Profesor: Kai Zhang Departamento de Geometría y Topología Instituto Universitario de Matemáticas IMAG Idioma: Inglés Audiencia: Estudiantes de máster, doctorado y posgraduados Conocimientos previos: Formación equivalente a un Grado en Matemáticas Fechas Miércoles: 18 y 25 de marzo; 8, 15 y 22 de abril de 2026. Viernes: 20 y 27Continue Reading
Profesor: Kai Zhang Departamento de Geometría y Topología Instituto Universitario de Matemáticas IMAG Idioma: Inglés Audiencia: Estudiantes de máster, doctorado y posgraduados Conocimientos previos: Formación equivalente a un Grado en Matemáticas Fechas Miércoles: 18 y 25 de marzo; 8, 15 y 22 de abril de 2026. Viernes: 20 y 27Continue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Profesor: Kai Zhang Departamento de Geometría y Topología Instituto Universitario de Matemáticas IMAG Idioma: Inglés Audiencia: Estudiantes de máster, doctorado y posgraduados Conocimientos previos: Formación equivalente a un Grado en Matemáticas Fechas Miércoles: 18 y 25 de marzo; 8, 15 y 22 de abril de 2026. Viernes: 20 y 27Continue Reading
Profesor: Kai Zhang Departamento de Geometría y Topología Instituto Universitario de Matemáticas IMAG Idioma: Inglés Audiencia: Estudiantes de máster, doctorado y posgraduados Conocimientos previos: Formación equivalente a un Grado en Matemáticas Fechas Miércoles: 18 y 25 de marzo; 8, 15 y 22 de abril de 2026. Viernes: 20 y 27Continue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
Summary Translating solitons (“translators”) of the mean curvature flow (MCF) are geometric objects of central importance in the study of singularities of curvature flows. They arise naturally as blow-up limits around type-II singularities and as stationary points of a weighted area functional in Ilmanen’s conformal metric. As such, they playContinue Reading
