Counting racks of order n
A rack on [n] can be thought of as a set of maps (f x )x∈ [n] , where each f x is a permutation of [n] such that f (x) f y =f −1 y f x f y for all x and y. In 2013, Blackburn showed that the number of isomorphism classes of racks on [n][n] is at least 2 (1/4−o(1)) n 2 and at most 2 (c+o(1)) n 2 , w...
| Prif Awduron: | , |
|---|---|
| Fformat: | Journal article |
| Cyhoeddwyd: |
Electronic Journal of Combinatorics
2017
|