Poincaré duality in equivariant intersection theory / Poincaré duality in equivariant intersection theory

Gonzales Vilcarromero, Richard Paul

25 September 2017

We study the Poincaré duality map from equivariant Chow cohomology to equivariant Chow groups in the case of torus actions on complete, possibly singular, varieties with isolated fixed points. Our main results yield criteria for the Poincaré duality map to become an isomorphism in this setting. The methods rely on the localization theorem for equivariant Chow cohomology and the notion of algebraic rational cell. We apply our results to complete spherical varieties and their generalizations. / En este artículo estudiamos el homomorfismo de dualidad de Poincaré, el cual relaciona cohomología de Chow equivariante y grupos de Chow equivariante en aquellos casos donde un toro algebraico actúa sobre una variedad singular compacta y con puntos fijos aislados. Nuestros resultados proporcionan criterios bajo los cuales el homomorfismo de dualidadde  Poincaré es un isomorfismo. Para ello, usamos el teorema de localización en cohomología de Chow equivariante y la noción de célula algebraica racional. Aplicamos nuestros resultados a las variedades esféricas compactas y sus generalizaciones.

Chow Groups

Torus Actions

Cell Decompositions

Poincaré Duality

Spherical Varieties

14c15

14l30

14m27

55n91

Grupos de Chow

Acciones Tóricas

Descomposiciones Celulares

Dualidad de Poincaré

Variedades Esféricas

14c15

14l30

14m27

55n91

Group Actions and Divisors on Tropical Curves

Kutler, Max B.

01 May 2011

Tropical geometry is algebraic geometry over the tropical semiring, or min-plus algebra. In this thesis, I discuss the basic geometry of plane tropical curves. By introducing the notion of abstract tropical curves, I am able to pass to a more abstract metric-topological setting. In this setting, I discuss divisors on tropical curves. I begin a study of $G$-invariant divisors and divisor classes.

14T05 Tropical geometry

Other Mathematics