Now showing items 150-168 of 1701

• #### Asymptotic statistics ﻿

[OWS-14] (Birkhäuser Basel, 1990)
• #### 0818 - Atomistic Models of Materials: Mathematical Challenges ﻿

[OWR-2008-21] (2008) - (27 Apr - 03 May 2008)
• #### 1736 - Automorphic Forms and Arithmetic ﻿

[OWR-2017-40] (2017) - (03 Sep - 09 Sep 2017)
The workshop brought together leading experts and young researchers at the interface of automorphic forms and analytic number theory to disseminate, discuss and develop important recent methods and results. A particular ...
• #### 0010 - Automorphic Forms and Representation Theory ﻿

[TB-2000-11] (2000) - (05 Mar - 11 Mar 2000)
• #### 0806 - Automorphic Forms, Geometry and Arithmetic ﻿

[OWR-2008-5] (2008) - (03 Feb - 09 Feb 2008)
• #### 1110 - Automorphic Forms: New Directions ﻿

[OWR-2011-14] (2011) - (06 Mar - 12 Mar 2011)
The workshop on Automorphic Forms: New Directions provided a nice glimpse of the many streams of current research activity in this very active area. Topics included the relative trace formula and periods of automorphic ...
• #### Averages of Shifted Convolutions of d3(n) ﻿

[OWP-2011-11] (Mathematisches Forschungsinstitut Oberwolfach, 2011-05-13)
We investigate the first and second moments of shifted convolutions of the generalised divisor function $d_3(n)$.
• #### The Becker-Gottlieb Transfer: a Geometric Description ﻿

[OWP-2019-13] (Mathematisches Forschungsinstitut Oberwolfach, 2019-05-14)
In this note, we examine geometric aspects of the Becker-Gottlieb transfer in terms of the Umkehr and index maps, and rework some classic index theorems, using the cohomological formulae of the Becker-Gottlieb transfer. ...
• #### 0104 - Berechenbarkeitstheorie (Computability Theory) ﻿

[TB-2001-3] (2001) - (21 Jan - 27 Jan 2001)
• #### The Berry-Keating Operator on a Lattice ﻿

[OWP-2016-23] (Mathematisches Forschungsinstitut Oberwolfach, 2016-11-17)
We construct and study a version of the Berry-Keating operator with a built-in truncation of the phase space, which we choose to be a two-dimensional torus. The operator is a Weyl quantisation of the classical Hamiltonian ...
• #### Billiards and flat surfaces ﻿

[SNAP-2015-001-EN] (Mathematisches Forschungsinstitut Oberwolfach, 2015)
[also available in German] Billiards, the study of a ball bouncing around on a table, is a rich area of current mathematical research. We discuss questions and results on billiards, and on the related topic of flat surfaces.
• #### 1119 - Billiards, Flat Surfaces, and Dynamics on Moduli Spaces ﻿

[OWR-2011-25] (2011) - (08 May - 14 May 2011)
This workshop brought together people working on the dynamics of various flows on moduli spaces, in particular the action of SL$_2(\mathbb R)$ on flat surfaces. The new results presented covered properties of interval ...
• #### Boundary Representations of Operator Spaces, and Compact Rectangular Matrix Convex Sets ﻿

[OWP-2016-24] (Mathematisches Forschungsinstitut Oberwolfach, 2016-12-13)
We initiate the study of matrix convexity for operator spaces. We define the notion of compact rectangular matrix convex set, and prove the natural analogs of the Krein-Milman and the bipolar theorems in this context. We ...
• #### Braid equivalences and the L-moves ﻿

[OWP-2011-20] (Mathematisches Forschungsinstitut Oberwolfach, 2011-05-19)
In this survey paper we present the L-moves between braids and how they can adapt and serve for establishing and proving braid equivalence theorems for various diagrammatic settings, such as for classical knots, for knots ...
• #### Braidoids ﻿

[OWP-2020-17] (Mathematisches Forschungsinstitut Oberwolfach, 2020-09-03)
Braidoids generalize the classical braids and form a counterpart theory to the theory of planar knotoids, just as the theory of braids does for the theory of knots. In this paper, we introduce the notion of braidoids in ...
• #### 0328 - Branching Processes ﻿

[TB-2003-30] (2003) - (06 Jul - 12 Jul 2003)
• #### Bredon Cohomology and Robot Motion Planning ﻿

[OWP-2017-34] (Mathematisches Forschungsinstitut Oberwolfach, 2017-11-29)
In this paper we study the topological invariant ${\sf {TC}}(X)$ reflecting the complexity of algorithms for autonomous robot motion. Here, $X$ stands for the configuration space of a system and ${\sf {TC}}(X)$ is, roughly, ...
• #### 0420 - Buildings and Curvature ﻿

[OWR-2004-23] (2004) - (09 May - 15 May 2004)
• #### 0804 - Buildings: Interactions with Algebra and Geometry ﻿

[OWR-2008-3] (2008) - (20 Jan - 26 Jan 2008)