Acan, O., 2016. Existence and uniqueness of periodic
solutions for a kind of forced rayleigh equation, Gazi
University Journal of Science, 29, 645-650.
Burton T. A., 1985. Stability and Periodic Solutions of
Ordinary and Functional Differential Equations,
Academic Press, Orland, FL.
Deimling, K., 1985. Nonlinear Functional Analysis,
Springer, Berlin.
Degla, G., 1997. Degree theory for compact
displacements of the identity and applications,
International Center for Theoretical Physics, P.O. Box
586, Italy.
Gaines, R. E., Mawhin, J., 1977. Coincidence Degree and
Nonlinear Differential Equations, in: Lecture Notes in
Mathematics, Springer-Verlag, Berlin, New York.
Huang, C., He, Y., Huang, L., Tan, W., 2007. New results on the periodic solutions for a kind of Rayleigh equation with two deviating arguments, Mathematical and Computer Modelling, 46, 5-6
. Li, Y., Huang, L., 2008. New results of periodic solutions for forced Rayleigh-type equations, Journal of mathematical analysis and applications, 221(1), 98-105.
Liang, R., 2012. Existence and uniqueness of periodic solution for forced Rayleigh type equations, Journal of Applied Mathematics and Computing, 40, 415-425.
Liu, B., 2008. Existence and uniqueness of periodic solutions for a kind of Rayleigh equation with two deviating arguments, Computers & Mathematics with Applications, 55, 2108-2117
Liu, B., Huang, L., 2006. Periodic solutions for a kind of Rayleigh equation with a deviating argument, Journal of mathematical analysis and applications, 321, 491-500.
Lu, S., Ge, W., 2004a. Periodic solutions for a kind of Liénard equations with deviating arguments, Journal of mathematical analysis and applications, 249, 231-243.
Lu, S., Ge, W., 2004b. Some new results on the existence of periodic solutions to a kind of Rayleigh equation with a deviating argument, Nonlinear Analaysis, 56, 501-504.
Lu, S., Ge, W., Zheng, Z., 2004. Periodic Solutions for a Kind of Rayleigh Equation with a Deviating Argument, Applied mathematics letters, 17, 443-449.
Peng, L., Liu, B., Zhou, Q., Huang, L., 2006. Periodic solutions for a kind of Rayleigh equation with two deviating arguments, Journal of the Franklin Institute, 343, 676-687.
Wang, L., Shao, J., 2010. New results of periodic solutions for a kind of forced Rayleigh-type equations, Nonlinear Analaysis, 11, 99-105.
Xiong, W., Zhou, Q., Xiao, B., Wang, Y., Long, F., 2007. Periodic solutions for a kind of Liénard equation with two deviating arguments, Nonlinear Analaysis, 8(3), 787-796.
Yu, Y., Shao, J., Yue, G., 2009. Existence and uniqueness of anti-periodic solutions for a kind of Rayleigh equation with two deviating arguments, Nonlinear Analaysis, 71, 4689-4695.
Zhou, Y., Tang, X., 2007a. On existence of periodic solutions of Rayleigh equation of retarded type, Journal of computational and applied mathematics, 203, 1-5.
Zhou, Y., Tang, X., 2007b. Periodic solutions for a kind of Rayleigh equation with a deviating argument, Computers & Mathematics with Applications, 53, 825-830.
Zhou, Y., Tang, X., 2008. On existence of periodic solutions of a kind of Rayleigh equation with a deviating argument, Nonlinear Analaysis, 69, 2355-2361.
Year 2018,
Volume: 18 Issue: 1, 156 - 161, 30.04.2018
Acan, O., 2016. Existence and uniqueness of periodic
solutions for a kind of forced rayleigh equation, Gazi
University Journal of Science, 29, 645-650.
Burton T. A., 1985. Stability and Periodic Solutions of
Ordinary and Functional Differential Equations,
Academic Press, Orland, FL.
Deimling, K., 1985. Nonlinear Functional Analysis,
Springer, Berlin.
Degla, G., 1997. Degree theory for compact
displacements of the identity and applications,
International Center for Theoretical Physics, P.O. Box
586, Italy.
Gaines, R. E., Mawhin, J., 1977. Coincidence Degree and
Nonlinear Differential Equations, in: Lecture Notes in
Mathematics, Springer-Verlag, Berlin, New York.
Huang, C., He, Y., Huang, L., Tan, W., 2007. New results on the periodic solutions for a kind of Rayleigh equation with two deviating arguments, Mathematical and Computer Modelling, 46, 5-6
. Li, Y., Huang, L., 2008. New results of periodic solutions for forced Rayleigh-type equations, Journal of mathematical analysis and applications, 221(1), 98-105.
Liang, R., 2012. Existence and uniqueness of periodic solution for forced Rayleigh type equations, Journal of Applied Mathematics and Computing, 40, 415-425.
Liu, B., 2008. Existence and uniqueness of periodic solutions for a kind of Rayleigh equation with two deviating arguments, Computers & Mathematics with Applications, 55, 2108-2117
Liu, B., Huang, L., 2006. Periodic solutions for a kind of Rayleigh equation with a deviating argument, Journal of mathematical analysis and applications, 321, 491-500.
Lu, S., Ge, W., 2004a. Periodic solutions for a kind of Liénard equations with deviating arguments, Journal of mathematical analysis and applications, 249, 231-243.
Lu, S., Ge, W., 2004b. Some new results on the existence of periodic solutions to a kind of Rayleigh equation with a deviating argument, Nonlinear Analaysis, 56, 501-504.
Lu, S., Ge, W., Zheng, Z., 2004. Periodic Solutions for a Kind of Rayleigh Equation with a Deviating Argument, Applied mathematics letters, 17, 443-449.
Peng, L., Liu, B., Zhou, Q., Huang, L., 2006. Periodic solutions for a kind of Rayleigh equation with two deviating arguments, Journal of the Franklin Institute, 343, 676-687.
Wang, L., Shao, J., 2010. New results of periodic solutions for a kind of forced Rayleigh-type equations, Nonlinear Analaysis, 11, 99-105.
Xiong, W., Zhou, Q., Xiao, B., Wang, Y., Long, F., 2007. Periodic solutions for a kind of Liénard equation with two deviating arguments, Nonlinear Analaysis, 8(3), 787-796.
Yu, Y., Shao, J., Yue, G., 2009. Existence and uniqueness of anti-periodic solutions for a kind of Rayleigh equation with two deviating arguments, Nonlinear Analaysis, 71, 4689-4695.
Zhou, Y., Tang, X., 2007a. On existence of periodic solutions of Rayleigh equation of retarded type, Journal of computational and applied mathematics, 203, 1-5.
Zhou, Y., Tang, X., 2007b. Periodic solutions for a kind of Rayleigh equation with a deviating argument, Computers & Mathematics with Applications, 53, 825-830.
Zhou, Y., Tang, X., 2008. On existence of periodic solutions of a kind of Rayleigh equation with a deviating argument, Nonlinear Analaysis, 69, 2355-2361.
Acan, O. (2018). Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, 18(1), 156-161.
AMA
Acan O. Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. April 2018;18(1):156-161.
Chicago
Acan, Omer. “Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 18, no. 1 (April 2018): 156-61.
EndNote
Acan O (April 1, 2018) Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 18 1 156–161.
IEEE
O. Acan, “Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine”, Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, vol. 18, no. 1, pp. 156–161, 2018.
ISNAD
Acan, Omer. “Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 18/1 (April 2018), 156-161.
JAMA
Acan O. Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. 2018;18:156–161.
MLA
Acan, Omer. “Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, vol. 18, no. 1, 2018, pp. 156-61.
Vancouver
Acan O. Gecikme Argümentli Rayleigh Tipi Denklem için Periyodik Çözümlerin Varlığı Üzerine. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. 2018;18(1):156-61.