## Related Articles

- IDENTITIES ON THE MODIFIED q-EULER AND q-BERNSTEIN POLYNOMIALS AND NUMBERS WITH WEIGHT. SEOG-HOON RIM; JOOHEE JEONG // Journal of Computational Analysis & Applications;Jan2013, Vol. 15 Issue 1, p39
Recently, the modified q-Euler numbers and polynomials with weight a are introduced in [15]. In this paper, we give some interesting identities on the modified q-Euler numbers and polynomials with weight Î± and q-Bernstein polynomials. These results are different from those in [11].

- Some relationship between q-Bernstein polynomials and extended q-Euler numbers. Kim, T.; Lee, B.; Ryoo, C. S. // Journal of Computational Analysis & Applications;Apr2012, Vol. 14 Issue 3, p507
Recently several authors are studying in the area of (h, q)-Euler numbers and polynomials. In this paper we study some identities on the (h, q)-Euler numbers and polynomials related to q-Bernstein polynomials by using fermionic q-integral on Zp.

- Some relationship between q-Bernstein polynomials and extended q-Euler numbers. Kim, T.; Lee, B.; Ryoo, C. S. // Journal of Computational Analysis & Applications;Jan2012, Vol. 14 Issue 1, p507
Recently several authors are studying in the area of (h, q)-Euler numbers and polynomials(see [4]). In this paper we study some identities on the (h, q)-Euler numbers and polynomials related to q-Bernstein polynomials by using fermionic q-integral on â„¤p.

- SOME RELATIONS BETWEEN THE q-BERNSTEIN POLYNOMIALS AND TWISTED q-EULER NUMBERS WITH WEIGHT Î±. Ryoo, C. S. // Journal of Computational Analysis & Applications;Jan2012, Vol. 14 Issue 1, p909
Recently, we have studied twisted q-Euler numbers and polynomials with weight Î±([18]). In this paper, by using fermionic p-adic q-integral on â„¤p, we give some interesting relations between the the q-Bernstein polynomials and twisted q-Euler numbers with weight Î±.

- Some Identities of the Twisted q-Genocchi Numbers and Polynomials with Weight Î± and q-Bernstein Polynomials with Weight Î±. Lee, H. Y.; Jung, N. S.; Ryoo, C. S. // Abstract & Applied Analysis;2011, Special section p1
Recently mathematicians have studied some interesting relations between q-Genocchi numbers, q-Euler numbers, polynomials, Bernstein polynomials, and q-Bernstein polynomials. In this paper, we give some interesting identities of the twisted q-Genocchi numbers, polynomials, and q-Bernstein...

- ON THE EXTENDED KIM'S q-BERNSTEIN POLYNOMIALS. Rim, S.-H.; Jang, L. C.; Choi, J.; Kim, Y. H.; Lee, B.; Kim, T. // Journal of Computational Analysis & Applications;Feb2011, Vol. 13 Issue 2, p282
The purpose of this paper is to present a systemic study of some families of the Kim's q-Bernstein polynomials. By using double fermionic p-adic integral representation on á„¤p, we give some interesting and new formulae related to q-Euler numbers.

- Some new identities on the twisted (h, q)-Euler numbers and q-Bernstein polynomials. Dolgy, D. V.; Kang, D. J.; Kim, T.; Lee, B. // Journal of Computational Analysis & Applications;Jul2012, Vol. 14 Issue 5, p974
In this paper we give some interesting relationship between the q-Bernstein polynomials and the twisted (h, q)-Euler numbers by using fermionic p-adic q-integral on â„¤p.

- Some new identities on the twisted (h, q)-Euler numbers and q-Bernstein polynomials. Dolgy, D. V.; Kang, D. J.; Kim, T.; Lee, B. // Journal of Computational Analysis & Applications;Jan2012, Vol. 14 Issue 1, p974
In this paper we give some interesting relationship between the q-Bernstein polynomials and the twisted (h, q)-Euler numbers by using fermionic p-adic q-integral on â„¤p.

- Some Relations between Twisted (h, q)-Euler Numbers with Weight Î± and q-Bernstein Polynomials with Weight Î±. Jung, N. S.; Lee, H. Y.; Ryoo, C. S. // Discrete Dynamics in Nature & Society;2011, Special section p1
By using fermionic p-adic q-integral on â„¤p, we give some interesting relationship between the twisted (h, q)-Euler numbers with weight Î± and the q-Bernstein polynomials.

- A NOTE ON p-ADIC EULER MEASURE. KIM, T.; KIM, D. S.; CHOI, J.; KIM, Y. H. // Journal of Computational Analysis & Applications;Jan2013, Vol. 15 Issue 1, p327
In this paper we consider the distribution relation for the q-Euler numbers and polynomials. From these q-Euler polynomials' distribution, we derive the q-Euler measure on â„¤p.