International audienceThis paper describes a generic Taylor series based continuation method, the so-called Asymptotic Numerical Method, to compute the bifurcation diagrams of nonlinear systems. The key point of this approach is the quadratic recast of the equations as it allows to treat in the same way a wide range of dynamical systems and their solutions. Implicit Differential-Algebraic Equations, forced or autonomous, possibly with time-delay or fractional order derivatives are handled in the same framework. The static, periodic and quasi-periodic solutions can be continued as well as transient solutions
Abstract: We propose algorithms that allow for nonlinear equations to obtain asymptotic ex...
International audienceThis paper addresses the numerical computation of periodic solutions of nonlin...
We propose an approximation of nonlinear renewal equations by means of or- dinary differential equat...
International audienceThis paper describes a generic Taylor series based continuation method, the so...
International audienceThis paper is concerned with a Taylor series based continuation algorithm, ie,...
Cette thèse présente une approche générique pour l’étude des systèmes dynamiques. Elle repose sur la...
Path following in combination with boundary value problem solvers has emerged as a continuing and st...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Abstract Mathematical modelling allows us to concisely describe fundamental principles in biology. ...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
International audienceThis article presents an extension of the Asymptotic Numerical Method combined...
Many ordinary differential equations that describe physical phenomena possess solutions that cannot ...
International audienceSome of the theoretical aspects of continuation and bifurcation methods devote...
A numerical algorithm for continuation of stationary solutions to nonlinear evolution problems repre...
AbstractWe discuss numerical methods for the computation and continuation of equilibria and bifurcat...
Abstract: We propose algorithms that allow for nonlinear equations to obtain asymptotic ex...
International audienceThis paper addresses the numerical computation of periodic solutions of nonlin...
We propose an approximation of nonlinear renewal equations by means of or- dinary differential equat...
International audienceThis paper describes a generic Taylor series based continuation method, the so...
International audienceThis paper is concerned with a Taylor series based continuation algorithm, ie,...
Cette thèse présente une approche générique pour l’étude des systèmes dynamiques. Elle repose sur la...
Path following in combination with boundary value problem solvers has emerged as a continuing and st...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Abstract Mathematical modelling allows us to concisely describe fundamental principles in biology. ...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
International audienceThis article presents an extension of the Asymptotic Numerical Method combined...
Many ordinary differential equations that describe physical phenomena possess solutions that cannot ...
International audienceSome of the theoretical aspects of continuation and bifurcation methods devote...
A numerical algorithm for continuation of stationary solutions to nonlinear evolution problems repre...
AbstractWe discuss numerical methods for the computation and continuation of equilibria and bifurcat...
Abstract: We propose algorithms that allow for nonlinear equations to obtain asymptotic ex...
International audienceThis paper addresses the numerical computation of periodic solutions of nonlin...
We propose an approximation of nonlinear renewal equations by means of or- dinary differential equat...