English

On some open problems concerning perfect powers

General Mathematics 2024-01-29 v4

Abstract

The starting point of our paper is Kashihara's open problem number 3030, concerning the sequence A001292A001292 of the OEIS, asking how many terms are powers of integers. We confirm his last conjecture up to the 100128100128-th term and provide a general theorem that rules out 4/94/9 of the candidates. Moreover, we formulate a new, provocative, conjecture involving the OEIS sequence A352991A352991 (which includes all the terms of A001292A001292). Our risky conjecture states that all the perfect powers belonging to the sequence A352991A352991 are perfect squares and they cannot be written as higher order perfect powers if the given term of A352991A352991 is not equal to one. This challenging conjecture has been checked for any integer smaller than 1011112131415161718192021222345678910111121314151617181920212223456789 and no counterexample has been found so far.

Cite

@article{arxiv.2205.10163,
  title  = {On some open problems concerning perfect powers},
  author = {Marco Ripà},
  journal= {arXiv preprint arXiv:2205.10163},
  year   = {2024}
}

Comments

8 pages; typos fixed, minor style improvements, and Cross-referencing added

R2 v1 2026-06-24T11:23:27.819Z