Bi-unitary multiperfect numbers, II

Pentti Haukkanen and Varanasi Sitaramaiah
Notes on Number Theory and Discrete Mathematics
Print ISSN 1310–5132, Online ISSN 2367–8275
Volume 26, 2020, Number 2, Pages 1–26
DOI: 10.7546/nntdm.2020.26.2.1-26
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Pentti Haukkanen
Faculty of Information Technology and Communication Sciences
FI-33014 Tampere University, Finland

Varanasi Sitaramaiah
1/194e, Poola Subbaiah Street, Taluk Office Road, Markapur, Prakasam District,
Andhra Pradesh, 523316 India

Abstract

A divisor $d$ of a positive integer $n$ is called a unitary divisor if $\gcd(d, n/d)=1;$ and $d$ is called a bi-unitary divisor of $n$ if the greatest common unitary divisor of $d$ and $n/d$ is unity. The concept of a bi-unitary divisor is due to D. Surynarayana (1972). Let $\sigma^{**}(n)$ denote the sum of the bi-unitary divisors of $n$ . A positive integer $n$ is called a bi-unitary multiperfect number if $\sigma^{**}(n)=kn$ for some $k\geq 3$ . For $k=3$ we obtain the bi-unitary triperfect numbers.

Peter Hagis (1987) proved that there are no odd bi-unitary multiperfect numbers. The present paper is Part II in a series of papers on even bi-unitary multiperfect numbers. In the first part we found all bi-unitary triperfect numbers of the form $n=2^{a}u$ , where $1\leq a \leq 3$ and $u$ is odd; the only one being $n=120$ . In this second part we find all bi-unitary triperfect numbers in the cases $a=4$ and $a=5$ . For $a=4$ the only one is $n=2160$ , and for $a=5$ they are $n=672$ , $n=10080$ , $n=528800$ and $n=22932000$ .

Keywords

Perfect numbers
Triperfect numbers
Multiperfect numbers
Bi-unitary analogues

2010 Mathematics Subject Classification

11A25

References

Hagis, P., Jr. (1987). Bi-unitary amicable and multiperfect numbers, Fibonacci Quart., 25 (2), 144–150.
Haukkanen, P. & Sitaramaiah, V. (2020). Bi-unitary multiperfect numbers, I, Notes Number Theory Discrete Math., 26 (1), 93–171.
Sándor, J. & Crstici, P. (2004). Handbook of Number Theory II, Kluwer Academic.
Suryanarayana, D. (1972). The number of bi-unitary divisors of an integer, in The Theory of Arithmetic Functions, Lecture Notes in Mathematics 251: 273–282, New York, Springer–Verlag.
Wall, C. R. (1972). Bi-unitary perfect numbers, Proc. Amer. Math. Soc., 33, No. 1, 39–42.

Cite this paper

Haukkanen, P., & Sitaramaiah, V. (2020). Bi-unitary multiperfect numbers, II. Notes on Number Theory and Discrete Mathematics, 26 (2), 1-26, DOI: 10.7546/nntdm.2020.26.2.1-26.

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Abstract

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2010 Mathematics Subject Classification

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