Approximate Periodic Solutions for Oscillatory Phenomena Modelled by Nonlinear Differential Equations

المؤلفون المشاركون

Bundău, Olivia
Căruntu, Bogdan
Bota, Constantin

المصدر

Mathematical Problems in Engineering

العدد

المجلد 2014، العدد 2014 (31 ديسمبر/كانون الأول 2014)، ص ص. 1-11، 11ص.

الناشر

Hindawi Publishing Corporation

تاريخ النشر

2014-04-23

دولة النشر

مصر

عدد الصفحات

11

التخصصات الرئيسية

هندسة مدنية

الملخص EN

We apply the Fourier-least squares method (FLSM) which allows us to find approximate periodic solutions for a very general class of nonlinear differential equations modelling oscillatory phenomena.

We illustrate the accuracy of the method by using several significant examples of nonlinear problems including the cubic Duffing oscillator, the Van der Pol oscillator, and the Jerk equations.

The results are compared to those obtained by other methods.

نمط استشهاد جمعية علماء النفس الأمريكية (APA)

Bota, Constantin& Căruntu, Bogdan& Bundău, Olivia. 2014. Approximate Periodic Solutions for Oscillatory Phenomena Modelled by Nonlinear Differential Equations. Mathematical Problems in Engineering،Vol. 2014, no. 2014, pp.1-11.
https://search.emarefa.net/detail/BIM-477604

نمط استشهاد الجمعية الأمريكية للغات الحديثة (MLA)

Bota, Constantin…[et al.]. Approximate Periodic Solutions for Oscillatory Phenomena Modelled by Nonlinear Differential Equations. Mathematical Problems in Engineering No. 2014 (2014), pp.1-11.
https://search.emarefa.net/detail/BIM-477604

نمط استشهاد الجمعية الطبية الأمريكية (AMA)

Bota, Constantin& Căruntu, Bogdan& Bundău, Olivia. Approximate Periodic Solutions for Oscillatory Phenomena Modelled by Nonlinear Differential Equations. Mathematical Problems in Engineering. 2014. Vol. 2014, no. 2014, pp.1-11.
https://search.emarefa.net/detail/BIM-477604

نوع البيانات

مقالات

لغة النص

الإنجليزية

الملاحظات

Includes bibliographical references

رقم السجل

BIM-477604