Geometry of a weak para-f-structure

Abstract

We study geometry of the weak almost para-f-structure and its subclasses. This allow us to produce totally geodesic foliations and also to take a fresh look at the para-f-structure introduced by A.\,Bucki and A.\,Miernowski. We demonstrate this by generalizing several known results on almost para-f-manifolds. First, we express the covariant derivative of f using a new tensor on a metric weak para-f-structure, then we prove that on a weak para- K-manifold the characteristic vector fields are Killing and f defines a totally geodesic foliation. Next, we show that a para- S-structure is rigid (i.e., a weak para- S-structure is a para- S-structure), and that a metric weak para-f-structure with parallel tensor f reduces to a weak para- C-structure. We obtain corollaries for p=1, i.e., for a weak almost paracontact structure.