Lecture
Analytic Continuation: Residue Theorem
In course
DEMO: nisi labore sint mollit
Amet aliquip eiusmod laboris sint officia eiusmod duis. Esse dolore quis laborum occaecat in cillum enim ipsum quis tempor. Pariatur ullamco sunt consectetur ad quis aute veniam reprehenderit do veniam do laborum quis labore.
Description
This lecture covers the concept of analytic continuation and the application of the Residue Theorem to solve for functions. Topics include defining functions for analytic continuation, Landau's rule for contour integration, and the process of passing below poles. The lecture also discusses the need for analytic continuation of integrals and how to apply the Residue Theorem to solve for functions.
Instructor
pariatur qui id
Quis pariatur anim irure enim labore laboris minim commodo. Magna duis nulla laborum et. Ut adipisicing Lorem sint ipsum nulla consectetur. Excepteur eu ipsum nulla ipsum aliqua occaecat nulla in nisi do anim sint mollit do. Eu incididunt sint esse sunt aute anim duis.
Official source
About this result
This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.
Ontological neighbourhood
Related lectures (86)
Laplace Transform: Analytic Continuation
Covers the Laplace transform, its properties, and the concept of analytic continuation.
Plasma Instabilities: Unstable Domain Mapping
Explores the mapping of unstable domains in plasma instabilities and the conditions for instability.
Plasma Instabilities: Case Studies
Analyzes plasma instabilities through case studies, exploring the implications of roots in the complex plane.
Kinetic Theory: Distribution Function Evolution
Explores the evolution of the distribution function describing particles in phase space.
Plasma Energy Loss: Impact Parameter and Debye Screening
Covers energy loss in plasma due to impact parameter intervals and Debye screening effects.