Spaces of PSC metrics and parametrised Morse theory (Oberseminar Augsburg)

Abstract: Given a smooth manifold one can ask whether there is a metric of positive scalar curvature on it. The study of this existence question has produced many obstructions. The natural follow-up question is uniqueness of positive scalar curvature metrics. One way to phrase it is “What is the homotopy type of the space of psc metrics?”. A central tool used in its study is the index difference by Hitchin, which provides a map to $K$-theory. This map is known to be non-trivial on homotopy groups if the dimension of the manifold is at least 6. ...

vscode – the ultimate text editor for LaTeX (MM Connect)

Abstract: Writing $\LaTeX$ code is necessary in our field, but to many of us it is also a pain to be endured. If you feel the same, this talk is your painkiller! — I will explain how a good text editor can make your life a lot easier with vscode serving as the example of such a text editor. There will also be some general remarks on common mistakes and best practices for $\LaTeX$ independent of the choice of text editor. ...

Spaces of PSC metrics and parametrised Morse theory (YTM 2022)

©Adriano Córdova Abstract: Scalar curvature is a purely geometric notion by definition. But it turns out, that there are topological obstructions to admitting a Riemannian metric of positive scalar curvature (psc). These obstructions can tell you a lot about the question of existence of psc metrics. In my talk I want to focus on the natural follow-up question of uniqueness. This is correctly phrased as studying the homotopy type of the space of positive scalar curvature metrics. In particular I want to explain how methods of geometric topology pioneered by Madsen–Weiss and Galatius–Randal-Williams enter into a proof of nontriviality of these spaces. This will contain some new improvements by myself, that allow the incorporation of the fundamental group via group $C^*$-algebras and higher index theory, while also dealing with the 5-dimensional case, that escaped previous methods. ...

Spaces of PSC metrics and parametrised Morse theory (Oberseminar Göttingen)

Abstract: Given a smooth manifold, one can ask whether there is a metric of positive scalar curvature on it. The study of this existence question has produced many obstructions. The natural follow-up question is uniqueness of positive scalar curvature metrics. Phrased properly this is the study of the homotopy type of the space of psc metrics. One of the main tools used in its study is the index difference by Hitchin, which provides a map to $K$-theory. This map is known to be non-trivial on homotopy groups if the dimension of the manifold is at least 6. ...

Spaces of PSC metrics and parametrised Morse theory (Oberseminar Münster)

Abstract: This semester we have had several talks on positive scalar curvature already and in this talk we will explore yet another aspect: the question of uniqueness of psc metrics. Phrased properly this is the study of the homotopy type of the space of psc metrics. One of the main tools used in its study is the index difference by Hitchin, which provides a map to $K$-theory. This map is known to be surjective on homotopy groups if the dimension of the manifold is at least 6. ...

Git for Mathematical Writing (MM Connect)

The indispensable xkcd about git Abstract: Starting out as a week-long project by the inventor of Linux, git has become the de facto standard when it comes to version control of text files and in particular source code – such as .tex-files. In this talk I will explain, how git works and why it is helpful for mathematical writing. In particular, we will address how git allows to keep track of big projects, like theses or books, and work collaboratively on papers and the like. Plus, git can be explained through graph theory! ...

MIT Talbot Workshop 2019

The 2019 instalment of the MIT Talbot workshop on Moduli Spaces of Manifolds featured an excursus on the application to positive scalar curvature by Botvinnik–Ebert–Randal-Williams. I gave one of the two talks about this and edited the talk notes for both of them. These notes can be found here.