number UAI @ eduardo.moreno @ Serial 649
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Author Vera-Damian, Y.; Vidal, C.; Gonzalez-Olivares, E.
Title Dynamics and bifurcations of a modified Leslie-Gower-type model considering a Beddington-DeAngelis functional response Type
Year 2019 Publication Mathematical Methods In The Applied Sciences Abbreviated Journal Math. Meth. Appl. Sci.
Volume 42 Issue 9 Pages 3179-3210
Keywords Beddington-DeAngelis functional response; Bogdanov-Takens bifurcation; homoclinic bifurcation; Hopf bifurcation; limit cycles; predator-prey model; stability
Abstract In this paper, a planar system of ordinary differential equations is considered, which is a modified Leslie-Gower model, considering a Beddington-DeAngelis functional response. It generates a complex dynamics of the predator-prey interactions according to the associated parameters. From the system obtained, we characterize all the equilibria and its local behavior, and the existence of a trapping set is proved. We describe different types of bifurcations (such as Hopf, Bogdanov-Takens, and homoclinic bifurcation), and the existence of limit cycles is shown. Analytic proofs are provided for all results. Ecological implications and a set of numerical simulations supporting the mathematical results are also presented.
Address [Vera-Damian, Yrina] Univ Adolfo Ibanez, Fac Ingn & Ciencias, Santiago, Chile, Email: edvera@alumnos.uai.cl
Corporate Author Thesis
Publisher Wiley Place of Publication Editor
Language English Summary Language Original Title
Series Editor Series Title Abbreviated Series Title
Series Volume Series Issue Edition
ISSN 0170-4214 ISBN Medium
Area Expedition Conference
Notes WOS:000467275100016 Approved
Call Number UAI @ eduardo.moreno @ Serial 998
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