Event Calendar

Mon Tue Wed Thu Fri Sat Sun
1
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Dynamical frames in gravity: locality, covariance and charges
Public presentations of thesis projects
2
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
3
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
4
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Algorithmic and Enumerative Combinatorics Conference
Workshop: Set-Theory
Empirische Befunde zu Kompetenzen im Mathematikunterricht der Sekundarstufe I und Folgerungen für die Praxis
Probabilistic solutions of the supercooled Stefan problem
5
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Algorithmic and Enumerative Combinatorics Conference
Workshop: Set-Theory
6
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Algorithmic and Enumerative Combinatorics Conference
Workshop: Set-Theory
7
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Algorithmic and Enumerative Combinatorics Conference
Workshop: Set-Theory
Dimension theory and classification of Assouad spectra through homogeneous Moran sets
8
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Algorithmic and Enumerative Combinatorics Conference
Workshop: Set-Theory
9
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
10
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
11
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Non-smooth Spacetime Geometry
12
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
13
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
14
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Flows on the modular surface and trees of fractions
15
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
16
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
17
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
18
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
19
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
A tale of two infinities
20
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
21
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
22
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
On general-relativistic Lagrangian perturbation theory
The Black Hole Information Paradox: A resolution on the horizon?
23
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Black Holes: the Most Paradoxical Objects in the Universe
24
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
25
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
26
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
27
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
28
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
29
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
Elliptic Combinatorics of Lattice Paths, Domino Tilings and Rook Placements
30
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
31
The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++
12.10.2013 16:45
 

The tower number and the ultrafilter number on an inaccessible cardinal kappa with compactness at kappa++

R. Honzik (Charles U, Prague, CZ)

01.07.2022 13:00
 

Dynamical frames in gravity: locality, covariance and charges

Philipp Andres Hoehn (OIST)

01.07.2022 13:30
 

Public presentations of thesis projects

04.07.2022 09:00
 

Algorithmic and Enumerative Combinatorics Conference

04.07.2022 09:00
 

Workshop: Set-Theory

04.07.2022 10:00
 

Empirische Befunde zu Kompetenzen im Mathematikunterricht der Sekundarstufe I und Folgerungen für die Praxis

Evelyn Süss-Stepancik (PH Wien), Michael Ober, Ann Cathrice George (IQS Salzburg), Stefan Götz (Universität Wien), Daniel Paasch, Christina Drüke-Noe...

04.07.2022 14:00
 

Probabilistic solutions of the supercooled Stefan problem

Stefan Rigger (U Wien)

07.07.2022 15:15
 

Dimension theory and classification of Assouad spectra through homogeneous Moran sets

Alex Rutar (University of St Andrews)

11.07.2022 10:30
 

Non-smooth Spacetime Geometry

Benedict Schinnerl

14.07.2022 15:15
 

Flows on the modular surface and trees of fractions

Claudio Bonanno (University of Pisa)

19.07.2022 19:00
 

A tale of two infinities

Gianfranco Bertone (University of Amsterdam)

22.07.2022 15:00
 

On general-relativistic Lagrangian perturbation theory

Thomas Buchert (CRAL, University of Lyon)

22.07.2022 19:00
 

The Black Hole Information Paradox: A resolution on the horizon?

Netta Engelhardt (MIT)

23.07.2022 19:00
 

Black Holes: the Most Paradoxical Objects in the Universe

Andrew Strominger (Harvard)

29.07.2022 11:00
 

Elliptic Combinatorics of Lattice Paths, Domino Tilings and Rook Placements

Josef Küstner