Add to ORKGThe theory of structures on manifolds is a very interesting topic of modern differential geometry and its applications. There are many results concerning various differential geometric structures on Riemannian manifolds. The main aim of this book is to get a way of a union of such results in one scheme. It seems that introduced by the author a notion of the canonical connection and the second fundamental tensor field h adjoint to a structure is very useful for this purpose and, in many cases, it is more effective than the Riemannian connection . Especially, we pay attention to use of h to obtain classifications of structures and to the case of so-called quasi homogeneous structures. Projections of structures on submanifolds ar...
In this thesis we consider nonholonomic Riemannian manifolds, and in particular, left- invariant non...
summary:Summary: Geometrical concepts induced by a smooth mapping $f:M\to N$ of manifolds with linea...
First published in 1964, this book served as a text on differential geometry to several generations ...
WOS: 000422670000002In this chapter, we give brief information about geometric structures which will...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...
Differential geometry is the study of a differentiable manifold on which we are given some geometri...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
Ambrose, Palais and Singer introduced the concept of second order structures on finite dimensional m...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
This book provides an up-to-date presentation of homogeneous pseudo-Riemannian structures, an essent...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
Some results concerning almost hyperHermitian structures are considered, using the notions of the ca...
This book provides an up-to-date presentation of homogeneous pseudo-Riemannian structures, an essent...
In this thesis we consider nonholonomic Riemannian manifolds, and in particular, left- invariant non...
In this thesis we consider nonholonomic Riemannian manifolds, and in particular, left- invariant non...
summary:Summary: Geometrical concepts induced by a smooth mapping $f:M\to N$ of manifolds with linea...
First published in 1964, this book served as a text on differential geometry to several generations ...
WOS: 000422670000002In this chapter, we give brief information about geometric structures which will...
Special structures often arise naturally in Riemannian geometry. They are usually given by the exist...
Differential geometry is the study of a differentiable manifold on which we are given some geometri...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
Ambrose, Palais and Singer introduced the concept of second order structures on finite dimensional m...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
This book provides an up-to-date presentation of homogeneous pseudo-Riemannian structures, an essent...
We consider purely algebraic data generalizing the notion of a smooth differentiable manifold. It is...
Some results concerning almost hyperHermitian structures are considered, using the notions of the ca...
This book provides an up-to-date presentation of homogeneous pseudo-Riemannian structures, an essent...
In this thesis we consider nonholonomic Riemannian manifolds, and in particular, left- invariant non...
In this thesis we consider nonholonomic Riemannian manifolds, and in particular, left- invariant non...
summary:Summary: Geometrical concepts induced by a smooth mapping $f:M\to N$ of manifolds with linea...
First published in 1964, this book served as a text on differential geometry to several generations ...