Lie algebroid modules and representations up to homotopy |
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| Affiliation: | Department of Mathematics and Statistics, Smith College, 44 College Lane, Northampton, MA 01063, United States |
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| Abstract: | We establish a relationship between two different generalizations of Lie algebroid representations: representation up to homotopy and Vaĭntrob’s Lie algebroid modules. Specifically, we show that there is a noncanonical way to obtain a representation up to homotopy from a given Lie algebroid module, and that any two representations up to homotopy obtained in this way are equivalent in a natural sense. We therefore obtain a one-to-one correspondence, up to equivalence. |
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| Keywords: | Lie algebroid Representation up to homotopy Graded manifold Graded vector bundle Q-manifold |
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