Course detail
Partial Differential Equations
FSI-SPD Acad. year: 2021/2022 Winter semester
The course deals with the following topics: Ordinary differential equations – a brief survay of material studied within the 3rd semester subject and extending of the subject matter (theorems on existence and uniqueness of the solution, stability of the solution, boundary value problems, autonomous equations and systems, trajectories).
Partial differential equations – basic concepts. The first-order equations. The Cauchy problem for the k-th order equation. Transformation, classification and canonical form of the second-order equations.
Derivation of selected equations of mathematical physics (heat conduction, wave equation, variational prinsiple), formulation of initial and boundary value problems.
The classical methods: method of characteristics, The Fourier series method, integral transform method, the Green function method. Maximum principles. Properties of the solutions to the elliptic, parabolic and hyperbolic equations.
Language of instruction
Czech
Number of ECTS credits
4
Supervisor
Department
Learning outcomes of the course unit
Revision and deepening of the knowledge of Ordinary Differential Equations. Elements of the theory of Partial Differential Equations and survey of their application to the mathematical modelling. Ability to formulate mathematical model of the selected problems of mathematical physics and to compute the solution or propose an algorithm for numerical solution.
Prerequisites
Solution of algebraic equations and system of linear equations, differential and integral calculus of functions of one and more variables, ordinary differential equations.
Planned learning activities and teaching methods
The course is taught through lectures explaining the basic principles and theory of the discipline. Exercises are focused on practical topics presented in lectures.
Assesment methods and criteria linked to learning outcomes
Course-unit credit is awarded on condition of having attended the seminars actively and passed two control tests:
Control test 1: O.D.E.: (a) solution of the 1st order equation, (b) solution of the 2nd order linear equation, (c) solution of a system of linear equations – stability, classification of trajectories.
Control test 2: P.D.E.: (a) solution of the 1st order equation, (b) classification, and transformation of the 2nd order equation to its canonical form, (c) formulation of an initial boundary value problem related to the physical setting and finding its solution by means of the Fourier series method.
The examination consists of a practical and a theoretical part. Practical part: solving examples of P.D.E., see Control test 2. Theoretical part: theory of O.D.E. and P.D.E. (1 + 3 questions).
Aims
After completing knowledge of ordinary differential equations the aim of the subject is to provide students with the basic knowledge of the partial differential equations, their basic properties, methods of solving them, and their application in mathematical modelling. Another goal is to teach the students to formulate and solve simple problems for mathematical physics equations.
Specification of controlled education, way of implementation and compensation for absences
Absence has to be made up by self-study using lecture notes. Passing the control tests is required, in cases of bad result or absence in additional term.
The study programmes with the given course
Programme B-MAI-P: Mathematical Engineering, Bachelor's, compulsory
Type of course unit
Lecture
26 hours, compulsory
Teacher / Lecturer
Syllabus
1 Revision of O.D.E. – 1st order equations and higher order linear equations.
2 Systems of linear O.D.E., stability, existence and uniqueness of the solution.
3 Autonomous systems, trajectories and classification of singular trajectories.
4 Elements of P.D.E., 1st order equations.
5 The Cauchy problem, classification of 2nd order equations.
6 Derivation of selected equations of mathematical physics: heat equation.
7 Derivation of the equation of string vibration, wave equations.
8 Derivation of membrane equation via variational principle.
9 Method of characteristics for 1D wave equation.
10 Fourier series method.
11 Integral transform method.
12 Green function method and the maximum principles.
13 Properties of the solutions, reserve.
Exercise
26 hours, compulsory
Teacher / Lecturer
Syllabus
1 O.D.E., solution of the 1st order equations and higher order linear equations.
2 Solution of systems of linear O.D.E., stability of the solution.
3 The phase portrait of solutions to autonomous system.
4 P.D.E., solving of the 1st order equations.
5 Written test 1, classification of 2nd order equations.
6 Formulation of problems related to the heat equation.
7 Formulation of problems related to the wave equation.
8 Derivation of membrane equation via variational principle.
9 Solving problems by the method of characteristics.
10 Solving problems by the Fourier series method.
11 Written test 2.
12 Using the Green function method, harmonic functions.
13 Properties of the solutions, course-credits.