Square-full values of quadratic polynomials
Abstract
A square-full number is a positive integer for which all its prime divisors divide itself at least twice. The counting function of square-full integers of the form f(n) for n≤slant N is denoted by S0.05emf(N). We have known that for a relatively prime pair (a,b)∈ N× N\0\ with a linear polynomial f(x)=ax+b, its counting function is a,b N12. Fix >0, for an admissible quadratic polynomial f(x), we prove that S0.05emf(N), f N+ for some absolute constant <1/2. Under the assumption on the abc conjecture, we expect the upper bound to be O,f(N).
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