Paper detail

Connections in holomorphic Lie algebroids

The main purpose of this note is the study of the total space of a holomorphic Lie algebroid $E$. The paper is structured in three parts. In the first section we briefly introduce basic notions on holomorphic Lie algebroids. The local expressions are written and the complexified holomorphic bundle is introduced. The second section is a little broader and includes two approaches to study the geometry of complex manifold $E.$ The first part contains the study of the tangent bundle $T_{C}E=T^{\prime }E\oplus T^{\prime \prime }E$ and its link, via tangent anchor map, with the complexified tangent bundle $% T_{C}(T^{\prime }M)=T^{\prime }(T^{\prime }M)\oplus T^{\prime \prime }(T^{\prime }M).$ A holomorphic Lie algebroid structure has been emphasized on $T^{\prime }E.$ A special study is made for integral curves of a spray on $% T^{\prime }E.$ Theorem 2.1 gives the coefficients of a spray, called canonical, according to a complex Lagrangian on $T^{\prime }E.$ In the second part of section two we study the prolongation $\mathcal{T}% ^{\prime }E$ of $E\times T^{\prime }E$ algebroid structure. In the third section we study how a complex Lagrange (Finsler) structure on $T^{\prime }M$ induces a Lagrangian structure on $E.$ Three particular cases are analyzed by the rank of anchor map, the dimensions of manifold $M$ and the fibre dimension. We obtain the correspondent on $E$ of the well-known (\cite{Mu}) Chern-Lagrange nonlinear connection from $T^{\prime }M$.