Journal of Algebraic Combinatorics (EMIS Electronic Version)

Home > Vol 27, No 2 (2008)

Tightening Turyn's bound for Hadamard difference sets

Omar A. AbuGhneim¹ and Ken W. Smith²

¹Jordan University Department of Mathematics, Faculty of Science Amman 11942 Jordan
²Central Michigan University Department of Mathematics Mount Pleasant MI 48859 USA

DOI: 10.1007/s10801-007-0084-1

Abstract

This work examines the existence of (4 q ²,2 q ² - q, q ² - q) difference sets, for q= p ^f, where p is a prime and f is a positive integer. Suppose that G is a group of order 4 q ² which has a normal subgroup K of order q such that G/ K \cong C _q\times C ₂\times C ₂, where C _q, C ₂ are the cyclic groups of order q and 2 respectively. Under the assumption that p is greater than or equal to 5, this work shows that G does not admit (4 q ²,2 q ² - q, q ² - q) difference sets.

Pages: 187–203

Keywords: keywords Hadamard difference sets; intersection numbers; characters

Full Text: PDF

References

1. AbuGhneim, O.A., Becker, P.E., Mendes, J.K., Smith, K.W.: On Menon-Hadamard difference sets in groups of order 4p2. In: Proceedings of the 36th Southeastern International Conference on Combinatorics, Graph Theory and Computing. Congresus Numerantium, vol. 172, pp. 97-121 (2005).
2. Beth, T., Jungnickel, D., Lenz, H.: Design Theory. Cambridge University Press, Cambridge (1986)
3. Curtis, C.W., Reiner, I.: Representation Theory of Finite Groups and Associative Algebras. Wiley Interscience, New York (1988)
4. Davis, J.A., Jedwab, J.: A survey of Hadamard difference sets. In: Arasu, K.T. (ed.) Groups, Differ- ence Sets and the Monster, pp. 145-156. de Gruyter, Berlin (1996)
5. Dillon, J.F.: Variatios on a scheme of McFarland for noncyclic difference sets. J. Comb. Theory Ser.

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	JOURNAL OF ALGEBRAIC COMBINATORICS
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	Home > Vol 27, No 2 (2008) Tightening Turyn's bound for Hadamard difference sets Omar A. AbuGhneim¹ and Ken W. Smith² ¹Jordan University Department of Mathematics, Faculty of Science Amman 11942 Jordan ²Central Michigan University Department of Mathematics Mount Pleasant MI 48859 USA DOI: 10.1007/s10801-007-0084-1 Abstract This work examines the existence of (4 q ²,2 q ² - q, q ² - q) difference sets, for q= p ^f, where p is a prime and f is a positive integer. Suppose that G is a group of order 4 q ² which has a normal subgroup K of order q such that G/ K \cong C _q\times C ₂\times C ₂, where C _q, C ₂ are the cyclic groups of order q and 2 respectively. Under the assumption that p is greater than or equal to 5, this work shows that G does not admit (4 q ²,2 q ² - q, q ² - q) difference sets. Pages: 187–203 Keywords: keywords Hadamard difference sets; intersection numbers; characters Full Text: PDF References 1. AbuGhneim, O.A., Becker, P.E., Mendes, J.K., Smith, K.W.: On Menon-Hadamard difference sets in groups of order 4p2. In: Proceedings of the 36th Southeastern International Conference on Combinatorics, Graph Theory and Computing. Congresus Numerantium, vol. 172, pp. 97-121 (2005). 2. Beth, T., Jungnickel, D., Lenz, H.: Design Theory. Cambridge University Press, Cambridge (1986) 3. Curtis, C.W., Reiner, I.: Representation Theory of Finite Groups and Associative Algebras. Wiley Interscience, New York (1988) 4. Davis, J.A., Jedwab, J.: A survey of Hadamard difference sets. In: Arasu, K.T. (ed.) Groups, Differ- ence Sets and the Monster, pp. 145-156. de Gruyter, Berlin (1996) 5. Dillon, J.F.: Variatios on a scheme of McFarland for noncyclic difference sets. J. Comb. Theory Ser. © 1992–2009 Journal of Algebraic Combinatorics © 2012 FIZ Karlsruhe / Zentralblatt MATH for the EMIS Electronic Edition

JOURNAL OF ALGEBRAIC COMBINATORICS

Tightening Turyn's bound for Hadamard difference sets

Abstract

References

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