Computing bounded solutions to linear Diophantine equations with the sum of divisors

Abstract

We propose an efficient computational method for finding all solutions n≤ U to the Diophantine equation aσ(n) = bn + c, where integer coefficient a,b,c and an upper bound U are given. Our method is implemented in SageMath computer algebra system within the framework of recursively enumerated sets and natively benefits from MapReduce parallelization. We used it to discover new solutions to many published equations and close gaps in between the known large solutions, including but not limited to hyperperfect and f-perfect numbers, as well as to significantly lift the existence bounds in open questions about quasiperfect and almost-perfect numbers.