Publication detail

Homomorphisms of EL-hyperstructures based on a certain classical transformation

CHVALINA, J. KŘEHLÍK, Š. NOVÁK, M.

Original Title

Homomorphisms of EL-hyperstructures based on a certain classical transformation

English Title

Homomorphisms of EL-hyperstructures based on a certain classical transformation

Type

journal article - other

Language

en

Original Abstract

Motivated by properties of the Laplace transformation and certain types of ordinary differential equations a number of single-valued structures of operators of specific types has so far been constructed. Also, hyperstructures of a certain type have been constructed on these single-valued sets. In this paper we aim at linking these hyperstructures by constructing homomorphisms between them.

English abstract

Motivated by properties of the Laplace transformation and certain types of ordinary differential equations a number of single-valued structures of operators of specific types has so far been constructed. Also, hyperstructures of a certain type have been constructed on these single-valued sets. In this paper we aim at linking these hyperstructures by constructing homomorphisms between them.

Keywords

Ends lemma, EL-hyperstructures, Hill equation, Laplace transform, Volterra equation

Released

25.11.2016

ISBN

2383-2851

Periodical

International journal of algebraic hyperstructures and its applications

Year of study

2(2015)

Number

1

State

IR

Pages from

101

Pages to

112

Pages count

12

Documents

BibTex


@article{BUT130582,
  author="Jan {Chvalina} and Štěpán {Křehlík} and Michal {Novák}",
  title="Homomorphisms of EL-hyperstructures based on a certain classical transformation",
  annote="Motivated by properties of the Laplace transformation and certain types of ordinary differential equations a number of single-valued structures of operators of specific types has so far been constructed. Also, hyperstructures of a certain type have been constructed on these single-valued sets. In this paper we aim at linking these hyperstructures by constructing homomorphisms between them.",
  chapter="130582",
  howpublished="online",
  number="1",
  volume="2(2015)",
  year="2016",
  month="november",
  pages="101--112",
  type="journal article - other"
}