Inhalt

[ 403MAMOIEBV22 ] VL (*)Integral equations and boundary value problems

Versionsauswahl
(*) Leider ist diese Information in Deutsch nicht verfügbar.
Workload Ausbildungslevel Studienfachbereich VerantwortlicheR Semesterstunden Anbietende Uni
6 ECTS M - Master Mathematik Ronny Ramlau 4 SSt Johannes Kepler Universität Linz
Detailinformationen
Quellcurriculum Masterstudium Industrial Mathematics 2026W
Lernergebnisse
Kompetenzen
(*)
  • Analytical Competency: Assess the solvability of integral equations in theoretical and applied contexts.
  • Modeling Competency: Translate real-world problems (e.g., from physics) into mathematical integral equations.
  • Numerical Competency: Select and adapt appropriate numerical methods for given integral equations.
  • Critical Reflection: Evaluate the limitations and applicability of solution methods.
  • Scientific Communication: Present and discuss solution approaches and results effectively.
Fertigkeiten Kenntnisse
(*)
  • Classify given integral equations by type and properties.
  • Transform differential equations into integral equations (and vice versa).
  • Determine the adjoint of an integral operator.
  • Apply solvability criteria (e.g., Fredholm theory).
  • Analyze mapping properties (e.g., compactness, boundedness).
  • Develop and implement numerical solution methods (e.g., collocation, Galerkin methods).
(*)
  • Definitions and types of integral equations (Fredholm/Volterra, first/second kind).
  • Functional analytic foundations (e.g., Banach and Hilbert spaces, compactness of operators).
  • Theoretical results on solvability (e.g., Fredholm alternative, existence and uniqueness conditions).
  • Relationships between differential and integral equations (e.g., Green’s functions).
  • Basics of linear operators and their adjoints.
Beurteilungskriterien (*)Oral exam after appointment at the end of the course
Lehrmethoden (*)Blackboard presentation
Abhaltungssprache Englisch
Literatur (*)Lecture Notes R. Kress: Linear Integral Equations, Springer, Berlin, 1989.
Lehrinhalte wechselnd? Nein
Frühere Varianten Decken ebenfalls die Anforderungen des Curriculums ab (von - bis)
TMBPAVOINTG: VO Integralgleichungen und Randwertprobleme (2003W-2022S)
Präsenzlehrveranstaltung
Teilungsziffer -
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