# Mathematics Research Institute

## Singularities with respect to Mather-Jacobian discrepancies.

### Prof. Shihoko Ishii (University of Tokyo)

Fecha: 29/01/2015 12:30
Lugar: Seminario A125 de la Facultad de Ciencias
Grupo: ECSING

Abstract:
In order to study the singularities of a variety X, we take a resolution Y--> X and compare the difference between corresponding items on each variety. One item usually used is the canonical divisor. The Usual discrepancy" is the difference between the canonical divisor on a resolution Y and the canonical divisor of X. This discrepancy is defined only on a normal Q-Gorenstein variety X. This discrepancy plays important roles in birational geometry. But it has a limited compatibility with the discussion of arc spaces. In the talk I propose another discrepancy, Mather-Jacobian discrepancy", which measures the difference between the canonical divisor on a resolution Y and Omega_X^d plus Jacobian ideal of X. This discrepancy has better properties than the usual discrepancy in the view point of arc spaces. I will show some basic properties which will be useful to study singularities, even non-normal or non Q-Gorenstein singularities. ___________________________________________________