We consider a class of differential-algebraic equations (DAEs) defined by analytic nonlinearities and study its singular solutions. The main assumption used is that the linearization of the DAE represents a Kronecker index-2 matrix pencil and that the constraint manifold has a quadratic fold along its singularity. From these assumptions we obtain a normal form for the DAE where the presence of the singularity and its effects on the dynamics of the problem are made explicit in the form of a quasi-linear differential equation. Subsequently, two distinct types of singular points are identified through which there pass exactly two analytic solutions: pseudo-nodes and pseudo-saddles. We also demonstrate that a singular point called a pseudo-node...
International audienceBorel summable divergent series usually appear when studying solutions of anal...
AbstractDifferential geometric and algebraic ideas are exposed and transposed into algorithms to det...
This paper deals with the problems of integrability and linearizable conditions at degenerate singul...
We consider a class of differential-algebraic equations (DAEs) defined by analytic nonlinearities an...
We extend the differential-algebraic equation (DAE) taxonomy by assuming that the linearization of a...
The analysis of differential equations in domains and on manifolds with singularities belongs to the...
. We show how certain singularities of quasilinear differential and differentialalgberaic equations ...
The divergence through infinity of certain eigenvalues of a linearized differential-algebraic equati...
The paper is devoted to the systems of equations A(x) ẋ = v(x) in real finite-dimensional phase spac...
AbstractDifferential algebraic equations (DAEs) define a differential equation on a manifold. A numb...
Singular issues arising in linear time-varying differential-algebraic equations are addressed in thi...
We describe different aspects of the theory of pseudo-differential equations on manifolds with non-s...
We study model discrete pseudo-differential equations in some canonical domains of Euclidean space. ...
Differential and pseudo-differential operators on a manifold with (regular) geometric singularities ...
In this thesis we study the local solvability of a class of real analytic singular systems of nonlin...
International audienceBorel summable divergent series usually appear when studying solutions of anal...
AbstractDifferential geometric and algebraic ideas are exposed and transposed into algorithms to det...
This paper deals with the problems of integrability and linearizable conditions at degenerate singul...
We consider a class of differential-algebraic equations (DAEs) defined by analytic nonlinearities an...
We extend the differential-algebraic equation (DAE) taxonomy by assuming that the linearization of a...
The analysis of differential equations in domains and on manifolds with singularities belongs to the...
. We show how certain singularities of quasilinear differential and differentialalgberaic equations ...
The divergence through infinity of certain eigenvalues of a linearized differential-algebraic equati...
The paper is devoted to the systems of equations A(x) ẋ = v(x) in real finite-dimensional phase spac...
AbstractDifferential algebraic equations (DAEs) define a differential equation on a manifold. A numb...
Singular issues arising in linear time-varying differential-algebraic equations are addressed in thi...
We describe different aspects of the theory of pseudo-differential equations on manifolds with non-s...
We study model discrete pseudo-differential equations in some canonical domains of Euclidean space. ...
Differential and pseudo-differential operators on a manifold with (regular) geometric singularities ...
In this thesis we study the local solvability of a class of real analytic singular systems of nonlin...
International audienceBorel summable divergent series usually appear when studying solutions of anal...
AbstractDifferential geometric and algebraic ideas are exposed and transposed into algorithms to det...
This paper deals with the problems of integrability and linearizable conditions at degenerate singul...