Representation theory of Lie groups
In mathematics, a holomorphic discrete series representation is a discrete series representation of a semisimple Lie group that can be represented in a natural way as a Hilbert space of holomorphic functions. The simple Lie groups with holomorphic discrete series are those whose symmetric space is Hermitian. Holomorphic discrete series representations are the easiest discrete series representations to study because they have highest or lowest weights, which makes their behavior similar to that of finite-dimensional representations of compact Lie groups. found the first examples of holomorphic discrete series representations, and Harish-Chandra classified them for all semisimple Lie groups. and described the characters of holomorphic discrete series representations. (Wikipedia).
Galois Representations Associated to Holomorphic Limits of Discrete Series - Wushi Goldring
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From playlist Introduction to Functions: Function Basics
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From playlist Ecole d'été 2019 - Foliations and algebraic geometry
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The purpose of this course is to present the basics of the general theory of (singular) holomorphic foliations. We will begin with the general definition of a (regular) foliation and its relation with Frobenius Theorem. We will then introduce the singular analogues of these notions in the
From playlist Ecole d'été 2019 - Foliations and algebraic geometry
H. Reis - Introduction to holomorphic foliations (Part 2)
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From playlist Ecole d'été 2019 - Foliations and algebraic geometry
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From playlist Functions (Discrete Math)
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From playlist 2022 Summer School on the Langlands program
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From playlist Mathematics
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From playlist Ecole d'été 2019 - Foliations and algebraic geometry
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From playlist Quantum Encounters Seminar - Quantum Information, Condensed Matter, Quantum Field Theory