Associativity testing

Revision en1, by adamant, 2021-06-13 01:49:53

Consider the binary operation \begin{equation} \circ : {1,\dots,n} \times {1,\dots,n} \to {1,\dots,n} \end{equation} presented by its Cayley table. You need to check if the operation is associative, that is if \begin{equation} a \circ (b \circ c) = (a \circ b) \circ c \end{equation} holds for all triplets $$$a, b, c \in {1, \dots, n}$$$.

Tags mindbun, algebra, linear algebra, groups, associativity, tensor

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en17 English adamant 2021-06-17 13:00:21 37 seems to work with rings
en16 English adamant 2021-06-15 11:38:05 343
en15 English adamant 2021-06-15 11:29:39 6
en14 English adamant 2021-06-15 02:59:11 18 clarification
en13 English adamant 2021-06-15 01:21:43 353 cleanup 3
en12 English adamant 2021-06-15 01:11:43 307 cleanup 2
en11 English adamant 2021-06-15 01:06:36 940 cleanup 1
en10 English adamant 2021-06-15 00:24:34 22
en9 English adamant 2021-06-14 23:56:48 430 posting (published)
en8 English adamant 2021-06-14 23:42:37 1369
en7 English adamant 2021-06-14 23:12:41 72
en6 English adamant 2021-06-14 23:11:11 592
en5 English adamant 2021-06-14 23:06:28 8
en4 English adamant 2021-06-14 23:05:31 8
en3 English adamant 2021-06-14 23:04:57 822
en2 English adamant 2021-06-14 22:07:19 6639 Tiny change: 'mapsto A$).\n\nYou n' -> 'mapsto A$) defined by its multiplication table.\n\nYou n'
en1 English adamant 2021-06-13 01:49:53 380 Initial revision (saved to drafts)