The standard generators of the tetrahedron algebra and their look-alikes
Abstract
The tetrahedron algebra is an infinite-dimensional Lie algebra defined by generators \xij i, j ∈ \0, 1, 2, 3\, i ≠ j\ and some relations, including the Dolan-Grady relations. These twelve generators are called standard. We introduce a type of element in that "looks like" a standard generator. For mutually distinct h, i, j, k ∈ \0, 1, 2, 3\, consider the standard generator xij of . An element ∈ is called xij-like whenever both (i) commutes with xij; (ii) and xhk satisfy a Dolan-Grady relation. Pick mutually distinct i,j,k ∈ \0,1,2,3\. In our main result, we find an attractive basis for with the property that every basis element is either xij-like or xjk-like or xki-like. We discuss this basis from multiple points of view.
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