On Sidon sets with squares, cubes and quartics in short intervals

Abstract

Representative examples of our results are as follows. For any positive integer N the equation x3+y3=z3+t3, x,y,z,t∈ N, \x,y\=\z,t\ has no solutions satisfying N x,y,z,t < N+(383N+129736)1/2+196. The strict inequality ``<" can not be substituted by ``", that is, there exist infinitely many positive integers N such that the equation has a solution with N x,y,z,t N+(383N+129736)1/2+196. There is an absolute constant c>0 such that for any positive integer N the equation has a solution satisfying N x,y,z,t N+cN2/3. For any >0 there exist infinitely many positive integers N such that the equation has no solutions satisfying N x,y,z,t N+N4/7-. There is an absolute constant c>0 such that for any positive integer N the equation x4+y4=z4+t4, x,y,z,t∈N, \x,y\=\z,t\, has no solutions satisfying N x,y,z,t N+cN3/5. There is an absolute constant c>0 such that for any positive integer N this equation has a solution satisfying N x,y,z,t N+cN12/13.