Browsing by Title
Now showing items 372391 of 2026

Conformal Differential Geometry
[OWS40] (Birkhäuser Basel, 2010)Conformal invariants (conformally invariant tensors, conformally covariant differential operators, conformal holonomy groups etc.) are of central significance in differential geometry and physics. Wellknown examples of ... 
Congruences Associated with Families of Nilpotent Subgroups and a Theorem of Hirsch
[OWP201916] (Mathematisches Forschungsinstitut Oberwolfach, 20190527)Our main result associates a family of congruences with each suitable system of nilpotent subgroups of a finite group. Using this result, we complete and correct the proof of a theorem of Hirsch concerning the class number ... 
2215b  Conic Linear Optimization for ComputerAssisted Proofs
[OWR202220] (2022)  (10 Apr  16 Apr 2022)From a mathematical perspective, optimization is the science of proving inequalities. In this sense, computational optimization is a method for computerassisted proofs. Conic (linear) optimization is ... 
A construction of hyperbolic Coxeter groups
[OWP201004] (Mathematisches Forschungsinstitut Oberwolfach, 2010)We give a simple construction of Gromov hyperbolic Coxeter groups of arbitrarily large virtual cohomological dimension. Our construction provides new examples of such groups. Using this one can construct e.g. new groups ... 
The contact polytope of the leech lattice
[OWP200918] (Mathematisches Forschungsinstitut Oberwolfach, 20090312)The contact polytope of a lattice is the convex hull of its shortest vectors. In this paper we classify the facets of the contact polytope of the Leech lattice up to symmetry. There are 1, 197, 362, 269, 604, 214, 277, 200 ... 
1912  Contemporary Coding Theory
[OWR201913] (2019)  (17 Mar  23 Mar 2019)Coding Theory naturally lies at the intersection of a large number of disciplines in pure and applied mathematics. A multitude of methods and means has been designed to construct, analyze, and decode the resulting ... 
Contractive Idempotents on Locally Compact Quantum Groups
[OWP201219] (Mathematisches Forschungsinstitut Oberwolfach, 2012)A general form of contractive idempotent functionals on coamenable locally compact quantum groups is obtained, generalising the result of Greenleaf on contractive measures on locally compact groups. The image of a convolution ... 
2345  Control Methods in Hyperbolic Partial Differential Equations
[OWR202352] (2023)  (05 Nov  10 Nov 2023)Control of hyperbolic partial differential equations (PDEs) is a truly interdisciplinary area of research in applied mathematics nurtured by challenging problems arising in most modern applications ranging from road traffic, ... 
Control of Volterra systems with scalar kernels
[OWP200916] (Mathematisches Forschungsinstitut Oberwolfach, 20090310)Volterra observations systems with scalar kernels are studied. New sufficient conditions for admissibility of observation operators are developed and some examples are discussed. 
1509  Control Theory: A Mathematical Perspective on CyberPhysical Systems
[OWR201512] (2015)  (22 Feb  28 Feb 2015)Control theory is an interdisciplinary field that is located at the crossroads of pure and applied mathematics with systems engineering and the sciences. Recently the control field is facing new challenges motivated by ... 
1209  Control Theory: Mathematical Perspectives on Complex Networked Systems
[OWR201212] (2012)  (26 Feb  03 Mar 2012)Control theory is an interdisciplinary field that is located at the crossroads of pure and applied mathematics with systems engineering and the sciences. Its range of applicability and its techniques evolve rapidly with ... 
0909  Control Theory: On the Way to New Application Fields
[OWR200911] (2009)  (22 Feb  28 Feb 2009)Control theory is an interdisciplinary ﬁeld that is located at the crossroads of pure and applied mathematics with systems engineering and the sciences. Recently, deep interactions are emerging with new application areas, ... 
0037  Controlling Complexity for Strong Stochastic Dependencies
[TB200037] (2000)  (10 Sep  16 Sep 2000) 
Convergence and Error Analysis of Compressible Fluid Flows with Random Data: Monte Carlo Method
[OWP202215] (Mathematisches Forschungsinstitut Oberwolfach, 20220825)The goal of this paper is to study convergence and error estimates of the Monte Carlo method for the NavierStokes equations with random data. To discretize in space and time, the Monte Carlo method is combined with a ... 
0605  Convex and Algebraic Geometry
[OWR20065] (2006)  (29 Jan  04 Feb 2006)The subjects of convex and algebraic geometry meet primarily in the theory of toric varieties. Toric geometry is the part of algebraic geometry where all maps are given by monomials in suitable coordinates, and all equations ... 
0949  Convex Geometry and its Applications
[OWR200953] (2009)  (29 Nov  05 Dec 2009)The geometry of convex domains in Euclidean space plays a central role in several branches of mathematics: functional and harmonic analysis, the theory of PDE, linear programming and, increasingly, in the study of other ... 
1850  Convex Geometry and its Applications
[OWR201854] (2018)  (09 Dec  15 Dec 2018)The geometry of convex domains in Euclidean space plays a central role in several branches of mathematics: functional and harmonic analysis, the theory of PDE, linear programming and, increasingly, in the study of algorithms ... 
1250  Convex Geometry and its Applications
[OWR201259] (2012)  (09 Dec  15 Dec 2012)The geometry of convex domains in Euclidean space plays a central role in several branches of mathematics: functional and harmonic analysis, the theory of PDE, linear programming and, increasingly, in the study of other ... 
1550  Convex Geometry and its Applications
[OWR201556] (2015)  (06 Dec  12 Dec 2015)The past 30 years have not only seen substantial progress and lively activity in various areas within convex geometry, e.g., in asymptotic geometric analysis, valuation theory, the $L_p$BrunnMinkowski theory and stochastic ... 
2150  Convex Geometry and its Applications (hybrid meeting)
[OWR202159] (2021)  (12 Dec  18 Dec 2021)The geometry of convex domains in Euclidean space plays a central role in several branches of mathematics: functional and harmonic analysis, the theory of PDE, linear programming and, increasingly, in the study of ...