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Hadamard-Type Integral Equations and Fractional Calculus Operators

Anatoly A. KilbasDepartment of Mathematics, Mechanics Belarusian State University, Minsk, 220050, Belarus
2003en
ABI

Аннотация

The paper is devoted to the study of the integral equation $$ \frac{1}{{\Gamma (\alpha )}}\smallint _a^x{\left( {\frac{u}{x}} \right)^\mu }{\left( {\log \frac{x}{u}} \right)^{\alpha - 1}}f\left( u \right)\frac{{du}}{u} = g\left( x \right) \left( {0 < a < x < b} \right) $$ with realμ and α > 0 on a finite segment [a, b] of the real line. We prove conditions for the existence of a solution f(x) of this equation in the space X µ, (a, b) of Lebesgue measurable functions f on (a, b) such that $$\smallint _a^b|{u^{ - \mu - 1}}f(u)|du < \infty$$ . Explicit formulas for the solution f(x) are established. We also describe properties of the Hadamard-type fractional integrals defined by the left-hand side of the above equation and of the corresponding fractional derivatives.

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