A new approach to the classification of almost contact metric manifolds via intrinsic endomorphisms
Abstract
In 1990, D. Chinea and C. Gonzalez gave a classification of almost contact metric manifolds into 212 classes, based on the behaviour of the covariant derivative ∇g of the fundamental 2-form . This large number makes it difficult to deal with this class of manifolds. We propose a new approach to almost contact metric manifolds by introducing two intrinsic endomorphisms S and h, which bear their name from the fact that they are, basically, the entities appearing in the intrinsic torsion. We present a new classification scheme for them by providing a simple flowchart based on algebraic conditions involving S and h, which then naturally leads to a regrouping of the Chinea-Gonzalez classes, and, in each step, to a further refinement, eventually ending in the single classes. This method allows a more natural exposition and derivation of both known and new results, like a new characterization of almost contact metric manifolds admitting a characteristic connection in terms of intrinsic endomorphisms. We also describe in detail the remarkable (and still very large) subclass of H-parallel almost contact manifolds, defined by the condition (∇gX)(Y,Z)=0 for all horizontal vector fields, X,Y,Z∈H.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.