Publication result detail

Geodesic Mappings and Differentiability of Metrics, Affne and Projective Connections

HINTERLEITNER, I.; MIKEŠ, J.

Original Title

Geodesic Mappings and Differentiability of Metrics, Affne and Projective Connections

English Title

Geodesic Mappings and Differentiability of Metrics, Affne and Projective Connections

Type

WoS Article

Original Abstract

In this paper we study fundamental equations of geodesic mappings of manifolds with affne and projective connection onto (pseudo-) Riemannian manifolds with respect to the smoothness class of these geometric objects. We prove that the natural smoothness class of these problems is preserved.

English abstract

In this paper we study fundamental equations of geodesic mappings of manifolds with affne and projective connection onto (pseudo-) Riemannian manifolds with respect to the smoothness class of these geometric objects. We prove that the natural smoothness class of these problems is preserved.

Keywords

geodesic mapping, (pseudo-) Riemannian manifold, affine connection, projective connection, smoothness class

Key words in English

geodesic mapping, (pseudo-) Riemannian manifold, affine connection, projective connection, smoothness class

Authors

HINTERLEITNER, I.; MIKEŠ, J.

RIV year

2016

Released

05.05.2015

Publisher

Faculty of Sciences and Mathematics, University of Niš

Location

University of Niš, Serbia

ISBN

0354-5180

Periodical

Filomat

Volume

29

Number

6

State

Republic of Serbia

Pages from

1245

Pages to

1249

Pages count

5

BibTex

@article{BUT114729,
  author="Irena {Hinterleitner} and Josef {Mikeš}",
  title="Geodesic Mappings and Differentiability of Metrics, Affne and Projective Connections",
  journal="Filomat",
  year="2015",
  volume="29",
  number="6",
  pages="1245--1249",
  doi="10.2298/FIL1506245H",
  issn="0354-5180"
}