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On quasi-imperfect numbers with at most four distinct prime divisors

Author

Listed:
  • Cui-Fang Sun

    (Anhui Normal University)

  • Zhao-Cheng He

    (Anhui Normal University)

  • Tian-Tian Tao

    (Anhui Normal University)

Abstract

Let $$\rho$$ ρ be a multiplicative arithmetic function defined by $$\rho (p^{\alpha })=p^{\alpha }-p^{\alpha -1}+p^{\alpha -2}-\cdots +(-1)^{\alpha }$$ ρ ( p α ) = p α - p α - 1 + p α - 2 - ⋯ + ( - 1 ) α for a prime power $$p^{\alpha }$$ p α . For a positive integer n, we call n a quasi-imperfect number if $$2\rho (n)=n+1$$ 2 ρ ( n ) = n + 1 . In this paper, we show that there are only four quasi-imperfect numbers with at most four distinct prime divisors. We also pose some conjectures for further research.

Suggested Citation

  • Cui-Fang Sun & Zhao-Cheng He & Tian-Tian Tao, 2021. "On quasi-imperfect numbers with at most four distinct prime divisors," Indian Journal of Pure and Applied Mathematics, Springer, vol. 52(2), pages 429-438, June.
    • Handle: RePEc:spr:indpam:v:52:y:2021:i:2:d:10.1007_s13226-021-00048-1
    DOI: 10.1007/s13226-021-00048-1
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