On Solving Problems of Substantially Super-linear Complexity in No(1) Rounds in the MPC Model

Abstract

We study the possibility of designing No(1)-round protocols for problems of substantially super-linear polynomial-time (sequential) complexity in the model of Massively Parallel Computation, where N is the input size. We show that if the machines are not equipped with relatively large local memory and their number does not exceed N, then the exponent of the average time complexity of the local computation performed by a machine in a round (in terms of local memory size) in such protocols must be larger than the exponent of the time complexity of the given problem.