Couplings of 3-anchored Bundles
Abstract
This work develops an algebraic framework for merging two 3-anchored bundles over the same base manifold, equipped with mutual actions and two twisted cocycle terms, so as to obtain a 3-Lie algebroid structure on the corresponding Whitney sum. We also record the purely algebraic counterpart of this construction, namely the bicocycle double cross product 3-Lie algebra, obtained by removing the anchor and Leibniz-type compatibility conditions. The resulting framework provides a unified setting for 3-Lie algebroids and contains, as special cases, unified products, double cross products, semi-direct products, cocycle extensions, and direct products.
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