Add to ORKGThis paper deals with the most interesting three dimensional Volterra systems, which have first a sign stable interaction matrix. This matrix is stably admissible too. Then we consider a balanced interaction matrix, which is not sign stable, because it has a cycle, but it is stably admissible, and lost we consider an interesting not stably admissible case
Lotka-Volterra systems are the canonical ecological models used to analyze population dynamics of co...
It is well known that, for mass-action systems, complex-balanced equilibria are asymptotically stabl...
This research manifesto has a comprehensive discussion of the global dynamics of an achievable discr...
This paper deals with the most interesting three dimensional Volterra systems, which have first a s...
For stably dissipative Lotka{Volterra equations the dynamics on the attractor are Hamiltonian and we...
Complex system stability can be studied via linear stability analysis using Random Matrix Theory (RM...
The topic of matrix stability is very important for determining the stability of solutions to system...
AbstractWe prove that for a three-dimensional Lotka-Volterra system, if its interaction matrix is Vo...
AbstractFor a dynamical system ẋ=Ax+b, where A is constant real n×n matrix and b is an n-vector the...
AbstractThe unique positive equilibrium of a Lotka-Volterra system with a weakly diagonally dominant...
AbstractThe stability of modified Volterra differential equations with an interaction term, modelled...
In this paper we study in detail the structure of the global attractor for a generalized Lotka-Volte...
AbstractFor the class of stably dissipative Lotka–Volterra systems we prove that the rank of its def...
This dissertation investigates global and local minima in two models: the Lotka--Volterra model for ...
We analyze the stability of linear dynamical systems defined on sparse, random graphs with predator-...
Lotka-Volterra systems are the canonical ecological models used to analyze population dynamics of co...
It is well known that, for mass-action systems, complex-balanced equilibria are asymptotically stabl...
This research manifesto has a comprehensive discussion of the global dynamics of an achievable discr...
This paper deals with the most interesting three dimensional Volterra systems, which have first a s...
For stably dissipative Lotka{Volterra equations the dynamics on the attractor are Hamiltonian and we...
Complex system stability can be studied via linear stability analysis using Random Matrix Theory (RM...
The topic of matrix stability is very important for determining the stability of solutions to system...
AbstractWe prove that for a three-dimensional Lotka-Volterra system, if its interaction matrix is Vo...
AbstractFor a dynamical system ẋ=Ax+b, where A is constant real n×n matrix and b is an n-vector the...
AbstractThe unique positive equilibrium of a Lotka-Volterra system with a weakly diagonally dominant...
AbstractThe stability of modified Volterra differential equations with an interaction term, modelled...
In this paper we study in detail the structure of the global attractor for a generalized Lotka-Volte...
AbstractFor the class of stably dissipative Lotka–Volterra systems we prove that the rank of its def...
This dissertation investigates global and local minima in two models: the Lotka--Volterra model for ...
We analyze the stability of linear dynamical systems defined on sparse, random graphs with predator-...
Lotka-Volterra systems are the canonical ecological models used to analyze population dynamics of co...
It is well known that, for mass-action systems, complex-balanced equilibria are asymptotically stabl...
This research manifesto has a comprehensive discussion of the global dynamics of an achievable discr...