Alternatively have a look at the program.

## Hodge theory and o-minimality (Introductory lecture)

# Felix Klein Lectures

Hodge theory and o-minimality

## Benjamin Bakker (Georgia)

https://www.hcm.uni-bonn.de/events/eventpages/felix-klein-lectures/fkl-2019-bakker/

Introductory lecture

## A Riemann-Hilbert Correspondence in p-adic Geometry, Lecture 1

At the start of the 20th century, David Hilbert asked which representations can arise by studying the monodromy of Fuchsian equations. This question was the starting point for a beautiful circle of ideas relating the topology of a complex algebraic variety X to the study of algebraic differential equations. A central result is the celebrated Riemann-Hilbert correspondence of Kashiwara and Mebkhout, which supplies a fully faithful embedding from the category of perverse sheaves on $X$ to the category of algebraic $\mathfrak{D}_X$-modules.

## A Riemann-Hilbert Correspondence in p-adic Geometry, Lecture 2

At the start of the 20th century, David Hilbert asked which representations can arise by studying the monodromy of Fuchsian equations. This question was the starting point for a beautiful circle of ideas relating the topology of a complex algebraic variety X to the study of algebraic differential equations. A central result is the celebrated Riemann-Hilbert correspondence of Kashiwara and Mebkhout, which supplies a fully faithful embedding from the category of perverse sheaves on $X$ to the category of algebraic $\mathfrak{D}_X$-modules.

## A Riemann-Hilbert Correspondence in p-adic Geometry, Lecture 3

At the start of the 20th century, David Hilbert asked which representations can arise by studying the monodromy of Fuchsian equations. This question was the starting point for a beautiful circle of ideas relating the topology of a complex algebraic variety X to the study of algebraic differential equations. A central result is the celebrated Riemann-Hilbert correspondence of Kashiwara and Mebkhout, which supplies a fully faithful embedding from the category of perverse sheaves on $X$ to the category of algebraic $\mathfrak{D}_X$-modules.

## A Riemann-Hilbert Correspondence in p-adic Geometry, Lecture 4

## A Riemann-Hilbert Correspondence in p-adic Geometry, Lecture 5

## A Riemann-Hilbert Correspondence in p-adic Geometry, Lecture 6

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