Counting square-free integers represented by binary quadratic forms of a fixed discriminant (Q6077853)

In this paper, the authors deal with counting square-free integers represented by binary quadratic forms of a fixed discriminant. They prove a result concerning the infinitude of square-free integers represented by a class of polynomials in two variables. Also they prove that infinitely many square-free positive integers are represented by a primitive integral positive-definite binary quadratic form of a given discriminant \(D.\) Their result derive from an asymptotic formula for the summatory function associated to it using some known \(L\)-functions.