A Correction to Leibniz Rule for Fractional Derivatives

This paper calls attention to an error in the proofs of various extensions of the "Leibniz rule" for the fractional derivative of the product of two functions published previously by the author. The error occurs at a step where integration and summation must be interchanged, and justified. The justi

In this paper we discover and explore a useful property of the fractional correction rule, a variation of the perceptron learning rule, for a single neural unit. We rename this rule the projection learning rule (PrLR), which seems more appropriate because of the technique that we use to prove conver

An automatic quadrature method is presented for approximating fractional derivative D q f (x) of a given function f (x), which is defined by an indefinite integral involving f (x). The present method interpolates f (x) in terms of the Chebyshev polynomials in the range [0, 1] to approximate the frac

The purpose of this paper is to prove some classical estimates for fractional derivatives of functions defined on a Coifman-Weiss space of homogeneous type, in particular the product rule and chain rule estimates in (T.

The authors apply certain operators of fractional calculus (that is, integrals and derivatives of arbitrary real or complex order) with a view to evaluating various families of infinite integrals associated with functions of several variables. They also present relevant connections of the infinite i