Groups Satisfying the Two-Prime Hypothesis with a Composition Factor Isomorphic to PSL2(q) for q ⩾ 7

被引：0

作者：

Mark L. Lewis

Yanjun Liu

Hung P. Tong-Viet

机构：

[1] Kent State University,Department of Mathematical Sciences

[2] Jiangxi Normal University,College of Mathematics and Information Science

[3] Binghamton University,Department of Mathematical Sciences

来源：

Czechoslovak Mathematical Journal | 2018年 / 68卷

关键词：

character degrees; prime divisors; 20C15; 20D05;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

Let G be a finite group and write cd(G) for the degree set of the complex irreducible characters of G. The group G is said to satisfy the two-prime hypothesis if for any distinct degrees a, b 2 cd(G), the total number of (not necessarily different) primes of the greatest common divisor gcd(a, b) is at most 2. We prove an upper bound on the number of irreducible character degrees of a nonsolvable group that has a composition factor isomorphic to PSL2(q) for q ⩾ 7.

引用

页码：921 / 941

页数：20

共 10 条

[1] Hamblin J.(2007)Solvable groups satisfying the two-prime hypothesis I Algebr. Represent. Theory 10 1-24
[2] Hamblin J.(2012)Solvable groups satisfying the two-prime hypothesis II Algebr. Represent. Theory 15 1099-1130
[3] Lewis M. L.(1973)Characters of solvable and symplectic groups Am. J. Math 95 594-635
[4] Isaacs I. M.(2016)Simple groups and the two-prime hypothesis Monatsh. Math 181 855-867
[5] Lewis M. L.(2017)The two-prime hypothesis: groups whose non-abelian composition factors are not isomorphic to PSL2(q) Monatsh. Math 184 115-131
[6] Liu Y.(2013)Character degrees of extensions of PSL J. Group Theory 16 1-33
[7] Lewis M. L.(undefined)( undefined undefined undefined-undefined
[8] Liu Y.(undefined)) and SL undefined undefined undefined-undefined
[9] Tong-Viet H. P.(undefined)( undefined undefined undefined-undefined
[10] White D. L.(undefined)) undefined undefined undefined-undefined

← 1 →