A. Dzhishkariani
abstract:
We consider singular integral equations when the line of integration is the
segment $[-1,1]$. Equations are considered in the weight spaces.
For the indices $\varkappa=1$ and $\varkappa=-1$ there are additional conditions
which are approximated additionally by other authors. For the index $\varkappa=1$
we narrow the domain of definition of the singular operator, while for the index
$\varkappa=-1$ we narrow the range of values of the singular operator. Such a
procedure allows one to justify approximate schemes without any difficulty.
Projective-iterative schemes are considered, their convergence is proved and the
convergence order is determined. Stability of the projective-iterative schemes
is defined and proved.
Mathematics Subject Classification: 65R20
Key words and phrases: Singular integral equation, projective and projective-iterative methods, convergence and order of convergence of approximate methods, stability