Sierpiński and Carmichael numbers
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Publication:5496587
DOI10.1090/S0002-9947-2014-06083-2zbMath1325.11010WikidataQ102322374 ScholiaQ102322374MaRDI QIDQ5496587
Carrie Finch, William D. Banks, Pantelimon Stănică, Florian Luca, Carl B. Pomerance
Publication date: 2 February 2015
Published in: Transactions of the American Mathematical Society (Search for Journal in Brave)
Congruences; primitive roots; residue systems (11A07) Transcendence (general theory) (11J81) Distribution of integers with specified multiplicative constraints (11N25) Factorization; primality (11A51)
Related Items (3)
Carmichael numbers and the sieve ⋮ Iterated Riesel and Iterated Sierpiński Numbers ⋮ There are no Carmichael numbers of the form \(2^np+1\) with \(p\) prime
Cites Work
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- Sur un problème concernant les nombres \(k\cdot 2^n + 1\)
- On the density of odd integers of the form \((p-1)2^{-n}\) and related questions
- There are infinitely many Carmichael numbers
- On the largest prime factor of \((ab+1)(ac+1)(bc+1)\)
- An upper bound for the g.c.d. of \(a^n-1\) and \(b^n -1\)
- Carmichael numbers with a totient of the form \(a^2+nb^2\)
- A lower bound for the height of a rational function at \(S\)-unit points
- The distribution of integers with a divisor in a given interval
- A Mordell-Lang plus Bogomolov type result for curves in \(\mathbb G_m^2\)
- Classical and modular approaches to exponential Diophantine equations. I: Fibonacci and Lucas perfect powers
- An explicit lower bound for a homogeneous rational linear form in the logarithms of algebraic numbers. II
- Infinitely many Carmichael numbers in arithmetic progressions
- CARMICHAEL NUMBERS IN ARITHMETIC PROGRESSIONS
- INFINITUDE OF ELLIPTIC CARMICHAEL NUMBERS
- Carmichael numbers in the sequence $(2^n k+1)_{n\geq 1}$
- ON CARMICHAEL NUMBERS IN ARITHMETIC PROGRESSIONS
- Carmichael Numbers with a Square Totient
- The Impossibility of Certain Types of Carmichael Numbers
- On the Distribution of Pseudoprimes
- On a Theorem of Hardy and Ramanujan
- On the greatest prime factor of (𝑎𝑏+1)(𝑎𝑐+1)
- A quantitative lower bound for the greatest prime factor of (ab+1)(bc+1)(ca+1)
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