Recent Trends in Special Numbers and Special Functions and Polynomials
1Hasan Kalyoncu University, Gaziantep, Turkey
2University of Gaziantep, Gaziantep, Turkey
3University of Dokuz Eylul, Izmir, Turkey
4University of Victoria, Victoria, Canada
5Howard University, Washington, USA
Recent Trends in Special Numbers and Special Functions and Polynomials
Description
Special numbers and polynomials play an extremely important role in the development of several branches of Mathematics, Physics, and Engineering. They have many algebraic operations. Because of their finite evaluation schemes and closure under addition, multiplication, differentiation, integration, and composition, they are richly utilized in computational models of scientific and engineering problems. This issue contributes in the field of special functions and polynomials. An importance is placed on vital and important developments in classical analysis, number theory, mathematical analysis, mathematical physics, differential equations, and other parts of the natural sciences.
Potential topics include, but are not limited to:
- Bernoulli numbers and Bernoulli polynomials
- Euler numbers and Euler polynomials
- Genocchi numbers and Genocchi polynomials
- Hermite numbers and Hermite polynomials
- Legendre polynomials
- Abel polynomials
- Mittag-Leffler function
- Daehee polynomials
- Changhee polynomials
- Gegenbauer polynomials
- Jacobi polynomials
- Bessel and Hankel functions