Uniform explicit Stewart's theorem on prime factors of linear recurrences

Abstract: Stewart (2013) proved that the biggest prime divisor of the nth term of a Lucas sequence of integers grows quicker than n, answering famous questions of Erdős and Schinzel. In this note we obtain a fully explicit and, in a sense, uniform version of Stewart's result.

“…The following two theorems are, essentially, due to Stewart [13], though in the present form they can be found in [3], see Theorems 1.4 and 1.5 therein.…”

“…3) is easier, the proof follows the same lines as the proof of Theorem 1.2 in [3]. Case (3.4) is harder and requires more intricate arguments.…”

“…To estimate log x/ log * ω(n), we consider two cases. Assume first that ω(n) ≤ log n (log log n) 3 .…”

“…Erdős [7] conjectured that P (u n )/n tends to infinity. This was proved to be so by Stewart [13] who showed that P (u n ) > n exp(log n/(104 log log n)) holds for n > n 0 , where n 0 is a constant which Stewart did not compute and which depends on the discriminant of the field Q(α) and the number of distinct prime factors of s. Explicit values for n 0 were computed in [3] at the cost of replacing 1/104 by somewhat smaller constants (see Theorem s 2.1 and 2.2 below). It is also shown in [3] that n 0 depends only on the field Q(α), but is independent of the number of prime divisors of s.…”

Big prime factors in orders of elliptic curves over finite fields

“…The following two theorems are, essentially, due to Stewart [13], though in the present form they can be found in [3], see Theorems 1.4 and 1.5 therein.…”

“…3) is easier, the proof follows the same lines as the proof of Theorem 1.2 in [3]. Case (3.4) is harder and requires more intricate arguments.…”

“…To estimate log x/ log * ω(n), we consider two cases. Assume first that ω(n) ≤ log n (log log n) 3 .…”

“…Erdős [7] conjectured that P (u n )/n tends to infinity. This was proved to be so by Stewart [13] who showed that P (u n ) > n exp(log n/(104 log log n)) holds for n > n 0 , where n 0 is a constant which Stewart did not compute and which depends on the discriminant of the field Q(α) and the number of distinct prime factors of s. Explicit values for n 0 were computed in [3] at the cost of replacing 1/104 by somewhat smaller constants (see Theorem s 2.1 and 2.2 below). It is also shown in [3] that n 0 depends only on the field Q(α), but is independent of the number of prime divisors of s.…”

Big prime factors in orders of elliptic curves over finite fields

“…In 2013, Stewart [10] gave a lower bound of the largest prime factor of u n , which is of the form n exp(log n/104 log log n). What Stewart actually proved is the following, see [1,Theorem 1.1].…”

Stewart's Theorem revisited: suppressing the norm $\pm 1$ hypothesis

On a non-Archimedean analogue of a question of Atkin and Serre