Monday, September 4th - Friday, September 8th 2006
El Escorial (Madrid, Spain)
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Prof. Hiroshi Fujita |
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| The pioneering work of prof. Hiroshi Fujita in the 1960's strongly influenced the mathematical investigation of blow-up problems for reaction-diffusion equations. After decades of intensive development, the study of blow-up problems has reached a maturity both in theory and applications. This workshop is organized in his honour. |
You can download the book of abstracts here
| Diego Córdoba | CSIC (Madrid, Spain) | Blow-up for a non-local transport equation |
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| Marek Fila | Comenius U. (Bratislava, Eslovaquia) | Blow-up on the boundary where the zero Dirichlet boundary condition is imposed |
| Miguel Ángel Herrero | U. Complutense de Madrid (Spain) | Coagulation-fragmentation problems: the trend to equilibrium |
| John King | Nottingham U. (U. Kingdom) | Formal asymptotic results for blow up and grow up |
| Juan J. López Velázquez | U. Complutense de Madrid (Spain) | Blow-up and long time asymptotics for a system of equations arising in the theory of reinforced random walks |
| Arturo de Pablo | U. Carlos III de Madrid (Spain) | Boundary flux versus reaction in blow-up problems in one dimension |
| Pavol Quittner | Comenius U. (Bratislava, Eslovaquia) | The transition from decay to blow-up in a semilinear Cauchy problem |
| Aníbal Rodríguez-Bernal | U. Complutense de Madrid (Spain) | Blow-up and ill posed problems |
| Philippe Souplet | U. de Versalles (France) | Single-point blow-up for a semilinear parabolic system |
| Luis Vega | U. del País Vasco (Spain) | Selfsimilar solutions of non-linear Schrodinger equations related to some geometric problems |
| Enzo Vitillaro | U. Perugia (Italy) | Existence and nonexistence results for wave equation with second order dynamical boundary conditions |
| Hatem Zaag | Ecole Normale Supérieure (France) | Blow-up profile and regularity of the singular curve at non characteristic points for the semilinear wave equation |
| Hiroshi Fujita | U. of Tokyo (Japan) | A Recollection of My Motivation and Strategies in Starting the Study of Blowing-up |
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| Kazuhiro Ishige | Tohoku U. (Japan) | Blow-up Set for a Semilinear Heat Equation with Large Diffusion in ${\bf R}^N$ |
| Hiroshi Matano | U. of Tokyo (Japan) | Type II blow-up in a curve-shortening equation |
| Noriko Mizoguchi | Tokyo Gakugei U. (Japan) | Blowup Rate of Type II for a Supercritical Heat Equation |
| Yuki Naito | Kobe U. (Japan) | Existence of type II blowup solutions for a semilinear heat equation with Sobolev critical nonlinearity |
| Hirozaku Ninomiya | Ryukoku U. (Japan) | Some entire solutions of the reaction-diffusion equations |
| Takasi Senba | U. of Miyazaki (Japan) | Blowup of solutions to a parabolic-elliptic system related to biology |
| Hiroki Yagisita | U. of Tokyo (Japan) | Global blow-up profiles for some singular perturbation problem |
| Eiji Yanagida | Tohoku U. (Japan) | Moving singularities of solutions to a semilinear parabolic equation |
| Carmen Cortázar | Pontificia U. Católica (Chile) | The Neumann problem for non-local difussion |
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| Jong-Shenq Guo | National Taiwan Normal U. | Blow-up Behavior for A Quasilinear Parabolic Equation with Nonlinear Boundary Condition |
| Peter Polacik | Minnesota U. (USA) | On threshold solutions of parabolic equations on $R^N$ |
ICM Satellite Conference
