From Q-Analytic Functions To Double Q-Analytic Hermite Binomials and Q-Traveling Waves
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Pashaev, Oktay
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Abstract
We extend the concept of q-analytic function in two different directions. First we find expansion of q-binomial in terms of q-Hermite polynomials, analytic in two complex arguments. Based on this representation, we introduce a new class of complex functions of two complex arguments, which we call the double q-analytic functions. As another direction, by the hyperbolic version of q-analytic functions we describe the q-analogue of traveling waves, which is not preserving the shape during evolution. The IVP for corresponding q-wave equation we solved in the q-D'Alembert form.
Description
International Conference on Quantum Science and Applications, ICQSA 2016; Eskisehir Osmangazi University Congress and Culture CentreEskisehir; Turkey; 25 May 2016 through 27 May 2016
Keywords
Functional analysis, Hyperbolic functions, Polynomials, Hermite, Traveling wave solutions, Functional analysis, Hermite, Polynomials, Hyperbolic functions, Traveling wave solutions
Fields of Science
0103 physical sciences, 01 natural sciences
Citation
Nalcı Tümer, Ş., and Pashaev, O. (2016). From q-analytic functions to double q-analytic Hermite binomials and q-traveling waves. Journal of Physics: Conference Series, 766(1). doi:10.1088/1742-6596/766/1/012017
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766
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