Publication result detail

Multiple Integral Computations

CHALOUPKA, J.; KOCINA, F.; VEIGEND, P.; NEČASOVÁ, G.; ŠÁTEK, V.; KUNOVSKÝ, J.

Original Title

Multiple Integral Computations

English Title

Multiple Integral Computations

Type

Paper in proceedings (conference paper)

Original Abstract

Extending standard numeric integration methods to multi-integrals is possible, however, the numeric effort grows significantly for a given accuracy. In this paper the Modern Taylor Series Method (MTSM) is extended to multi-integrals with the benefit of (theoretically) arbitrary accuracy while being highly parallelizable.

English abstract

Extending standard numeric integration methods to multi-integrals is possible, however, the numeric effort grows significantly for a given accuracy. In this paper the Modern Taylor Series Method (MTSM) is extended to multi-integrals with the benefit of (theoretically) arbitrary accuracy while being highly parallelizable.

Keywords

Multiple Integral, Differential Equations, Taylor Series Method

Key words in English

Multiple Integral, Differential Equations, Taylor Series Method

Authors

CHALOUPKA, J.; KOCINA, F.; VEIGEND, P.; NEČASOVÁ, G.; ŠÁTEK, V.; KUNOVSKÝ, J.

RIV year

2018

Released

21.07.2017

Publisher

American Institute of Physics

Location

Rhodes

Book

14th International Conference of Numerical Analysis and Applied Mathematics

ISBN

0094-243X

Periodical

AIP conference proceedings

Number

1863

State

United States of America

Pages from

1

Pages to

4

Pages count

4

URL

BibTex

@inproceedings{BUT144387,
  author="Jan {Chaloupka} and Filip {Kocina} and Petr {Veigend} and Gabriela {Nečasová} and Václav {Šátek} and Jiří {Kunovský}",
  title="Multiple Integral Computations",
  booktitle="14th International Conference of Numerical Analysis and Applied Mathematics",
  year="2017",
  journal="AIP conference proceedings",
  number="1863",
  pages="1--4",
  publisher="American Institute of Physics",
  address="Rhodes",
  doi="10.1063/1.4992650",
  issn="0094-243X",
  url="https://www.scopus.com/inward/record.uri?eid=2-s2.0-85026624246&doi=10.1063%2f1.4992650&partnerID=40&md5=905d4456fb7905499a15940abda95ec8"
}