Publication result detail

Two definitions of connections on manifolds and operations on the differential forms in local coordinates

KUREŠ, M.

Original Title

Two definitions of connections on manifolds and operations on the differential forms in local coordinates

English Title

Two definitions of connections on manifolds and operations on the differential forms in local coordinates

Type

Peer-reviewed article not indexed in WoS or Scopus

Original Abstract

Some important concepts of differential geometry are calculated in local coordinates. In particular, two definition of a connection are compared. Furthermore, the paper also deals with coordinate expression of differential forms.

English abstract

Some important concepts of differential geometry are calculated in local coordinates. In particular, two definition of a connection are compared. Furthermore, the paper also deals with coordinate expression of differential forms.

Keywords

manifold, connection, differential form, Hodge star operator

Key words in English

manifold, connection, differential form, Hodge star operator

Authors

KUREŠ, M.

RIV year

2019

Released

11.04.2019

Publisher

Asia Pacific Academic

Location

Auckland, New Zealand

ISBN

2357-2205

Periodical

Asia Pacific Journal of Mathematics

Volume

6

Number

11

State

New Zealand

Pages from

1

Pages to

10

Pages count

10

BibTex

@article{BUT156511,
  author="Miroslav {Kureš}",
  title="Two definitions of connections on manifolds and operations on the differential forms in local coordinates",
  journal="Asia Pacific Journal of Mathematics",
  year="2019",
  volume="6",
  number="11",
  pages="1--10",
  doi="10.28924/APJM/6-11",
  issn="2357-2205"
}