Malkhaz Ashordia
abstract:
For the system of generalized linear ordinary differential equations, the
boundary value problem
$$ d x=d A(t)\cdot x+df(t)\;\;\;(t\in I),\quad \ell(x)=c_0 $$
is considered, where $I=[a,b]$ is a closed interval, $A:I\to \mathbb{R}^{n\times
n}$ and $f:I\to \mathbb{R}^n$ are, respectively, the
matrix- and vector-functions with components of bounded variation, $\ell$ is a
linear bounded vector-functional, $c_0\in \mathbb{R}^n$.
Under a solution of the system is understood a vector-function $x:I\to \mathbb{R}^n$
with components of bounded variation satisfying the corresponding integral
equality, where the integral is understood in the Kurzweil sense.
Along with a number of questions, such as solvability, construction of
solutions, etc., we investigate the problem of the well-posedness. Effective
sufficient conditions, as well as effective necessary and sufficient conditions,
are established for each of these problems.
The obtained results are realized for the above boundary value problem for
linear impulsive system
$$ \frac{dx}{dt} =P(t)x+q(t),\;\;\;x(\tau_l+)-x(\tau_l-)=G(\tau_l) x(\tau_l)+u(\tau_l)\quad
(l=1,2,\dots), $$
where $P$ and $q$ are, respectively, the matrix- and vector-functions with
Lebesgue integrable components, $\tau_l$ $(l=1,2,\dots)$ are the points of
impulse actions, and $G(\tau_l)$ and $u(\tau_l)$ $(l=1,2,\dots)$ are the matrix-
and vector-functions of discrete variables.
Using the well-posedness results, the effective sufficient conditions, as well
as the effective necessary and sufficient conditions, are established for the
convergence of difference schemes to the solution of linear boundary value
problem for impulsive systems of differential equations, as well for ordinary
differential equations. The analogous results are obtained for the stability of
difference schemes.
Mathematics Subject Classification: 34A30, 34A37, 34K06, 34K07, 34B05, 34K20, 34K28
Key words and phrases: Generalized linear ordinary differential equations in the Kurzwei sense, linear boundary value problem, well-posedness, linear impulsive differential equations, linear ordinary differential equations, numerical solvability, convergence and stability of difference schemes, effective necessary and sufficient conditions