On pre-Lie rings related to some non-Lazard braces
Abstract
Let A be a brace of cardinality pn for some prime number p. Suppose that either (i) the additive group of brace A has rank smaller than p-3, or (ii) A p-12⊂eq pA or (iii) piA is an ideal in in A for each i. It is shown that there is a pre-Lie ring associated to brace A. The left nilpotency index of this pre-Lie ring can be arbitrarily large. Let A be a brace of cardinality pn for some prime number p. Denote ann(pi)=\a∈ A: pia=0\. Suppose that for i=1,2,… and all a,b∈ A we have \[a*(a*(·s *a*b))∈ pA, a*(a*(·s *a*ann(pi)))∈ ann(pi-1)\] where a appears less than p-14 times in this expression. Let k be such that pk(p-1)A=0. It is shown that the brace A/ann(p4k) is obtained from a left nilpotent pre-Lie ring by a formula which depends only on the additive group of brace A. We also obtain some applications of this result.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.