Publication result detail

Capillary transfer coefficient of polynomial type in the diffusion equation

ŠKRIPKOVÁ, L.

Original Title

English Title

Capillary transfer coefficient of polynomial type in the diffusion equation

Type

Paper in proceedings (conference paper)

Original Abstract

Problem of the capillary transfer of the liquids in porous media is very actual because most of the standard building materials are characterized by a porous structure. In the present paper, we describe the process of absorbtion by a diffusion equation and investigate an inverse problem for this equation to express capillary transfer coefficient in a form of a polynomial.

English abstract

Keywords

capillary conduction, diffusion equation, inverse problem

Key words in English

capillary conduction, diffusion equation, inverse problem

Authors

ŠKRIPKOVÁ, L.

RIV year

2014

Released

17.09.2013

Publisher

American Institute of Physics

Location

Melville, New York

ISBN

978-0-7354-1184-5

Book

11th International Conference of Numerical Analysis and Applied Mathematics 2013, AIP Conference Proceedings 1558

ISBN

0094-243X

Periodical

AIP conference proceedings

State

United States of America

Pages from

1008

Pages to

1011

Pages count

BibTex

@inproceedings{BUT103008,
  author="Lucia {Škripková}",
  title="Capillary transfer coefficient of polynomial type in the diffusion equation",
  booktitle="11th International Conference of Numerical Analysis and Applied Mathematics 2013, AIP Conference Proceedings 1558",
  year="2013",
  journal="AIP conference proceedings",
  pages="1008--1011",
  publisher="American Institute of Physics",
  address="Melville, New York",
  doi="10.1063/1.4825674",
  isbn="978-0-7354-1184-5",
  issn="0094-243X"
}

VUT

Faculties

University Institutes

Parts

Capillary transfer coefficient of polynomial type in the diffusion equation