An extension of the incomplete beta function for negative integers E Özçaḡ, I Ege, H Gürçay Journal of mathematical analysis and applications 338 (2), 984-992, 2008 | 34 | 2008 |
On partial derivatives of the incomplete beta function E Özçag, I Ege, H Gürçay, B Jolevska-Tuneska Applied mathematics letters 21 (7), 675-681, 2008 | 24 | 2008 |
Defining the kth powers of the Dirac-delta distribution for negative integers E Özçağ Applied Mathematics Letters 14 (4), 419-423, 2001 | 22 | 2001 |
On powers of the Heaviside function for negative integers E Özçaḡ, I Ege, H Gürçay Journal of mathematical analysis and applications 326 (1), 101-107, 2007 | 17 | 2007 |
Some remarks on the incomplete gamma function E Ozçag, I Ege, H Gurcay, B Jolevska-Tuneska Mathematical Methods in Engineering, 97-108, 2007 | 14 | 2007 |
On differential equations with nonstandard coefficients B Jolevska-Tuneska, A Takači, E Özçaḡ Applicable Analysis and Discrete Mathematics, 276-283, 2007 | 12 | 2007 |
The exponential integral and the commutative neutrix convolution product B Fisher, E Ozçag, U Gülen J. Analysis 7, 7-20, 1999 | 11 | 1999 |
On partial derivatives of the Beta function RM Kolloq DIGRA'84 (Internationale wissenschaftliche Tagung 12.-16. November 1984 …, 1991 | 11 | 1991 |
Some results on the neutrix composition of the delta function B Fisher, E Özçaḡ Filomat 26 (6), 1247-1256, 2012 | 10 | 2012 |
Note on the Distribution Composition L Lazarova, B Jolevska-Tuneska, İ Aktürk, E Özc̣ağ Bulletin of the Malaysian Mathematical Sciences Society 41, 709-721, 2018 | 8* | 2018 |
Results on the non-commutative neutrix product of distributions B Fisher, E Savas, S Pehlivan, E Ozçag Math. Balkanica 7, 347-356, 1993 | 8 | 1993 |
Results on the neutrix composition of the delta function B Fisher, T Kraiweeradechachai, E ÖZÇAĞ Hacettepe Journal of Mathematics and Statistics 36 (2), 147-156, 2007 | 7 | 2007 |
A result on distributions and the change of variable B Fisher, E Özcag Publ. Math. Debrecen 43, 265-272, 1993 | 7 | 1993 |
On powers of the compositions involving Dirac-delta and infinitely differentiable functions E Özc̣ağ Results in Mathematics 73, 1-18, 2018 | 6 | 2018 |
Defining Compositions of x^ μ_+,| x|^ μ, x^{− s} and x^{− s} ln| x| as Neutrix Limit of Regular Sequences E Ozcag, L Koceva Lazarova, B Jolevska-Tuneska Communications in Mathematics and Statistics 4 (1), 63-80, 2016 | 6 | 2016 |
Integrability analysis of a two-component Burgers-type hierarchy DL Blackmore, E Özçağ, AK Prikarpatskii, KN Soltanov Український математичний журнал, 147-162, 2015 | 6 | 2015 |
Differential-algebraic approach to constructing representations of commuting differentiations in functional spaces and its application to nonlinear integrable dynamical systems AK Prykarpatski, KN Soltanov, E Özçağ Communications in Nonlinear Science and Numerical Simulation 19 (5), 1644-1649, 2014 | 6 | 2014 |
On the dilogarithm integral B Jolevska-Tuneska, B Fisher, E Ozçag International Journal of Applied Mathematics 24 (3), 361-369, 2011 | 6 | 2011 |
A commutative neutrix convolution of distributions and the exchange formula B Fisher, E Özçag, LC Kuan Archivum Mathematicum 28 (2), 187-197, 1992 | 6 | 1992 |
On defining the distribution x− r+ lnx+ E Ozçag, B Fisher Rostocker Mathematisches Kolloquium, 25-30, 1990 | 6 | 1990 |