Aybike Çatal-Özer, Keremcan Doğan, Cem Yetişmişoğlu
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引用次数: 0
Abstract
Drinfel'd double of Lie bialgebroids plays an important role in T-duality of
string theories. In the presence of $H$ and $R$ fluxes, Lie bialgebroids should
be extended to proto Lie bialgebroids. For both cases, the pair is given by two
dual vector bundles, and the Drinfel'd double yields a Courant algebroid.
However for U-duality, more complicated direct sum decompositions that are not
described by dual vector bundles appear. In a previous work, we extended the
notion of a Lie bialgebroid for vector bundles that are not necessarily dual.
We achieved this by introducing a framework of calculus on algebroids and
examining compatibility conditions for various algebroid properties in this
framework. Here our aim is two-fold: extending our work on bialgebroids to
include both $H$- and $R$-twists, and generalizing proto Lie bialgebroids to
pairs of arbitrary vector bundles. To this end, we analyze various algebroid
axioms and derive twisted compatibility conditions in the presence of twists.
We introduce the notion of proto bialgebroids and their Drinfel'd doubles,
where the former generalizes both bialgebroids and proto Lie bialgebroids. We
also examine the most general form of vector bundle automorphisms of the
double, related to twist matrices, that generate a new bracket from a given
one. We analyze various examples from both physics and mathematics literatures
in our framework.
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