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- Title
STRUCTURE OF THE ROOTS OF (h,q)-EULER POLYNOMIALS.
- Authors
Ryoo, C. S.
- Abstract
Recently several authors studied the q-extension of Euler numbers and polynomials(see [1-12]). In this paper we observe the behavior of complex roots of the (h,q)-Euler polynomials Due to image rights restrictions, multiple line equation(s) cannot be graphically displayed., using numerical investigation. By means of numerical experiments, we demonstrate a remarkably regular structure of the complex roots of the (h,q)-Euler polynomials Due to image rights restrictions, multiple line equation(s) cannot be graphically displayed. Finally, we give a table for the solutions of the (h,q)-Euler polynomials Due to image rights restrictions, multiple line equation(s) cannot be graphically displayed.
- Subjects
ROOTS of equations; EULER polynomials; COMPLEX numbers; NUMERICAL analysis; MATHEMATICAL analysis; ROOT-locus method
- Publication
Journal of Computational Analysis & Applications, 2012, Vol 14, Issue 1, p458
- ISSN
1521-1398
- Publication type
Article