Latest revision as of 21:12, 31 August 2023

Differential Equations

Course name: Differential Equations
Code discipline: CSE205
Subject area: Math

Short Description

This course is an introduction to ordinary differential equations(ODEs) and their applications. Topics covered include first order ODEs, second order linear ODEs, Laypunov’s stability theory and numerical methods.The course will also introduce students to systems of linear equations and eigenvalue problems.

Course Topics

Course Sections and Topics
Section	Topics within the section
Differential equations of the first order	Introduction into differential equations. Origins and examples of the differential equations. A geometrical interpretation of the differential equations of the first order. A field of directions and solutions of the differential equations as trajectories Theorem about existence of the solution of the differential equations. Proof of the theorem. Equations with separable variables and linear equations of the first order. Homogeneous equations and exact equations and integration factors.
Differential equations of the second order	Linear equations of the second order. Phase portraits, trajectories and conservation laws. Singular points of the second order equations. Non-homogeneous equations and method of undetermined coefficients. Resonances. Variations parameters for the second order equations. Boundary value problems for the second-order equations and Green's function. Applications of Laplace transform.
Nonlinear equations and Lyapunov's stability	Nonlinear equations of the second order. Conservation laws and trajectories. Lyapunov's stability. Lyapunov's function and Lyapunov stability theorems. Chetaev's instability theorem and examples of chaotic systems. Partial differential equations of the first order and method of characteristics.
Systems of the differential equations	Linear systems of differential equations of the first order and matrix of fundamental solutions. Method of variations parameters for the non-homogeneous linear systems.
Numerical methods	Euler's method. Runge-Kutta method. Stability and accuracy of numerical methods.

Intended Learning Outcomes (ILOs)

Course objectives

Upon completion of this course, students should be able to:

Realize conditions of existence for the equations of the first order and solve first-order ordinary differential equations using various techniques such as separation of variables, integration factors.
Solve second-order linear differential equations with constant coefficients using techniques such as the characteristic equation and the method of undetermined coefficients and applications of Laplace transform for the linear equations.
Define the resonant conditions for the linear and nonlinear equations of the second order equation.
Apply the Lyapunov's stability theory for the linear and nonlinear systems.
Know the properties of the solutions of first-order partial differential equations.
Apply numerical methods to approximate solutions to differential equations.
Understand the concept of eigenvalues and eigenvectors and use them to solve systems of linear differential equations.

Grading

Course grading range


Grade	Range	Description of performance
A. Excellent	90-100	-
B. Good	75-89	-
C. Satisfactory	60-74	-
D. Fail	0-59	-

Course activities and grading breakdown


Activity Type	Percentage of the overall course grade
Midterm	20
Interim Assessment	20 pts (2 tests by 10 pts)
Final exam	30
Computational assignment	30
Attendance and In-class participation	7

Resources, literature and reference materials

Open access resources

Elementary Differential Equations by William F. Trench. Brooks/Cole Thomson Learning, 2001 link
Stephen L. Campbell and Richard Haberman, Introduction to differential equations with dynamical systems
J.L.Brenner, Problems in DifferentialEquations(adapted from ”Problems in differential equations” by A.F.Filippov)
S.G.Glebov, O.M.Kiselev, N.Tarkhanov. Nonlinear equations with small parameter. Volume I:Oscillations and resonances

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 * Apply numerical methods to approximate solutions to differential equations.
 * Understand the concept of eigenvalues and eigenvectors and use them to solve systems of linear differential equations.
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 === What is the main purpose of this course? ===
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 * predict the number of terms in series solution of the equation depending on the given accuracy,
 * implement a certain numerical method in self-developed computer software.
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 == Grading ==
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 | Attendance and In-class participation || 7
 |}
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 === Recommendations for students on how to succeed in the course ===
 * Participation is important. Attending lectures is the key to success in this course.
 * Review lecture materials before classes to do well.
 * Reading the recommended literature is obligatory, and will give you a deeper understanding of the material.
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 == Resources, literature and reference materials ==
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 * J.L.Brenner, Problems in DifferentialEquations(adapted from ”Problems in differential equations” by A.F.Filippov)
 * S.G.Glebov, O.M.Kiselev, N.Tarkhanov. Nonlinear equations with small parameter. Volume I:Oscillations and resonances
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 == Activities and Teaching Methods ==
 {| class="wikitable"
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 === The retake exam ===
 Retakes will be run as a comprehensive exam, where the student will be assessed the acquired knowledge coming from the textbooks, the lectures, the labs, and the additional required reading material, as supplied by the instructor. During such comprehensive oral/written the student could be asked to solve exercises and to explain theoretical and practical aspects of the course.
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