J 2020

DIRICHLET BOUNDARY VALUE PROBLEM FOR AN IMPULSIVE FORCED PENDULUM EQUATION WITH VISCOUS AND DRY FRICTIONS

PAVLAČKOVÁ, Martina and Pavel ŽENČÁK

Basic information

Original name

DIRICHLET BOUNDARY VALUE PROBLEM FOR AN IMPULSIVE FORCED PENDULUM EQUATION WITH VISCOUS AND DRY FRICTIONS

Authors

PAVLAČKOVÁ, Martina (203 Czech Republic, belonging to the institution) and Pavel ŽENČÁK (203 Czech Republic)

Edition

Applications of Mathematics, PRAHA 1, ACAD SCIENCES CZECH REPUBLIC, INST MATHEMATICS, 2020, 0862-7940

Other information

Language

English

Type of outcome

Článek v odborném periodiku

Field of Study

10102 Applied mathematics

Country of publisher

Czech Republic

Confidentiality degree

není předmětem státního či obchodního tajemství

References:

RIV identification code

RIV/26867184:_____/20:N0000028

Organization unit

Moravian Business College Olomouc

DOI

UT WoS

000584991300001

Keywords in English

impulsive Dirichlet problem; Kakutani-Ky Fan fixed-point theorem; pendulum equation; dry friction

Tags

Změněno: 25/2/2021 13:51, Ing. Michaela Nováková

Abstract

V originále

Sufficient conditions are given for the solvability of an impulsive Dirichlet boundary value problem to forced nonlinear differential equations involving the combination of viscous and dry frictions. Apart from the solvability, also the explicit estimates of solutions and their derivatives are obtained. As an application, an illustrative example is given, and the corresponding numerical solution is obtained by applying Matlab software.