On the passage from finite braces to pre-Lie rings
Abstract
Let p be a prime number. We show that there is a one-to-one correspondence between the set of strongly nilpotent braces and the set of nilpotent pre-Lie rings of cardinality pn, for sufficiently large p. Moreover, there is an injective mapping from the set of left nilpotent pre-Lie rings into the set of left nilpotent braces of cardinality pn for n+1<p. For the passage from pre-Lie rings to braces we use exactly the same method as suggested in [41].
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