Analyzing coexistence and survival scenarios of Lotka-Volterra (LV) networks in which the total biomass is conserved is of vital importance for the characterization of long-term dynamics of ecological communities. Here, we introduce a classification scheme for coexistence scenarios in these conservative LV models and quantify the extinction process by employing the Pfaffian of the network's interaction matrix. We illustrate our findings on global stability properties for general systems of four and five species and find a generalized scaling law for the extinction time
In this thesis we study the behaviour of three- and many-species systems, when the stochastic nature...
We use generating functionals to derive effective dynamics for Lotka-Volterra systems with random in...
In this work we study the stability of the equilibria reached by ecosystems formed by a large number...
Analyzing coexistence and survival scenarios of Lotka-Volterra (LV) networks in which the total biom...
The role of species interactions in controlling the interplay between the stability of ecosystems an...
We consider a multi-species community modelled as a complex network of populations, where the links ...
Cyclic dominance of species has been identified as a potential mechanism to maintain biodiversity, s...
We investigate the formation of stable ecological networks where many species share the same resourc...
We analyze purely competitive many-species Lotka-Volterra systems with random interaction matrices, ...
Transitions to absorbing states are of fundamental importance in nonequilibrium physics as well as e...
We analyze a general theory for coexistence and extinction of ecological communities that are influe...
Trabajo presentado en la Conference on Complex Systems (CCS), celebrada en Lyon del 25 al 29 de octu...
© American Institute of Mathematical Sciences. Mutualistic networks are considered an example of res...
AbstractIn this paper, we first consider a general N-species nonautonomous Lotka–Volterra system. We...
It is well known that for the two species autonomous competitive Lotka-Volterra model with no fixed ...
In this thesis we study the behaviour of three- and many-species systems, when the stochastic nature...
We use generating functionals to derive effective dynamics for Lotka-Volterra systems with random in...
In this work we study the stability of the equilibria reached by ecosystems formed by a large number...
Analyzing coexistence and survival scenarios of Lotka-Volterra (LV) networks in which the total biom...
The role of species interactions in controlling the interplay between the stability of ecosystems an...
We consider a multi-species community modelled as a complex network of populations, where the links ...
Cyclic dominance of species has been identified as a potential mechanism to maintain biodiversity, s...
We investigate the formation of stable ecological networks where many species share the same resourc...
We analyze purely competitive many-species Lotka-Volterra systems with random interaction matrices, ...
Transitions to absorbing states are of fundamental importance in nonequilibrium physics as well as e...
We analyze a general theory for coexistence and extinction of ecological communities that are influe...
Trabajo presentado en la Conference on Complex Systems (CCS), celebrada en Lyon del 25 al 29 de octu...
© American Institute of Mathematical Sciences. Mutualistic networks are considered an example of res...
AbstractIn this paper, we first consider a general N-species nonautonomous Lotka–Volterra system. We...
It is well known that for the two species autonomous competitive Lotka-Volterra model with no fixed ...
In this thesis we study the behaviour of three- and many-species systems, when the stochastic nature...
We use generating functionals to derive effective dynamics for Lotka-Volterra systems with random in...
In this work we study the stability of the equilibria reached by ecosystems formed by a large number...