I had some thoughts last month or two about the small nonassociative categories, that is the category over an associative operad (in Set). I know that some people around looked at formal category theory in various framework (especially Mike). Are there any frameworks for nontrivial nonassociative category theory in the sense that a composition of natural transformation is defined and that some weak form of Yoneda lemma is true. I know of some special cases by imitation of some ideas of quasigroup theory; I can defined certain related associative categories (left, right, middle kernel), then certain story about translations in the quasigroup with multiple objects case and dreaming of certain crossed products to combine the two, as well as using some things about isotopy (algebra) in this context. But maybe something can be said from the point of view of formal category theory ? There are nontrivial motivations to the story, e.g. from nonassociative Lie theory which is quite a large subject, starting with the classical work of Mal’cev on analytic loops through the recent work of Sabinin et al. on Sabinin algebras…

]]>I recently created entry Bol loop. Now I made some corrections and treated the notion of a **core** of a right Bol loop (the term coming allegedly from Russian term сердцевина).

isotope (physics) and isotope (algebra) with redirect for isotopy (algebra). I have read and thought much about isotopies in last couple of weeks, but no time at this point to write much about it into $n$Lab.

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