A resolvable Steiner 2-design on v points is 1-rotational if it admits an automorphism of order v-1 leaving its resolution invariant. In this paper we prove the existence of a 1-rotational resolvable S(2,k,v) in the following cases: 1) k=6 and v=5p+1 with p a prime = 1 (mod 12) but $p \neq 13, 37$; 2) k=8 and v=7p+1 with p a prime = 1 (mod 8) but $p \neq 17, 89$. In each case it follows from a result of Jimbo and Vanstone that there exists a 1-rotational resolvable S(2,k,v) where v=(k-1)P+1 with P an arbitrary product of the associated primes.
Existence results for 1-rotational Resolvable Steiner 2-designs with block size 6 or 8
BURATTI, Marco;
2007
Abstract
A resolvable Steiner 2-design on v points is 1-rotational if it admits an automorphism of order v-1 leaving its resolution invariant. In this paper we prove the existence of a 1-rotational resolvable S(2,k,v) in the following cases: 1) k=6 and v=5p+1 with p a prime = 1 (mod 12) but $p \neq 13, 37$; 2) k=8 and v=7p+1 with p a prime = 1 (mod 8) but $p \neq 17, 89$. In each case it follows from a result of Jimbo and Vanstone that there exists a 1-rotational resolvable S(2,k,v) where v=(k-1)P+1 with P an arbitrary product of the associated primes.File in questo prodotto:
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