J
2023
The damped vibrating string equation on the positive half-line
PAVLAČKOVÁ, Martina and Valentina TADDEI
Basic information
Original name
The damped vibrating string equation on the positive half-line
Authors
PAVLAČKOVÁ, Martina (203 Czech Republic, belonging to the institution) and Valentina TADDEI (380 Italy)
Edition
COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION, 2023, 1007-5704
Other information
Type of outcome
Článek v odborném periodiku
Field of Study
10101 Pure mathematics
Country of publisher
Netherlands
Confidentiality degree
není předmětem státního či obchodního tajemství
Organization unit
Moravian Business College Olomouc
Keywords in English
Damped vibrating string equation; Second-order Cauchy problem; Banach spaces; Fundamental systém; Approximation solvability method; Mild solution
V originále
In this paper, the existence of a solution to the problem describing the small vertical vibration of an elastic string on the positive half-line is investigated in the case when both viscous and material damping coefficients are present. The result is obtained by transforming the original partial differential equation into an appropriate abstract second-order ordinary differential equation in a suitable infinite dimensional space. The abstract problem is then studied using the combination of the Kakutani fixed point theorem together with the approximation solvability method and the weak topology. The applied procedure enables obtaining the existence result also for problems depending on the first derivative, without any strict compactness assumptions put on the righthand side and on the fundamental system generated by the linear term. The paper ends by applying the obtained result to the studied mathematical model describing the small vertical vibration of an elastic string with a nonlinear Balakrishnan–Taylor-type damping term.
Displayed: 14/11/2024 06:21