Powers in Alternating Simple Groups
DOI:
https://doi.org/10.17398/Keywords:
Alternating groups, simple groups, power subgroups, word mapsAbstract
C. Martínez and E. Zelmanov proved in [12] that for every natural number d and every finite simple group G, there exists a function N = N(d) such that either G^d = 1 or G = {a_1^d, ... , a_N^d : ai \in G}.
In a more general context the problem of finding words w such that the word map (g1; ...; gd) --> w(g1; ... ; gd) is surjective for any finite non abelian simple group is a major challenge in Group Theory. In [8] authors give the first example of a word map which is surjective on all finite non-abelian simple groups, the commutator [x; y] (Ore Conjecture).
In [11] the conjecture that this is also the case for the word x2y2 is formulated. This conjecture was solved in [9] and, independently, in [6], using deep results of algebraic simple groups and representation theory. An elementary proof of this result for alternating simple groups is presented here.
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References
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