On congruences involving product of variables from short intervals

Abstract

We prove several results which imply the following consequences. For any >0 and any sufficiently large prime p, if 1,…, 13 are intervals of cardinalities |j|>p1/4+ and abc 0 p, then the congruence ax1·s x6+bx7·s x13 c p has a solution with xj∈j. There exists an absolute constant n0∈ such that for any 0<<1 and any sufficiently large prime p, any quadratic residue λ modulo p can be represented in the form x1·s xn0 λ p, xi∈, xi p1/(4e2/3)+. For any >0 there exists n=n()∈ such that for any sufficiently large m∈ the congruence x1·s xn 1 m, xi∈, xi m has a solution with x1=1.