Degenerate kernels, method of

A method to construct an approximating equation for approximate (and numerical) solutions of certain kinds of linear and non-linear integral equations. The main type of integral equations suitable for solving by this method are linear one-dimensional integral Fredholm equations of the second kind. The method as applied to such equations consists of an approximation which replaces the kernel $ K ( x, s) $ of the integral equation

$$ \tag{1 } \lambda \phi ( x) + \int\limits _ { a } ^ { b } K ( x, s) \phi ( s) ds = f ( x) $$

by a degenerate kernel of the type

$$ K _ {N} ( x, s) = \ \sum _ {n = 1 } ^ { N } a _ {n} ( x) b _ {n} ( s), $$

followed by the solution of the Fredholm degenerate integral equation

$$ \tag{2 } \lambda \widetilde \phi ( x) + \int\limits _ { a } ^ { b } K _ {N} ( x, s) \widetilde \phi ( s) ds = f ( x). $$

Solving (2) is reduced to solving a system of linear algebraic equations. The degenerate kernel $ K _ {N} ( x, s) $ may be found from the kernel $ K ( x, s ) $ in several ways, e.g. by expanding the kernel into a Taylor series or a Fourier series (for other methods see Bateman method; Strip method (integral equations)).

The method of degenerate kernels may be applied to systems of integral equations of the type (1), to multi-dimensional equations with relatively simple domains of integration and to certain non-linear equations of Hammerstein type (cf. Hammerstein equation).

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