MU02027 Partial Differential Equations I

Mathematical Institute in Opava
Summer 2014
Extent and Intensity
2/2/0. 6 credit(s). Type of Completion: zk (examination).
Teacher(s)
doc. RNDr. Jana Kopfová, Ph.D. (lecturer)
doc. RNDr. Jana Kopfová, Ph.D. (seminar tutor)
Guaranteed by
doc. RNDr. Jana Kopfová, Ph.D.
Mathematical Institute in Opava
Prerequisites (in Czech)
MU02024 Ordinary Differential Equation
Course Enrolment Limitations
The course is also offered to the students of the fields other than those the course is directly associated with.
fields of study / plans the course is directly associated with
Course objectives (in Czech)
PDR sú v istom zmysle vyvrcholením matematickej analýzy, uplatňujú sa tu výsledky z integrálneho a diferenciálneho počtu, algebry, geometrie, komplexnej analýzy. Prednáška je prehĺadom klasických výsledkov a metód z PDR, budeme sa zaoberať rovnicami prvého a druhého rádu.
Syllabus
  • 1.Basic notations and definitions. Some known equations. Well posed problems. Generalized solutions. Short history of PDEs
    2.PDE's of first order. Cauchy problem. Characteristic ordinary differential equations. Homogenized linear equations of first order . Quasilinear equations. Nonlinear equations of first order. Plane elements. Monge cone
    3.Cauchy initial problem. Cauchy-Kowalewska theorem. Generalized Cauchy problem. Characteristics
    4.Classification of equations of second order. Linear PDE's with constant coefficients. Linear PDE's of second order: reduction to the canonical form
    5.Parabolic equations. Derivation of the physical model. Correctly stated boundary value problems. Cauchy problem: fundamental solution; existence and uniqueness theorem. Maximum principle
    Fourier method. Boundary value problems for parabolic equations. Hyperbolic equations. The Laplace equation on a circle
    6.Hyperbolic equations. Method of characteristics. D'Alembert formula. Hyperbolic equations on a halfline and on a finite interval. Three-dimensional wave equation. Riemann method for the Cauchy problem. Riemann formula
    7.Elliptic equations. Laplace equation. Poisson equation. Physical motivation. Harmonic functions. Symmetric solutions. Maximum principle. Uniqueness of solutions
Literature
    recommended literature
  • V. I. Averbuch. Partial differential equations. MÚ SU, Opava. info
  • Jan Franců. Parciální diferenciální rovnice. Brno, 1998. info
  • L. C. Evans. Partial diferential equations. 1998. info
  • M. Renardy, R. C. Rogers. An introduction to partial differential equations. New York, 1993. info
Language of instruction
Czech
Further comments (probably available only in Czech)
The course can also be completed outside the examination period.
The course is also listed under the following terms Summer 2000, Summer 2001, Summer 2002, Summer 2003, Summer 2004, Summer 2005, Summer 2006, Summer 2007, Summer 2008, Summer 2009, Summer 2010, Summer 2011, Summer 2012, Summer 2013, Summer 2015, Summer 2016, Summer 2017, Summer 2018, Summer 2019, Summer 2020, Summer 2021, Summer 2022, Summer 2023, Summer 2024.
  • Enrolment Statistics (Summer 2014, recent)
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