Burnside kei
Abstract
This paper is motivated by a general question: for which values of k and n is the universal Burnside kei of k generators and Kei "exponent" n, Q(k,n), finite? It is known (starting from the work of M. Takasaki (1942)) that Q(2,n) is isomorphic to the dihedral quandle Zn and Q(3,3) is isomorphic to Z3 + Z3. In this paper we give descriptions of Q(4,3) and Q(3,4). We also investigate some properties of arbitrary quandles satisfying the universal Burnside relation (of "exponent" n) a=...a*b*...*a*b. In particular, we prove that the order of a finite commutative kei is a power of 3. Invariants of links related to Burnside kei Q(k,n) are invariant under n-moves.
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