Center Manifolds of Coupled Cell Networks

Eddie Nijholt; Bob Rink; Jan Sanders

doi:10.1137/18m1219977

Center Manifolds of Coupled Cell Networks

SIAM Journal on Mathematical Analysis ◽

10.1137/16m106861x ◽

2017 ◽

Vol 49 (5) ◽

pp. 4117-4148 ◽

Cited By ~ 8

Author(s):

Eddie Nijholt ◽

Bob Rink ◽

Jan Sanders

Keyword(s):

Center Manifolds ◽

Coupled Cell Networks ◽

Cell Networks

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Coupled cell networks: minimality

PAMM ◽

10.1002/pamm.200700991 ◽

2007 ◽

Vol 7 (1) ◽

pp. 1030501-1030502

Author(s):

Manuela A. D. Aguiar ◽

Ana Paula S. Dias

Keyword(s):

Coupled Cell Networks ◽

Cell Networks

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Coupled cell networks are target cells of inflammation, which can spread between different body organs and develop into systemic chronic inflammation

Journal of Inflammation ◽

10.1186/s12950-015-0091-2 ◽

2015 ◽

Vol 12 (1) ◽

Cited By ~ 15

Author(s):

Elisabeth Hansson ◽

Eva Skiöldebrand

Keyword(s):

Chronic Inflammation ◽

Target Cells ◽

Coupled Cell Networks ◽

Cell Networks

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Enumerating periodic patterns of synchrony via finite bidirectional networks

Proceedings of The Royal Society A Mathematical Physical and Engineering Sciences ◽

10.1098/rspa.2009.0404 ◽

2009 ◽

Vol 466 (2115) ◽

pp. 891-910

Author(s):

Ana Paula S. Dias ◽

Eliana Manuel Pinho

Keyword(s):

Nearest Neighbour ◽

Periodic Patterns ◽

Finite Dimensional ◽

Spatial Periodicity ◽

Coupled Cell Networks ◽

Euclidean Lattice ◽

Lattice Network ◽

Bidirectional Networks ◽

The Given ◽

Cell Networks

Periodic patterns of synchrony are lattice networks whose cells are coloured according to a local rule, or balanced colouring, and such that the overall system has spatial periodicity. These patterns depict the finite-dimensional flow-invariant subspaces for all the lattice dynamical systems, in the given lattice network, that exhibit those periods. Previous results relate the existence of periodic patterns of synchrony, in n -dimensional Euclidean lattice networks with nearest neighbour coupling architecture, with that of finite coupled cell networks that follow the same colouring rule and have all the couplings bidirectional. This paper addresses the relation between periodic patterns of synchrony and finite bidirectional coloured networks. Given an n -dimensional Euclidean lattice network with nearest neighbour coupling architecture, and a colouring rule with k colours, we enumerate all the periodic patterns of synchrony generated by a given finite network, or graph. This enumeration is constructive and based on the automorphisms group of the graph.

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On bifurcations in lifts of regular uniform coupled cell networks

Proceedings of The Royal Society A Mathematical Physical and Engineering Sciences ◽

10.1098/rspa.2014.0241 ◽

2014 ◽

Vol 470 (2169) ◽

pp. 20140241 ◽

Cited By ~ 5

Author(s):

Célia Sofia Moreira

Keyword(s):

Bifurcation Point ◽

Cell System ◽

Point Of View ◽

Coupled Cell Networks ◽

Regular Network ◽

Cell Networks

A lift of a given network is a network that admits the first network as quotient. Assuming that a bifurcation occurs for a coupled cell system consistent with the structure of a regular network (in which all cells have the same type and receive the same number of inputs and all arrows have the same type), it is well known that some lifts exhibit new bifurcating branches of solutions. In this work, we approach this problem restricting attention to uniform networks, that is, networks that have no loops and no multiple arrows. We show that, from the bifurcation point of view, rings and their lifts are special networks. We also prove that generically there are lifts that just exhibit the bifurcating branches determined by the quotient network and, moreover, we identify all generic situations where lifts exist that may exhibit bifurcating branches that do not appear in the quotient itself.

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