SPP 2026 – Geometry at Infinity

Welcome to SPP 2026

This is the platform of a coordinated research programme in mathematics, funded by the German Research Foundation (DFG). It comprises 80 research projects in the fields of differential geometry, geometric topology, and global analysis. More than 80 researchers from doctoral to professorial level and based at more than 20 German and Swiss universities are represented in this programme.

ERC Starting Grant

We congratulate our SPP member Giles Gardam from the University of Münster on receiving an ERC Starting Grant for his project "Satisfiability and…

Latest News

05/12/2022 ERC Starting Grant

10/11/2022 Postdoc in Geometric Analysis and Differential Geometry at KIT

05/10/2022 Upcoming Ph.D. or postdoctoral position in Kiel

16/08/2022 Ph.D. position in Magdeburg

ALL NEWS

Next Activities

Mon30.Jan 2023

10:30 AM - 05:00 PM

XI Bavarian Geometry & Topology Meeting

Mon13.Feb 2023

13/02/2023 - 17/02/2023

Young Geometric Group Theory XI

Mon27.Feb 2023

27/02/2023 - 10/03/2023

Interdisciplinary junior scientist workshop: Mathematical General…

All activities

Latest Blog posts

17/01/2023 09:14 AM Illustrating the Impact of the Mathematical Sciences A series of posters and some other related media were produced by the National Academy of Sciences of the USA to showcase mathematics of the twenty-first century and its applications in the real world: link. If you still don’t know what to put on your office walls, have a look at those posters!

16/01/2023 08:46 AM Double Soul Conjecture Recall the Soul Theorem of Cheeger and Gromoll: If \((M,g)\) is a complete and connected Riemannian manifold of non-negative sectional curvature, then there exists a closed, totally convex and totally geodesic embedded submanifold whose normal bundle is diffeomorphic to \(M\). Such a submanifold is called a soul of \((M,g)\) and the Riemannian metric induced on … Continue reading

28/11/2022 12:32 PM Progress on the union-closed sets conjecture The union-closed sets conjecture is the following extremely easy to state conjecture about subsets of finite sets: Assume that \(\mathcal{F}\) is a family of subsets of \(\{1, 2, \ldots, n\}\) which is union-closed; this means that for any two sets \(A,B\) in \(\mathcal{F}\) their union \(A \cup B\) is also a member of \(\mathcal{F}\). Then … Continue reading

VISIT BLOG

Geometry at Infinity

Welcome to SPP 2026

ERC Starting Grant

Latest News

Next Activities

Latest publications

Galois cohomology and profinitely solitary Chevalley groups
Holger Kammeyer, Ryan Spitler

Yamabe problem in the presence of singular Riemannian Foliations
Diego Corro, Juan Carlos Fernández and Raquel Perales

Stability of Einstein metrics and effective hyperbolization in large Hempel distance
Ursula Hamenstädt, Frieder Jäckel

Gromov-Hausdorff Limits of Closed Surfaces
Tobias Zisgen

Rank Rigidity for CAT(0) spaces without 3-flats
Stephan Stadler

Latest Blog posts

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ERC Starting Grant

Galois cohomology and profinitely solitary Chevalley groupsHolger Kammeyer, Ryan Spitler

Yamabe problem in the presence of singular Riemannian FoliationsDiego Corro, Juan Carlos Fernández and Raquel Perales

Stability of Einstein metrics and effective hyperbolization in large Hempel distanceUrsula Hamenstädt, Frieder Jäckel

Gromov-Hausdorff Limits of Closed SurfacesTobias Zisgen

Rank Rigidity for CAT(0) spaces without 3-flatsStephan Stadler

This website uses cookies

Galois cohomology and profinitely solitary Chevalley groups
Holger Kammeyer, Ryan Spitler

Yamabe problem in the presence of singular Riemannian Foliations
Diego Corro, Juan Carlos Fernández and Raquel Perales

Stability of Einstein metrics and effective hyperbolization in large Hempel distance
Ursula Hamenstädt, Frieder Jäckel

Gromov-Hausdorff Limits of Closed Surfaces
Tobias Zisgen

Rank Rigidity for CAT(0) spaces without 3-flats
Stephan Stadler