On the geometry of a weakened f-structure
Abstract
An f-structure, introduced by K. Yano in 1963 and subsequently studied by a number of geometers, is a higher dimensional analog of almost complex and almost contact structures, defined by a (1,1)-tensor field f on a (2n+p)-dimensional manifold, which satisfies f3 + f = 0 and has constant rank 2n. We recently introduced the weakened (globally framed) f-structure (i.e., the complex structure on f(TM) is replaced by a nonsingular skew-symmetric tensor) and its subclasses of weak K-, S-, and C- structures on Riemannian manifolds with totally geodesic foliations, which allow us to take a fresh look at the classical theory. We demonstrate this by generalizing several known results on globally framed f-manifolds. First, we express the covariant derivative of f using a new tensor on a metric weak f-structure, then we prove that on a weak K-manifold the characteristic vector fields are Killing and f defines a totally geodesic foliation, an S-structure is rigid, i.e., our weak S-structure is an S-structure, and a metric weak f-structure with parallel tensor f reduces to a weak C-structure. For p=1 we obtain the corresponding corollaries for weak almost contact, weak cosymplectic, and weak Sasakian structures.
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