Hall's universal group algebra , Hall's universal grouplocally finite group , say U , which is uniquely Philip Hall in 1959, and has the universal property that all countable locally finite groups embed into it.Construction Take any group of order. acts faithfully on itself by permutationsCayley's theorem , this gives a chain of monomorphismsdirect limit of all U .U then contains a symmetric group of arbitrarily large order, and anygroup of permutations , as explained above.G be a finite group admitting two embeddings to U .U is a direct limit and G is finite, the belong to conjugates all possible embeddings
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