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dc.contributor.authorBanks, William David, 1964-eng
dc.contributor.authorShparlinski, Igor E.eng
dc.date.issued2005eng
dc.descriptionhttp://www.math.missouri.edu/~bbanks/papers/index.htmleng
dc.description.abstractIn this paper, we study some divisibility properties of palindromic numbers in a fixed base g ≥ 2. In particular, if PL denotes the set of palindromes with precisely L digits, we show that for any sufficiently large value of L there exists a palindrome n ∈ PL with at least (log log n)1+o(1) distinct prime divisors, and there exists a palindrome n ∈ PL with a prime factor of size at least (log n)2+o(1).eng
dc.identifier.citationPeriod. Math. Hungar. 51 (2005), 1-10.eng
dc.identifier.issn0031-5303eng
dc.identifier.urihttp://hdl.handle.net/10355/10815eng
dc.publisherSpringer Verlageng
dc.relation.ispartofMathematics publications (MU)eng
dc.relation.ispartofcommunityUniversity of Missouri-Columbia. College of Arts and Sciences. Department of Mathematicseng
dc.subject.lcshDivisioneng
dc.titlePrime divisors of palindromeseng
dc.typeArticleeng


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