Classification of Homogeneous Odd Rota--Baxter Operators on a Modified Witt-Type Lie Superalgebra

Abstract

We classify all homogeneous odd (i.e., parity-reversing) Rota--Baxter operators of weight zero on the modified Witt-type Lie superalgebra W = Lm, Gn m,n∈. Our classification shows that nontrivial such operators are highly constrained: either g 0 and f is arbitrary, or g 0 forces f 0, and g must take one of several rigid forms dictated by the integer shift k (necessarily odd when g(0) ≠ 0). We prove that every Rota--Baxter operator on W decomposes uniquely into even and odd homogeneous components; we restrict our attention to the odd case, which yields the full nontrivial structure. Furthermore, we show that all derivations of W are inner, that no Rota--Baxter operator on W is invertible, and we describe the induced super pre-Lie algebra structure together with its cohomological interpretation.

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