Abstract:
The convergence of the Lavrent'ev method, which is a well-known regularization method for integral equations of the first kind, is analyzed as applied to equations with arbitrary linear bounded operators. A theorem concerning necessary and sufficient conditions for this convergence is proved. It is shown that these conditions are satisfied for two classes of integral equations that do not possess the properties required by the classical Lavrent'ev method.
Key words:integral equation of the first kind, regularization method, Lavrent'ev convergence conditions, equation with an arbitrary linear bounded operator.
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