Talk:N-ary group

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Best google scholar search term seems to be:

"ternary groups" OR "n-ary groups" OR "polyadic groups"

Adding "n-groups" just adds too many irrelevant hits. Charvest (talk) 19:20, 24 June 2009 (UTC)[reply]

Is the following based on the set {a,b,c} a ternary group? Does it have any other name? It seems to satisfy the associative requirement. --Rumping (talk) 15:46, 8 July 2009 (UTC)[reply]

aaa = a, aab = b, aac = c, aba = c, abb = a, abc = b, aca = b, acb = c, acc = a,

baa = b, bab = c, bac = a, bba = a, bbb = b, bbc = c, bca = c, bcb = a, bcc = b,

caa = c, cab = a, cac = b, cba = b, cbb = c, cbc = a, cca = a, ccb = b, ccc = c.

I have made some changes to the article to highlight the definition of n-ary group. It must satisfy both associativity and each equation in one unknown must have a unique solution. (No need of an identity or inverse if n>2). I haven't checked whether the above example satisfies both these conditions but ternary associativity means all strings of length 5 must be checked which is 3^5=243 possibilities, although the "old and new" paper describes a weaker form of associativity which is sufficient. Charvest (talk) 18:04, 8 July 2009 (UTC)[reply]

I verified the example above to be a ternary group. If you need more examples, feel free to use mine: http://home.comcast.net/~tamivox/dave/math/tern_quasi/assoc1234.html discussed at http://home.comcast.net/~tamivox/dave/math/tern_quasi/index.html Lemonroe (talk) 13:56, 20 April 2010 (UTC)[reply]

I removed remarks about an identity element from the definition. They belong elsewhere; I put the essence into the section on identity/neutral elements. (I also thought they were wrong, but I was thinking of n-quasigroups, so I was mistaken.) Zaslav (talk) 05:22, 12 June 2010 (UTC)[reply]