Abstract Given a finite group G and a faithful irreducible FG-module V where F has prime order, does G have a regular orbit on V? This problem is equivalent to… Click to show full abstract
Abstract Given a finite group G and a faithful irreducible FG-module V where F has prime order, does G have a regular orbit on V? This problem is equivalent to determining which primitive permutation groups of affine type have a base of size 2. Let G be a covering group of an almost simple group whose socle T is sporadic, and let V be a faithful irreducible FG-module where F has prime order dividing | G | . We classify the pairs ( G , V ) for which G has no regular orbit on V, and determine the minimal base size of G in its action on V. To obtain this classification, for each non-trivial g ∈ G / Z ( G ) , we compute the minimal number of T-conjugates of g generating 〈 T , g 〉 .
               
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