Browsing 5  Oberwolfach Reports (OWR) by MSC "18"
Now showing items 2140 of 40

1320c  MiniWorkshop: Localising and Tilting in Abelian and Triangulated Categories
[OWR201326] (2013)  (12 May  18 May 2013)The workshop brought together experts on localisation theory and tilting theory from different parts of mathematics with the aim of fully exploiting the power of some recent developments in so far rather independent contexts. ... 
1651a  MiniWorkshop: New Interactions between Homotopical Algebra and Quantum Field Theory
[OWR201658] (2016)  (18 Dec  23 Dec 2016)Recent developments in quantum field theory strongly call for techniques from homotopical algebra to develop the mathematical foundations of quantum gauge theories. This miniworkshop brought together experts working at ... 
0908c  MiniWorkshop: Support Varieties
[OWR200910] (2009)  (15 Feb  21 Feb 2009)The notion of support is a fundamental concept which provides a geometric approach for studying various algebraic structures. The prototype for this has been Quillen’s description of the algebraic variety corresponding to ... 
0608a  MiniWorkshop: Thick Subcategories  Classifications and Applications
[OWR20068] (2006)  (19 Feb  25 Feb 2006)Thick subcategories of triangulated categories arise in various mathematical areas, for instance in algebraic geometry, in representation theory of groups and algebras, or in stable homotopy theory. The aim of this workshop ... 
0920  Quadratic Forms and Linear Algebraic Groups
[OWR200925] (2009)  (10 May  16 May 2009)Topics discussed at the workshop Quadratic forms and linear algebraic groups included besides the algebraic theory of quadratic and Hermitian forms and their Witt groups several aspects of the theory of linear algebraic ... 
0626  Quadratic Forms and Linear Algebraic Groups
[OWR200629] (2006)  (25 Jun  01 Jul 2006)Topics discussed at the Oberwolfach workshop Quadratic Forms and Linear Algebraic Groups, held in June 2006, included besides the algebraic theory of quadratic and Hermitian forms and their Witt groups several aspects of ... 
0808  Representation Theory of Finite Dimensional Algebras
[OWR20089] (2008)  (17 Feb  23 Feb 2008) 
0506  Representation Theory of FiniteDimensional Algebras
[OWR20056] (2005)  (06 Feb  12 Feb 2005)Methods and results from the representation theory of ﬁnite dimensional algebras have led to many interactions with other areas of mathematics. The aim of this workshop was, in addition to stimulating progress in the ... 
1708  Representation Theory of Quivers and Finite Dimensional Algebras
[OWR201712] (2017)  (19 Feb  25 Feb 2017)Methods and results from the representation theory of quivers and finite dimensional algebras have led to many interactions with other areas of mathematics. Such areas include the theory of Lie algebras and quantum groups, ... 
1108  Representation Theory of Quivers and Finite Dimensional Algebras
[OWR201110] (2011)  (20 Feb  26 Feb 2011)Methods and results from the representation theory of quivers and finite dimensional algebras have led to many interactions with other areas of mathematics. Such areas include the theory of Lie algebras and quantum groups, ... 
1408  Representation Theory of Quivers and Finite Dimensional Algebras
[OWR20148] (2014)  (16 Feb  22 Feb 2014)Methods and results from the representation theory of quivers and finite dimensional algebras have led to many interactions with other areas of mathematics. Such areas include the theory of Lie algebras and quantum groups, ... 
2004  Representation Theory of Quivers and Finite Dimensional Algebras
[OWR20203] (2020)  (19 Jan  25 Jan 2020)Methods and results from the representation theory of quivers and finite dimensional algebras have led to many interactions with other areas of mathematics. Such areas include the theory of Lie algebras and quantum ... 
2307  Representation Theory of Quivers and FiniteDimensional Algebras
[OWR20237] (2023)  (12 Feb  18 Feb 2023)This workshop was about the representation theory of quivers and finitedimensional (associative) algebras, and links to other areas of mathematics, including other areas of representation theory, homological algebra, ... 
2306  Resolutions in Local Algebra and Singularity Theory
[OWR20236] (2023)  (05 Feb  11 Feb 2023)Commutative algebra is a vast subject, with connections to many different areas of mathematics, and beyond. The focus of this workshop was on three areas, all concerned with resolutions in various forms. One is the ... 
1944  Subfactors and Applications
[OWR201949] (2019)  (27 Oct  02 Nov 2019)The theory of subfactors connects diverse topics in mathematics and mathematical physics such as tensor categories, vertex operator algebras, quantum groups, quantum topology, free probability, quantum field theory, ... 
1513  Subfactors and Conformal Field Theory
[OWR201516] (2015)  (22 Mar  28 Mar 2015)Connections between subfactor theory and conformal field theory have been expected since the early days of the former in 1980’s, and recently we see more and more evidence for deeper relations. It was our aim to attract ... 
2338a  TensorTriangular Geometry and Interactions
[OWR202340] (2023)  (17 Sep  22 Sep 2023)The workshop brought together experts in a rapidly growing field of tensor triangular geometry highlighting applications to and techniques coming from homotopy theory, algebraic geometry, modular representation theory, ... 
1438  Topologie
[OWR201442] (2014)  (14 Sep  20 Sep 2014)The Oberwolfach conference “Topologie” is one of only a few opportunities for researchers from many different areas in algebraic and geometric topology to meet and exchange ideas. The program covered new developments in ... 
1629  Topologie
[OWR201635] (2016)  (17 Jul  23 Jul 2016)The Oberwolfach conference “Topologie” is one of only a few opportunities for researchers from many different areas in algebraic and geometric topology to meet and exchange ideas. This year we emphasized two topics of ... 
1803  Topology of Arrangements and Representation Stability
[OWR20182] (2018)  (14 Jan  20 Jan 2018)The workshop “Topology of arrangements and representation stability” brought together two directions of research: the topology and geometry of hyperplane, toric and elliptic arrangements, and the homological and representation ...