Erdelyi–Kober operator

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In mathematics, an Erdélyi–Kober operator is a fractional integration operation introduced by Arthur Erdélyi (1940) and Hermann Kober (1940).

The Erdélyi–Kober fractional integral is given by

\frac{x^{-\nu-\alpha+1}}{\Gamma(\alpha)}\int_0^x (t-x)^{\alpha-1}t^{-\alpha-\nu}f(t) dt

Comparison

There is a similar operator now known as the Katugampola fractional operator which generalizes both the Riemann-Liouville and the Hadamard fractional integrals into a unique form.