We examine in this paper so-called B-critical points of linear, time-varying differential-algebraic equations (DAEs) of the form A(t)(D(t)x(t))' + B(t)x(t) = q(t). These critical or singular points, which cannot be handled by classical projector methods, require adapting a recently introduced framework based on Π-projectors. Via a continuation of certain invariant spaces through the singularity, we arrive at an scenario which accommodates both A- and Bcritical DAEs. The working hypotheses apply in particular to standard-form analytic systems although, in contrast to other approaches to critical problems, the scope of our approach extends beyond the analytic setting. Some examples illustrate the results
AbstractBoundary value problems for linear differential-algebraic equations (DAEs) with time-varying...
Abstract. In the sequel to [12], we discuss behavioural approach for linear, time-varying, different...
Nonlinear differential-algebraic equations with properly stated leading term of index one and two ar...
We examine in this paper so-called B-critical points of linear, time-varying differential-algebraic ...
This paper addresses critical points of linear differential-algebraic equations (DAEs) of the form A...
AbstractWe consider in this work linear, time-varying differential-algebraic equations (DAEs) of the...
Singular issues arising in linear time-varying differential-algebraic equations are addressed in thi...
Several features and interrelations of projector methods and reduction techniques for the analysis o...
We introduce a solution theory for time-varying linear differential-algebraic equations (DAEs) E(t)x...
In this paper, general solvability statements on linear continuous coefficient differential algebrai...
The paper is devoted to the systems of equations A(x) ẋ = v(x) in real finite-dimensional phase spac...
Given an arbitrary initial value x(0)(-) for the differential-algebraic equation A (x) over circle (...
AbstractThe extent to which a completion x′=G(t)x+∑ri=0Ri(t)f(i)(t) of a linear ti me varying differ...
AbstractWe present several solvability concepts for linear differential-algebraic equations (DAEs) w...
Linear differential algebraic equations with properly stated leading term are considered via a decou...
AbstractBoundary value problems for linear differential-algebraic equations (DAEs) with time-varying...
Abstract. In the sequel to [12], we discuss behavioural approach for linear, time-varying, different...
Nonlinear differential-algebraic equations with properly stated leading term of index one and two ar...
We examine in this paper so-called B-critical points of linear, time-varying differential-algebraic ...
This paper addresses critical points of linear differential-algebraic equations (DAEs) of the form A...
AbstractWe consider in this work linear, time-varying differential-algebraic equations (DAEs) of the...
Singular issues arising in linear time-varying differential-algebraic equations are addressed in thi...
Several features and interrelations of projector methods and reduction techniques for the analysis o...
We introduce a solution theory for time-varying linear differential-algebraic equations (DAEs) E(t)x...
In this paper, general solvability statements on linear continuous coefficient differential algebrai...
The paper is devoted to the systems of equations A(x) ẋ = v(x) in real finite-dimensional phase spac...
Given an arbitrary initial value x(0)(-) for the differential-algebraic equation A (x) over circle (...
AbstractThe extent to which a completion x′=G(t)x+∑ri=0Ri(t)f(i)(t) of a linear ti me varying differ...
AbstractWe present several solvability concepts for linear differential-algebraic equations (DAEs) w...
Linear differential algebraic equations with properly stated leading term are considered via a decou...
AbstractBoundary value problems for linear differential-algebraic equations (DAEs) with time-varying...
Abstract. In the sequel to [12], we discuss behavioural approach for linear, time-varying, different...
Nonlinear differential-algebraic equations with properly stated leading term of index one and two ar...