Coursera Flash Sale
40% Off Coursera Plus for 3 Months!
Grab it
Explore advanced mathematical concepts in this lecture from the "Logarithmic and non-archimedean methods in Singularity Theory" conference, focusing on applications of Hrushovski and Kazhdan's theory of motivic integration. Delve into the association of motivic invariants with semi-algebraic sets in algebraically closed valued fields, examining how motivic volumes connect to classical invariants of the Milnor fiber through Hrushovski and Loeser's work. Learn about the application of these methods to singularities arising from smooth variety quotients by linear groups, including the orbifold formula of Batyrev and Denef-Loeser for finite groups and its extension to general linear groups. Access this comprehensive mathematical presentation through CIRM's Audiovisual Mathematics Library, featuring chapter markers, keywords, enriched content with abstracts and bibliographies, and advanced search capabilities for exploring related mathematical content.
