Add to ORKGThe Poincaré conjecture is a topological problem established in 1904 by the French mathematician Henri Poincaré. It characterises three-dimensional spheres in a very simple way. It uses only the first invariant of algebraic topology ? the fundamental group ? which was also defined and studied by Poincaré. The conjecture implies that if a space does not have essential holes, then it is a sphere. This problem was directly solved between 2002 and 2003 by Grigori Perelman, and as a consequence of his demonstration of the Thurston geometrisation conjecture, which culminated in the path pro-posed by Richard Hamilton
Grigory Perelman has been awarded the Fields Medal for his contributions to geometry and his revolut...
Henri Poincaré (1854-1912) was one of the greatest scientists of his time, perhaps the last one to h...
The Hodge conjecture is one of the seven millennium problems, and is framed within differential geom...
The Poincaré conjecture is a topological problem established in 1904 by the French mathematician Hen...
Abstract. We give an overview of the development on work on Poincaré’s con-jecture in the first half...
Abstract. We give an overview of the development on work on Poincaré’s con-jecture in the first half...
The Poincare conjecture was one of the most fundamental unsolved problems in mathematics for close t...
En éste trabajo se presentan brevemente algunas propiedades geométricas basic del flujo de Ricci usa...
I will now embark on explaining as best as I can to the non-mathematician what the Poincaré conjectu...
The Poincare conjecture was one of the most fundamental unsolved problems in mathematics for close t...
This work tries to understand the Poincaré conjecture statement and some of the tools that were used...
The eld of Topology was born out of the realisation that in some fundamental sense, a sphere and an ...
This work tries to understand the Poincaré conjecture statement and some of the tools that were used...
RESUMEN: La conjetura de Poincaré es un problema topológico establecido en 1904 por el matemático fr...
Abstract. In 1982, Hamilton [41] introduced the Ricci flow to study compact three-manifolds with pos...
Grigory Perelman has been awarded the Fields Medal for his contributions to geometry and his revolut...
Henri Poincaré (1854-1912) was one of the greatest scientists of his time, perhaps the last one to h...
The Hodge conjecture is one of the seven millennium problems, and is framed within differential geom...
The Poincaré conjecture is a topological problem established in 1904 by the French mathematician Hen...
Abstract. We give an overview of the development on work on Poincaré’s con-jecture in the first half...
Abstract. We give an overview of the development on work on Poincaré’s con-jecture in the first half...
The Poincare conjecture was one of the most fundamental unsolved problems in mathematics for close t...
En éste trabajo se presentan brevemente algunas propiedades geométricas basic del flujo de Ricci usa...
I will now embark on explaining as best as I can to the non-mathematician what the Poincaré conjectu...
The Poincare conjecture was one of the most fundamental unsolved problems in mathematics for close t...
This work tries to understand the Poincaré conjecture statement and some of the tools that were used...
The eld of Topology was born out of the realisation that in some fundamental sense, a sphere and an ...
This work tries to understand the Poincaré conjecture statement and some of the tools that were used...
RESUMEN: La conjetura de Poincaré es un problema topológico establecido en 1904 por el matemático fr...
Abstract. In 1982, Hamilton [41] introduced the Ricci flow to study compact three-manifolds with pos...
Grigory Perelman has been awarded the Fields Medal for his contributions to geometry and his revolut...
Henri Poincaré (1854-1912) was one of the greatest scientists of his time, perhaps the last one to h...
The Hodge conjecture is one of the seven millennium problems, and is framed within differential geom...