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Author Arevalo, I.; Hernandez, R.; Martin, M.J.; Vukotic, D.
Title On weighted compositions preserving the Caratheodory class Type
Year 2018 Publication Monatshefte Fur Mathematik Abbreviated Journal Mon.heft. Math.
Volume 187 Issue 3 Pages 459-477
Keywords Functions with positive real part (Caratheodory class); Weighted composition transformation; Angular derivative; Inner functions; Fixed points; 30C45; 47B33
Abstract We characterize in various ways the weighted composition transformations which preserve the class P of normalized analytic functions in the disk with positive real part. We analyze the meaning of the criteria obtained for various special cases of symbols and identify the fixed points of such transformations.
Address [Arevalo, Irina; Vukotic, Dragan] Univ Autonoma Madrid, Dept Matemat, E-28049 Madrid, Spain, Email: irina.arevalo@uam.es;
Corporate Author Thesis
Publisher Springer Wien Place of Publication Editor
Language English Summary Language Original Title
Series Editor Series Title Abbreviated Series Title
Series Volume Series Issue Edition
ISSN 0026-9255 ISBN Medium
Area Expedition Conference
Notes WOS:000445654000004 Approved
Call Number UAI @ eduardo.moreno @ Serial 916
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Author Goles, E.; Ruz, G.A.
Title Dynamics of neural networks over undirected graphs Type
Year 2015 Publication Neural Networks Abbreviated Journal Neural Netw.
Volume 63 Issue Pages 156-169
Keywords Neural networks; Undirected graphs; Discrete updating schemes; Attractors; Fixed points; Cycles
Abstract In this paper we study the dynamical behavior of neural networks such that their interconnections are the incidence matrix of an undirected finite graph G = (V, E) (i.e., the weights belong to {0, 1}). The network may be updated synchronously (every node is updated at the same time), sequentially (nodes are updated one by one in a prescribed order) or in a block-sequential way (a mixture of the previous schemes). We characterize completely the attractors (fixed points or cycles). More precisely, we establish the convergence to fixed points related to a parameter alpha(G), taking into account the number of loops, edges, vertices as well as the minimum number of edges to remove from E in order to obtain a maximum bipartite graph. Roughly, alpha(G') < 0 for any G' subgraph of G implies the convergence to fixed points. Otherwise, cycles appear. Actually, for very simple networks (majority functions updated in a block-sequential scheme such that each block is of minimum cardinality two) we exhibit cycles with nonpolynomial periods. (C) 2014 Elsevier Ltd. All rights reserved.
Address [Goles, Eric; Ruz, Gonzalo A.] Univ Adolfo Ibanez, Fac Ingn & Ciencias, Santiago, Chile, Email: eric.chacc@uai.cl;
Corporate Author Thesis
Publisher Pergamon-Elsevier Science Ltd Place of Publication Editor
Language English Summary Language Original Title
Series Editor Series Title Abbreviated Series Title
Series Volume Series Issue Edition
ISSN 0893-6080 ISBN Medium
Area Expedition Conference
Notes WOS:000349730800015 Approved
Call Number UAI @ eduardo.moreno @ Serial 460
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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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