Publication detail

MULTIGROUP METHOD OF THE SOLUTION OF RADIATION TRANSFER

BOGATYREVA, N.

Original Title

MULTIGROUP METHOD OF THE SOLUTION OF RADIATION TRANSFER

English Title

MULTIGROUP METHOD OF THE SOLUTION OF RADIATION TRANSFER

Type

conference paper

Language

en

Original Abstract

This paper deals with the method of spherical harmonics (P1-approximation) as the way that is used to solve the equation of transfer radiation energy in arc plasma. To calculate the frequency variable in the equation of transfer the multigroup method is supposed to be used. Based on the combination of these two methods the partial differential equations as Bessel modified ones are solved. It enables to obtain an approximate solution of required accuracy.

English abstract

This paper deals with the method of spherical harmonics (P1-approximation) as the way that is used to solve the equation of transfer radiation energy in arc plasma. To calculate the frequency variable in the equation of transfer the multigroup method is supposed to be used. Based on the combination of these two methods the partial differential equations as Bessel modified ones are solved. It enables to obtain an approximate solution of required accuracy.

Keywords

arc plasma, radiation flux, spectral density, spherical harmonics, multigroup method

RIV year

2011

Released

28.04.2011

Publisher

NOVPRESS,s.r.o.

Location

Brno

ISBN

978-80-214-4273-3

Book

Proceedings of the 17th Conference STUDENT EEICT 2011 Volume 3

Edition number

1

Pages from

311

Pages to

315

Pages count

5

BibTex


@inproceedings{BUT36520,
  author="Nadezda {Bogatyreva}",
  title="MULTIGROUP METHOD OF THE SOLUTION OF RADIATION TRANSFER",
  annote="This paper deals with the method of spherical harmonics (P1-approximation) as the way that is used to solve the equation of transfer radiation energy in arc plasma. To calculate the frequency variable in the equation of transfer the multigroup method is supposed to be used. Based on the combination of these two methods the partial differential equations as Bessel modified ones are solved. It enables to obtain an approximate solution of required accuracy.",
  address="NOVPRESS,s.r.o.",
  booktitle="Proceedings of the 17th Conference STUDENT EEICT 2011 Volume 3",
  chapter="36520",
  howpublished="print",
  institution="NOVPRESS,s.r.o.",
  year="2011",
  month="april",
  pages="311--315",
  publisher="NOVPRESS,s.r.o.",
  type="conference paper"
}