Normal limiting distributions for systems of linear equations in random sets

Abstract: We consider the binomial random set model [n] p where each element in {1, . . . , n} is chosen independently with probability p := p(n). We show that for essentially all regimes of p and very general conditions for a matrix A and a column vector b, the count of specific integer solutions to the system of linear equations Ax = b with the entries of x in [n] p follows a (conveniently rescaled) normal limiting distribution. This applies among others to the number of solutions with every variable having a differe… Show more