On the largest prime divisor of polynomial and related problem
Abstract
We denote P = \P(x)| P(n) n! for infinitely many n\. This article identifies some polynomials that belong to P. Additionally, we also denote P+(m) as the largest prime factor of m. Then, a consequence of this work shows that there are infinitely many n ∈ N so that P+(f(n)) < n34+ if f(x) is cubic polynomial, P+(f(n)) < n if f(x) is reducible quartic polynomial and P+(f(n)) < n if f(x) is Chebyshev polynomial.
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