Integrating Nijenhuis Structures
Abstract
A Nijenhuis operator on a manifold M is a (1,1) tensor N whose Nijenhuis-torsion vanishes. A Nijenhuis operator N on M determines a Lie algebroid structure (TM) N on the tangent bundle TM. In this sense a Nijenhuis operator can be seen as an infinitesimal object. In this paper, we identify its "global counterpart". Namely, we show that when the Lie algebroid (TM) N is integrable, then it integrates to a Lie groupoid equipped with appropriate additional structure responsible for N, and viceversa, the Lie algebroid of a Lie groupoid equipped with such additional structure is of the type (TM) N for some Nijenhuis operator N. We illustrate our integration result in various examples.
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