Homogeneous Rota--Baxter Operators of Weight~0 on B(q)
Abstract
We give a complete and rigorous classification of homogeneous weight 0 Rota--Baxter operators on the Block-type Witt algebra B(q), assuming the operator has integral degree (k,k') ∈ Z2. A key correction is established in the non+resonant regime q k' with k 0: the profile function g(i) = f(-k,i) must satisfy the nonlinear functional equation \[ (i - j)g(i)g(j) = g(i+j+k')[(i + k' + q)g(i) - (j + k' + q)g(j)], \] which admits only constant, Kronecker-delta, or finite-support solutions. This excludes previously and erroneously claimed families such as non-constant polynomials, exponentials, or nontrivial periodic functions. In contrast, the resonant case q = k' exhibits full flexibility: any profile g is admissible, provided the operator is supported on the single line m = -k. The classification is cohomologically exhaustive for generic q (i.e., when H1(B(q),B(q)) = 0), and is applied to derive all homogeneous post-Lie structures and associated Lie algebra deformations.
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