9 research outputs found
Polynomial Expansions for Solutions of Higher-Order Bessel Heat Equation in Quantum Calculus
Mathematics Subject Class.: 33C10,33D60,26D15,33D05,33D15,33D90In this paper we give the q-analogue of the higher-order Bessel operators
studied by I. Dimovski [3],[4], I. Dimovski and V. Kiryakova [5],[6], M. I.
Klyuchantsev [17], V. Kiryakova [15], [16], A. Fitouhi, N. H. Mahmoud and
S. A. Ould Ahmed Mahmoud [8], and recently by many other authors.
Our objective is twofold. First, using the q-Jackson integral and the
q-derivative, we aim at establishing some properties of this function with
proofs similar to the classical case. Second, our goal is to construct the
associated q-Fourier transform and the q-analogue of the theory of the heat
polynomials introduced by P. C. Rosenbloom and D. V. Widder [22]. For
some value of the vector index, our operator generalizes the q-jα
Bessel operator of the second order in [9] and a q-Third operator in [12]
Polynomial expansions for solution of wave equation in quantum calculus
In this paper, using the q^2 -Laplace transform early introduced by Abdi [1], we study q-Wave polynomials related with the q-difference operator ∆q,x . We show in particular that they are linked to the q-little Jacobi polynomials p_n (x; α, β | q^2 )
Sobolev type spaces in quantum calculus
AbstractIn this paper q-Sobolev type spaces are defined on Rq by using the q-cosine Fourier transform and its inverse. In particular, embedding results for these spaces are established. Next we define the q-cosine potential and study some of its properties
Polynomial Expansions for Solutions of Higher-order q-Bessel Heat Equation
[[abstract]]In this paper we give the q-analogue of the higher-order Bessel opera-
tors studied by M. I. Klyuchantsev [12] and A. Fitouhi, N. H. Mahmoud
and S. A. Ould Ahmed Mahmoud [3]. Our objective is twofold. First,
using the q-Jackson integral and the q-derivative, we aim at establishing
some properties of this function with proofs similar to the classical case.
Second our goal is to construct the associated q-Fourier transform and
the q-analogue of the theory of the heat polynomials introduced by P.
C. Rosenbloom and D. V. Widder [13]. Our operator for some value of
the vector index generalize the q-j Bessel operator of the second order
in [4] and a q-Third operator in [6]