A Carlitz module analogue of a conjecture of Erdos and Pomerance
Abstract
Abstract. Let A = Fq[T] be the ring of polynomials over the finite field Fq
and 0 = a ∈ A. Let C be the A-Carlitz module. For a monic polynomial
m ∈ A, let C(A/mA) and ¯a be the reductions of C and a modulo mA respectively. Let fa(m) be the monic generator of the ideal {f ∈ A, Cf (¯a) = ¯0} on
C(A/mA). We denote by ω(fa(m)) the number of distinct monic irreducible
factors of fa(m). If q = 2 or q = 2 and a = 1, T, or (1 + T), we prove that
there exists a normal distribution for the quantity
ω(fa(m)) − 1
2 (log deg m)2
√1
3 (log deg m)3/2 .
This result is analogous to an open conjecture of Erd˝os and Pomerance concerning the distribution of the number of distinct prime divisors of the multiplicative order of b modulo n, where b is an integer with |b| > 1, and n a
positive integer.
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Cite this version of the work
Wentang Kuo, Yu-Ru Liu
(2009).
A Carlitz module analogue of a conjecture of Erdos and Pomerance. UWSpace.
http://hdl.handle.net/10012/19996
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