ON THE TRANSCENDENTAL SOLUTION OF THE FERMAT TYPE Q-SHIFT EQUATION

S. H., Naveenkumar; C. N., Chaithra; H. R., Jayarama

doi:10.21608/ejmaa.2023.191325.1001

ON THE TRANSCENDENTAL SOLUTION OF THE FERMAT TYPE Q-SHIFT EQUATION

Document Type : Regular research papers

Authors

¹ Presidency University, Yelahanka Bangalore-560064

² Presidency University Itgalpura Yelahanka

10.21608/ejmaa.2023.191325.1001

Abstract

In Nevanlinna’s value distribution theory we considering some basic terms like T(r, f), N(r, f), m(r, f)
etc., and let fm(z) + q(z)[fn∆qηf](k) = p(z) be a non-linear q-th order difference equation and f(z) be
a transcendental meromorphic function with finite order m, n and k be a positive integers such that
m ≥ (q + 1)(nk + k + 2) + 3, p(z) be a meromorphic function satisfying N r,
p(1z) = S(r, f). The q(z) be a non-zero meromorphic function satisfying that T(r, q(z)) = S(r, f), then f(z) is not a solution of the non-linear q-th order difference equation. In this paper, we mainly investigate the uniqueness result of transcendental Fermat type q-shift equation by considering q-th order difference equation. Our result improves the results due to Abhijit Banerjee and Tania Biswas. In addition to that the example is exhibited to validate certain claims and justification of our main result.

Keywords