Found: 9
Select item for more details and to access through your institution.
Some results on q-shift difference-differential polynomials sharing finite value.
- Published in:
- International Journal of Nonlinear Analysis & Applications, 2024, v. 15, n. 10, p. 391, doi. 10.22075/ijnaa.2023.29777.4252
- By:
- Publication type:
- Article
Uniqueness of certain types of differential polynomials of meromorphic functions sharing one value with finite weight.
- Published in:
- Mathematics in Engineering, Science & Aerospace (MESA), 2024, v. 15, n. 1, p. 173
- By:
- Publication type:
- Article
Further results about the transcendental meromorphic solution of a special Fermat-type equation.
- Published in:
- International Journal of Nonlinear Analysis & Applications, 2024, v. 15, n. 1, p. 3, doi. 10.22075/ijnaa.2023.29809.4266
- By:
- Publication type:
- Article
UNIQUENESS OF MEROMORPHIC FUNCTIONS WITH NONLINEAR DIFFERENTIAL POLYNOMIALS SHARING A SMALL FUNCTION IM.
- Published in:
- Matematychni Studii, 2023, v. 60, n. 2, p. 145, doi. 10.30970/ms.60.2.145-161
- By:
- Publication type:
- Article
Uniqueness of meromorphic functions with Q-shift difference-differential polynomials sharing finite value.
- Published in:
- Nonlinear Studies, 2023, v. 30, n. 4, p. 1091
- By:
- Publication type:
- Article
UNICITY OF MEROMORPHIC FUNCTION WITH THEIR SHIFT OPERATOR SHARING SMALL FUNCTION.
- Published in:
- South East Asian Journal of Mathematics & Mathematical Sciences, 2023, v. 19, n. 2, p. 123, doi. 10.56827/SEAJMMS.2023.1902.9
- By:
- Publication type:
- Article
ON THE TRANSCENDENTAL SOLUTION OF THE FERMAT TYPE Q-SHIFT EQUATION.
- Published in:
- Electronic Journal of Mathematical Analysis & Applications, 2023, v. 11, n. 2, p. 1
- By:
- Publication type:
- Article
UNIQUENESS OF CERTAIN DIFFERENTIAL POLYNOMIALS WITH FINITE WEIGHT.
- Published in:
- Journal of Fractional Calculus & Applications, 2023, v. 14, n. 2, p. 1
- By:
- Publication type:
- Article
Uniqueness of meromorphic function sharing two values concerning differential-difference polynomial and it's k<sup>th</sup> derivative.
- Published in:
- Mathematics in Engineering, Science & Aerospace (MESA), 2023, v. 14, n. 1, p. 129
- By:
- Publication type:
- Article