The existence of T-periodic solutions for a general class of p-Laplacian equations is investigated. By using coincidence degree theory, some existence and uniqueness results, which generalize some earlier works on this topic, are presented.
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다국어 초록 (Multilingual Abstract)
The existence of T-periodic solutions for a general class of p-Laplacian equations is investigated. By using coincidence degree theory, some existence and uniqueness results, which generalize some earlier works on this topic, are presented.
The existence of T-periodic solutions for a general class of p-Laplacian equations is investigated. By using coincidence degree theory, some existence and uniqueness results, which generalize some earlier works on this topic, are presented.
참고문헌 (Reference)
1 S. Lu, "Some new results on the existence of periodic solutions to a kind of Rayleigh equation with a deviating argument" 56 : 501-514, 2004
2 A. Capietto, "Periodic solutions of Lienard equations with asymmetric nonlinearities at resonance" 68 (68): 119-132, 2003
3 R. Manasevich, "Periodic solutions for nonlinear systems with p-Laplacian- like operators" 145 : 367-393, 1998
4 M. Zong, "Periodic solutions for Rayleigh type p-Laplacian equation with deviating arguments" 12 : 41-44, 1999
5 S. Lu, "On the existence of periodic solutions to p-Laplacian rayleigh differ- ential equations with a delay" 325 : 685-702, 2007
6 K. Deimling, "Nonlinear Functional Analysis" Springer-Verlag 1985
7 Y. Li, "New results of periodic solutions for forced rayleigh-type equations" 221 : 98-105, 2008
8 L. Wang, "New results of periodic solutions for a kind of forced rayleigh-type equations" 11 : 99-105, 2010
9 X. Yang, "Existence of periodic solutions in nonlinear asymmetric oscillations" 37 : 566-574, 2005
10 R.E. Gaines, "Coincidence degree and Nonlinear differential equations" Springer-Verlag 568 : 1977
1 S. Lu, "Some new results on the existence of periodic solutions to a kind of Rayleigh equation with a deviating argument" 56 : 501-514, 2004
2 A. Capietto, "Periodic solutions of Lienard equations with asymmetric nonlinearities at resonance" 68 (68): 119-132, 2003
3 R. Manasevich, "Periodic solutions for nonlinear systems with p-Laplacian- like operators" 145 : 367-393, 1998
4 M. Zong, "Periodic solutions for Rayleigh type p-Laplacian equation with deviating arguments" 12 : 41-44, 1999
5 S. Lu, "On the existence of periodic solutions to p-Laplacian rayleigh differ- ential equations with a delay" 325 : 685-702, 2007
6 K. Deimling, "Nonlinear Functional Analysis" Springer-Verlag 1985
7 Y. Li, "New results of periodic solutions for forced rayleigh-type equations" 221 : 98-105, 2008
8 L. Wang, "New results of periodic solutions for a kind of forced rayleigh-type equations" 11 : 99-105, 2010
9 X. Yang, "Existence of periodic solutions in nonlinear asymmetric oscillations" 37 : 566-574, 2005
10 R.E. Gaines, "Coincidence degree and Nonlinear differential equations" Springer-Verlag 568 : 1977
11 A. Capietto, "Coexistence of unbounded and periodic so- lutions to perturbed damped isochronous oscillators at resonance" 15-32, 2008
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학술지 이력
연월일 | 이력구분 | 이력상세 | 등재구분 |
---|---|---|---|
2026 | 평가예정 | 재인증평가 신청대상 (재인증) | |
2020-01-01 | 평가 | 등재학술지 유지 (재인증) | |
2017-01-01 | 평가 | 등재학술지 유지 (계속평가) | |
2013-01-01 | 평가 | 등재학술지 유지 (등재유지) | |
2010-01-01 | 평가 | 등재학술지 유지 (등재유지) | |
2008-01-01 | 평가 | 등재학술지 유지 (등재유지) | |
2005-01-01 | 평가 | 등재학술지 선정 (등재후보2차) | |
2004-01-01 | 평가 | 등재후보 1차 PASS (등재후보1차) | |
2002-01-01 | 평가 | 등재후보학술지 선정 (신규평가) |
학술지 인용정보
기준연도 | WOS-KCI 통합IF(2년) | KCIF(2년) | KCIF(3년) |
---|---|---|---|
2016 | 0.28 | 0.28 | 0.24 |
KCIF(4년) | KCIF(5년) | 중심성지수(3년) | 즉시성지수 |
0.17 | 0.18 | 0.603 | 0.16 |