We investigate a generalised version of the recently proposed ordinal partition time series to network transformation algorithm. First, we introduce a fixed time lag for the elements of each partition that is selected using techniques from traditional time delay embedding. The resulting partitions define regions in the embedding phase space that are mapped to nodes in the network space. Edges are allocated between nodes based on temporal succession thus creating a Markov chain representation of the time series. We then apply this new transformation algorithm to time series generated by the Rossler system and find that periodic dynamics translate to ring structures whereas chaotic time series translate to band or tube-like structures-thereby...
We examine the relation between the structure of a network and the spatio-temporally symmetric perio...
We consider the synchronization of oscillators in complex networks where there is an interplay betwe...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Recently proposed ordinal networks not only afford novel methods of nonlinear time series analysis b...
Recently a new framework has been proposed to explore the dynamics of pseudoperiodic time series by ...
We characterize the evolution of a dynamical system by combining two well-known complex systems' too...
As effective representations of complex systems, complex networks have attracted scholarly attention...
In this study, we propose a new information theoretic measure to quantify the complexity of biologic...
We introduce a representation space to contrast chaotic with stochastic dynamics. Following the comp...
We introduce a transformation from time series to complex networks and then study the relative frequ...
Wecharacterize the evolution of a dynamical systemby combining twowell-known complex systems’ tools,...
<p>We use 10,000 time points of the variable of the chaotic Lorenz and Rossler equations and constr...
Abstract Power grids, transportation systems, neural circuits and gene regulatory networks are just ...
This work presents a framework for studying temporal networks using zigzag persistence, a tool from ...
Identifying influential nodes in network dynamical systems requires the manipulation of topological ...
We examine the relation between the structure of a network and the spatio-temporally symmetric perio...
We consider the synchronization of oscillators in complex networks where there is an interplay betwe...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...
Recently proposed ordinal networks not only afford novel methods of nonlinear time series analysis b...
Recently a new framework has been proposed to explore the dynamics of pseudoperiodic time series by ...
We characterize the evolution of a dynamical system by combining two well-known complex systems' too...
As effective representations of complex systems, complex networks have attracted scholarly attention...
In this study, we propose a new information theoretic measure to quantify the complexity of biologic...
We introduce a representation space to contrast chaotic with stochastic dynamics. Following the comp...
We introduce a transformation from time series to complex networks and then study the relative frequ...
Wecharacterize the evolution of a dynamical systemby combining twowell-known complex systems’ tools,...
<p>We use 10,000 time points of the variable of the chaotic Lorenz and Rossler equations and constr...
Abstract Power grids, transportation systems, neural circuits and gene regulatory networks are just ...
This work presents a framework for studying temporal networks using zigzag persistence, a tool from ...
Identifying influential nodes in network dynamical systems requires the manipulation of topological ...
We examine the relation between the structure of a network and the spatio-temporally symmetric perio...
We consider the synchronization of oscillators in complex networks where there is an interplay betwe...
We provide the topological structure of a series of N=28 Rössler chaotic oscillators diffusively cou...