Herman R. Second Course in Ordinary Differential Equations...2008

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Herman R. Second Course in Ordinary Differential Equations...2008

Textbook in PDF format These are notes for a second course in differential equations originally taught in the Spring semester of 2005 at the University of North Carolina Wilmington to upper level and first year graduate students and later updated in Fall 2007 and Fall 2008. It is assumed that you have had an introductory course in differential equations. However, we will begin this chapter with a review of some of the material from your first course in differential equations and then give an overview of the material we are about to cover. Typically an introductory course in differential equations introduces students to analytical solutions of first order differential equations which are separable, first order linear differential equations, and sometimes to some other special types of equations. Students then explore the theory of second order differential equations generally restricted the study of exact solutions of constant coefficient linear differential equations or even equations of the Cauchy-Euler type. These are later followed by the study of special techniques, such as power series methods or Laplace transform methods. If time permits, ones explores a few special functions, such as Legendre polynomials and Bessel functions, while exploring power series methods for solving differential equations. Introduction. Systems of Differential Equations. Nonlinear Systems. Boundary Value Problems. Fourier Series. Sturm-Liouville Eigenvalue Problems. Special Functions. Green’s Functions