On abelian $(2^{2m+1}(2^{m-1}+1), 2^m(2^m+1), 2^m)$-difference sets

Alexander Pott; K. T. Arasu; Yu Qing Chen

arxiv: math/0508086 · v1 · submitted 2005-08-04 · 🧮 math.CO · math.NT

On abelian (2^(2m+1)(2^(m-1)+1), 2^m(2^m+1), 2^m)-difference sets

K. T. Arasu , Yu Qing Chen , Alexander Pott This is my paper

classification 🧮 math.CO math.NT

keywords abeliandifferencesetscontainsgroupconstructingelementaryessentially

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In this paper we prove that an abelian group contains $(2^{2m+1}(2^{m-1}+1), 2^m(2^m+1), 2^m)$-difference sets with $m\geqslant 3$ if and only if it contains an elementary abelian 2-group of order $2^{2m}$. Our proof shows that the method of constructing such difference sets is essentially unique.

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On abelian (2^(2m+1)(2^(m-1)+1), 2^m(2^m+1), 2^m)-difference sets

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