In this paper, operational matrices of Riemann-Liouville fractional integration and Caputo fractional differentiation for shifted Jacobi polynomials are considered. Using the given initial conditions, we transform the fractional differential equation (FDE) into a modified fractional differential equation with zero initial conditions. Next, all the existing functions in modified differential equ...

in this paper, operational matrices of riemann-liouville fractional integration and caputo fractional differentiation for shifted jacobi polynomials are considered. using the given initial conditions, we transform the fractional differential equation (fde) into a modified fractional differential equation with zero initial conditions. next, all the existing functions in modified differential equ...

s of invited lectures Extended differential properties of cryptographic functions ANNE CANTEAUT (INRIA-Rocquencournt, France) Differential cryptanalysis is one of the very first attack proposed against block ciphers. This attack exploits the fact that some derivatives of the cipher (or of a reduced version of the cipher) have a nonrandom output distribution. Since this distribution highly depen...

We derive raising and lowering operators for orthogonal polynomials on the unit circle and find second order differential and q-difference equations for these polynomials. A general functional equation is found which allows one to relate the zeros of the orthogonal polynomials to the stationary values of an explicit quasi-energy and implies recurrences on the orthogonal polynomial coefficients....

We introduce the so-called Clifford–Hermite polynomials in the framework of Dunkl operators, based on the theory of Clifford analysis. Several properties of these polynomials are obtained, such as a Rodrigues formula, a differential equation and an explicit relation connecting them with the generalized Laguerre polynomials. A link is established with the generalized Hermite polynomials related ...

Knot polynomials colored with symmetric representations of $SL_q(N)$ satisfy difference equations as functions representation parameter, which look like quantization classical ${\cal A}$-polynomials. However, they are quite difficult to derive and investigate. Much simpler should be the for coefficients differential expansion nicknamed quantum C}$-polynomials. It turns out that, each knot, one ...

Abstract: Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation, we derive a reduction formula for a kind of double q-integrals. This reduction formula is used to derive a curious double q-integral formula, and also allows us to prove a general q-beta integral formula including the Askey–Wilson integral formula as a special case. Using this double ...

This paper introduces a new type of polynomials generated through the convolution generalized multivariable Hermite and Appell polynomials. The explores several properties these polynomials, including recurrence relations, explicit formulas using shift operators, differential equations. Further, integrodifferential partial equations for are also derived. Additionally, study showcases practical ...