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- Extremely Abundant Numbers and the Riemann Hypothesis
- PRIME-PERFECT NUMBERS Paul Pollack Department of Mathematics, University of Georgia, Athens, Georgia 30602, USA [email protected]
- Primitive Weird Numbers Having More Than Three Distinct Prime Factors 3
- Primitive Abundant and Weird Numbers with Many Prime Factors 3
- Preventing Exceptions to Robins Inequality
- Digital Roots of Perfect Numbers
- L. ALAOGLU and P. ERDŐS Reprinted from the Vol. 56, No. 3
- Paul Erdős and the Rise of Statistical Thinking in Elementary Number Theory
- The Personality of the Integers from One to One Gross
- 3. on the Solutions of Two Sum of Divisor Equations
- Kathryn E. Temple Dept. of Mathematics, Central Washington University, Ellensburg, Washington Kathryn. Temple@ Cwu
- Euler and the Ongoing Search for Odd Perfect Numbers
- Elementary Methods in Number Theory
- 2017/1 Edition
- Perfect, Amicable and Numbers of Equal Weights (Historical Notes)
- Problems & Solutions
- Recursively Abundant and Recursively Perfect Numbers
- Primitive Weird Numbers Having More Than Three Distinct Prime Factors Gianluca Amato, Maximilian F
- Joshua Zelinsky Department of Mathematics, Hopkins School, New Haven, Connecticut1 USA [email protected]
- Arxiv:1801.01925V2 [Math.NT]
- Recreational Mathematics
- Worksheet Number Fifteen Amicable Numbers and Thabit Ibn Qurra We Have Seen the Pythagorean Concepts of Perfect and Amicable Nu
- Introduce a Generalized Public Keys Using a Sequence of Ω- Numbers Built from Beurling's Function of Reals
- Ramanujan's Theorem and Highest Abundant Numbers Arxiv:1905.09327V4 [Math.NT] 10 Feb 2020
- Abundant and Deficient Numbers and the Sigma Function
- Recursively Abundant and Recursively Perfect Numbers
- An Algorithm to Determine All Odd Primitive Abundant Numbers with D Prime Divisors Jacob Liddy [email protected]
- ON the DISTRIBUTION of SOCIABLE NUMBERS 1. Introduction and Statement of Results 1.1. History. Let S(N) Denote the Sum of the Pr
- Extremely Abundant Numbers and the Riemann Hypothesis
- On Highly Composite and Similar Numbers
- Paul Erd˝Os and the Rise of Statistical Thinking in Elementary Number Theory
- Sieve Methods for Odd Perfect Numbers
- Divisor Function 1 Divisor Function
- Number Theory Integer Types by Michael Carter Carl Friedrich Gauss
- MAT 311: Number Theory Spring 2006