Publication: On the Diophantine equation (x+1)(k) + (x+2)(k) + ... + (2x)(k) = y(n)
Date
Authors
Savaş, Gamze
Soydan, Gökhan
Authors
Bérczes, Attila
Pink, István
Advisor
Language
Type
Publisher:
Elsevier
Journal Title
Journal ISSN
Volume Title
Abstract
In this work, we give upper bounds for n on the title equation. Our results depend on assertions describing the precise exponents of 2 and 3 appearing in the prime factorization of T-k(x) = (x + 1)(k) + (x + 2)(k) + ... + (2x)(k). Further, on combining Baker's method with the explicit solution of polynomial exponential congruences (see e.g. [6]), we show that for 2 <= x <= 13, k >= 1,y >= 2 and n >= 3 the title equation has no solutions.
Description
Source:
Keywords:
Keywords
Mathematics, Power sums, Powers, Polynomial-exponential congruences, Linear forms in two logarithms, Sums
Citation
Berczes, A. vd. (2018). ''On the Diophantine equation (x+1)(k) + (x+2)(k) + ... + (2x)(k) = y(n)''. Journal of Number Theory, 183, 326-351.