Paper by F. Moučka and R. Rubio.
Abstract: We develop symmetric Cartan calculus, an analogue of classical Cartan calculus for symmetric differential forms. We first show that the analogue of the exterior derivative, the symmetric derivative, is not unique and its different choices are parametrized by torsion-free affine connections. We use a choice of symmetric derivative to generate the symmetric bracket and the symmetric Lie derivative, and give geometric interpretations of all of them. By proving the structural identities and describing the role of affine morphisms, we reveal an unexpected link of symmetric Cartan calculus with the Patterson-Walker metric, which we recast as a direct analogue of the canonical symplectic form on the cotangent bundle. We show that, in the light of the Patterson-Walker metric, symmetric Cartan calculus becomes a complete analogue of classical Cartan calculus. As an application of this new framework, we introduce symmetric cohomology, which involves Killing tensors, or, in the case of the Levi-Civita connection, Killing vector fields. We finish by characterizing the Levi-Civita connections of S1 in terms of symmetric cohomology.
Find it on the arXiv (2501.12442).
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