Browsing by Title
Now showing items 347366 of 1870

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 ... 
Convolution in Dual Cesàro Sequence Spaces
[OWP202220] (Mathematisches Forschungsinstitut Oberwolfach, 20221216)We investigate convolution operators in the sequence spaces $d_p$, for 1 $\leqslant p<\infty$. These spaces, for $p$ > 1, arise as dual spaces of the Cesàro sequence spaces $ces_p$ thoroughly investigated by G. Bennett. A ... 
Coorbit Spaces and Dual Molecules: the QuasiBanach Case
[OWP202208] (Mathematisches Forschungsinstitut Oberwolfach, 20220527)This paper provides a selfcontained exposition of coorbit spaces associated with integrable group representations and quasiBanach function spaces. It extends the theory in [Studia Math., 180(3):237–253, 2007] to locally ... 
1744b  Copositivity and Complete Positivity
[OWR201752] (2017)  (29 Oct  04 Nov 2017)A real matrix $A$ is called copositive if $x^TAx \ge 0$ holds for all $x \in \mathbb R^n_+$. A matrix $A$ is called completely positive if it can be factorized as $A = BB^T$ , where $B$ is an entrywise nonnegative matrix. ... 
1516b  Copulae: On the Crossroads of Mathematics and Economics
[OWR201520] (2015)  (12 Apr  18 Apr 2015)The central focus of the workshop was on copula theory as well as applications to multivariate stochastic modelling. The programme was intrinsically interdisciplinary and represented areas with much recent progress. The ... 
1143a  Correlations and Interactions for Random Quantum Systems
[OWR201150] (2011)  (23 Oct  29 Oct 2011)Random quantum systems cover a broad range of mathematical models from random Schr¨odinger operators to random matrices and quantum spin models with random parameters. Their understanding requires techniques which combine ... 
Counting Curves on Toric Surfaces Tropical Geometry & the Fock Space
[OWP201718] (Mathematisches Forschungsinstitut Oberwolfach, 20170717)We study the stationary descendant Gromov–Witten theory of toric surfaces by combining and extending a range of techniques – tropical curves, floor diagrams, and Fock spaces. A correspondence theorem is established between ... 
Counting selfavoiding walks on the hexagonal lattice
[SNAP2019006EN] (Mathematisches Forschungsinstitut Oberwolfach, 20190604)In how many ways can you go for a walk along a lattice grid in such a way that you never meet your own trail? In this snapshot, we describe some combinatorial and statistical aspects of these socalled selfavoiding ... 
Coxeter Arrangements and Solomon's Descent Algebra
[OWP201103] (Mathematisches Forschungsinstitut Oberwolfach, 2011056) 
Criteria for Algebraicity of Analytic Functions
[OWP201825] (Mathematisches Forschungsinstitut Oberwolfach, 20181112)We consider functions defined on an open subset of a nonsingular, either real or complex, algebraic set. We give criteria for an analytic function to be a Nash (resp. regular, resp. polynomial) function. Our criteria depend ... 
Cryptanalysis of Publickey Cryptosystems Based on Algebraic Geometry Codes
[OWP201201] (Mathematisches Forschungsinstitut Oberwolfach, 20120320)This paper addresses the question of retrieving the triple $(\mathcal{X},\mathcal{P},\mathcal{E})$ from the algebraic geometry code $\mathcal{C}_L(\mathcal{X},\mathcal{P},\mathcal{E})$, where $\mathcal{X}$ is an algebraic ...