Cayley submanifolds of Calabi-Yau 4-folds
Abstract
Our main results are: (1) The complex a Lagrangian points of a non-complex Lagrangian 2n-dimensional submanifold F:M N, immersed with parallel mean curvature and with equal Kaehler angles into a Kaehler-Einstein manifold (N,J,g) of complex dimension 2n, are zeros of finite order of 2θ and 2θ respectively, where θ is the common J-Kaelher angle. (2) If M is a Cayley submanifold of a Calabi-Yau (CY) manifold N of complex dimension 4, then 2+NM is naturally isomorphic to 2+TM. (3) If N is Ricci-flat (not necessarily CY) and M is a Cayley submanifold, then p1(2+NM)= p1(2+TM) still holds, but p1(2-NM)- p1(2-TM) may describe a residue on the J-complex points, in the sense of Harvey and Lawson. We describe this residue by a PDE on a natural morphism :TM NM, (X)=(JX), with singularities at the complex points. We give an explicit formula of this residue in a particular case. When (N,I,J,K,g) is an hyper-Kaehler manifold and M is an I-complex closed 4-submanifold, the first Weyl curvature invariant of M may be described as a residue on the J-Kaehler angle at the JLagrangian points by a Lelong-Poincar\'e type formula. We study the almost complex structure on M induced by F.
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