Ecosystems represent archetypal complex dynamical systems, often modelled by coupled differential equations of the form$$\frac{d x_i}{d t} = x_i \varphi_i(x_1,\cdots, x_N)\ ,$$where $N$ represents the number of species and $x_i$, the abundance of species $i$. Among these families of coupled diffential equations, Lotka-Volterra (LV) equations $$\frac{d x_i}{d t} = x_i ( r_i - x_i +(\Gamma \mathbf{x})_i)\ ,$$play a privileged role, as the LV model represents an acceptable trade-off between complexity and tractability. Here, $r_i$ represents the intrinsic growth of species $i$ and $\Gamma$ stands for the interaction matrix: $\Gamma_{ij}$ represents the effect of species $j$ over species $i$. For large $N$, estimating matrix $\Gamma$ is often ...
Complex system stability can be studied via linear stability analysis using Random Matrix Theory (RM...
AbstractA mathematical model of ecoevolution is studied. The model treats ecosystems as large dimens...
Classical Lotka-Volterra (LV) model for oscillatory behavior of population sizes of two interacting ...
Ecosystems represent archetypal complex dynamical systems, often modelled by coupled differential eq...
Ecosystems represent archetypal complex dynamical systems, often modelled by coupled differential eq...
I briefly review the history of models for population dynamics, and the use of networks in ecology. ...
Random matrix theory has found applications in many fields, ranging from physics, number theory and ...
The eigenvalue spectrum of a random matrix often only depends on the first and second moments of its...
We use generating functionals to derive effective dynamics for Lotka-Volterra systems with random in...
Ecosystems with a large number of species are often modelled as Lotka-Volterra dynamical systems bui...
In the 70's, Robert May demonstrated that complexity creates instability in generic models of e...
In this project we studied the well-known generalised Lotka-Volterra model, usually employed in popu...
33 pages, 11 figuresThe Lotka-Volterra (LV) model is a simple, robust, and versatile model used to d...
Understanding the relationship between complexity and stability in large dynamical systems - such as...
Ecosystems with a large number of species are often modelled as Lotka-Volterra dynamical systems bui...
Complex system stability can be studied via linear stability analysis using Random Matrix Theory (RM...
AbstractA mathematical model of ecoevolution is studied. The model treats ecosystems as large dimens...
Classical Lotka-Volterra (LV) model for oscillatory behavior of population sizes of two interacting ...
Ecosystems represent archetypal complex dynamical systems, often modelled by coupled differential eq...
Ecosystems represent archetypal complex dynamical systems, often modelled by coupled differential eq...
I briefly review the history of models for population dynamics, and the use of networks in ecology. ...
Random matrix theory has found applications in many fields, ranging from physics, number theory and ...
The eigenvalue spectrum of a random matrix often only depends on the first and second moments of its...
We use generating functionals to derive effective dynamics for Lotka-Volterra systems with random in...
Ecosystems with a large number of species are often modelled as Lotka-Volterra dynamical systems bui...
In the 70's, Robert May demonstrated that complexity creates instability in generic models of e...
In this project we studied the well-known generalised Lotka-Volterra model, usually employed in popu...
33 pages, 11 figuresThe Lotka-Volterra (LV) model is a simple, robust, and versatile model used to d...
Understanding the relationship between complexity and stability in large dynamical systems - such as...
Ecosystems with a large number of species are often modelled as Lotka-Volterra dynamical systems bui...
Complex system stability can be studied via linear stability analysis using Random Matrix Theory (RM...
AbstractA mathematical model of ecoevolution is studied. The model treats ecosystems as large dimens...
Classical Lotka-Volterra (LV) model for oscillatory behavior of population sizes of two interacting ...