Impulsive coupled systems with generalized jump conditions
This work considers a second order impulsive coupled system with full nonlinearities, generalized impulse functions and mixed boundary conditions. This is the first time where such coupled systems are considered with nonlinearities with dependence on both unknown functions and their derivatives, to...
| Main Authors: | , |
|---|---|
| Format: | Article |
| Language: | English |
| Published: |
Vilnius University Press
2018-02-01
|
| Series: | Nonlinear Analysis |
| Subjects: | |
| Online Access: | http://www.zurnalai.vu.lt/nonlinear-analysis/article/view/13355 |
| id |
doaj-47cdaf9a11934bea89ef669dbee33173 |
|---|---|
| record_format |
Article |
| spelling |
doaj-47cdaf9a11934bea89ef669dbee331732020-11-24T20:51:23ZengVilnius University PressNonlinear Analysis1392-51132335-89632018-02-0123110.15388/NA.2018.1.8Impulsive coupled systems with generalized jump conditionsFeliz Minhós0Robert de Sousa1Universidade de Évora, PortugalUniversidade de Cabo Verde, Cabo Verde This work considers a second order impulsive coupled system with full nonlinearities, generalized impulse functions and mixed boundary conditions. This is the first time where such coupled systems are considered with nonlinearities with dependence on both unknown functions and their derivatives, together impulsive functions given by more general framework allowing jumps on the both functions and both derivatives. The arguments apply the fixed point theory, Green's functions echnique, L1-Carathéodory functions theory and Schauder's fixed point theorem. An application to the transverse vibration system of elastically coupled double-string is presented in the last section. http://www.zurnalai.vu.lt/nonlinear-analysis/article/view/13355impulsive coupled systemsL1-Carathéodory functionsGreen's functionsSchauder's fixed-point theoremelastically coupled double-string system |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Feliz Minhós Robert de Sousa |
| spellingShingle |
Feliz Minhós Robert de Sousa Impulsive coupled systems with generalized jump conditions Nonlinear Analysis impulsive coupled systems L1-Carathéodory functions Green's functions Schauder's fixed-point theorem elastically coupled double-string system |
| author_facet |
Feliz Minhós Robert de Sousa |
| author_sort |
Feliz Minhós |
| title |
Impulsive coupled systems with generalized jump conditions |
| title_short |
Impulsive coupled systems with generalized jump conditions |
| title_full |
Impulsive coupled systems with generalized jump conditions |
| title_fullStr |
Impulsive coupled systems with generalized jump conditions |
| title_full_unstemmed |
Impulsive coupled systems with generalized jump conditions |
| title_sort |
impulsive coupled systems with generalized jump conditions |
| publisher |
Vilnius University Press |
| series |
Nonlinear Analysis |
| issn |
1392-5113 2335-8963 |
| publishDate |
2018-02-01 |
| description |
This work considers a second order impulsive coupled system with full nonlinearities, generalized impulse functions and mixed boundary conditions. This is the first time where such coupled systems are considered with nonlinearities with dependence on both unknown functions and their derivatives, together impulsive functions given by more general framework allowing jumps on the both functions and both derivatives.
The arguments apply the fixed point theory, Green's functions echnique, L1-Carathéodory functions theory and Schauder's fixed point theorem.
An application to the transverse vibration system of elastically coupled double-string is presented in the last section.
|
| topic |
impulsive coupled systems L1-Carathéodory functions Green's functions Schauder's fixed-point theorem elastically coupled double-string system |
| url |
http://www.zurnalai.vu.lt/nonlinear-analysis/article/view/13355 |
| work_keys_str_mv |
AT felizminhos impulsivecoupledsystemswithgeneralizedjumpconditions AT robertdesousa impulsivecoupledsystemswithgeneralizedjumpconditions |
| _version_ |
1716802386248335360 |