Invariantes de singularidades em característica positiva
Resumen
This dissertation mainly follows the works of \cite{Gr2} and \cite{Gr5}.
Considering $\mathbb{K}$ a field, algebraically closed with positive characteristic, we presented invariants of singularities in $\mathbb{K}[[\underline{x}]],$ the local $\mathbb{K}$- algebra of the formal power series, such as Milnor and Tjurina numbers.
Two equivalence relations are defined on $\mathbb{K}[[\underline{x}]]$, right equivalence and contact equivalence. The concept of finite determinancy of $f\in\mathbb{K}[[\underline{x}]]$ is defined with respect to those equivalence relations, the finite determinancy is also expressed in terms of the Milnor and Tjurina numbers.
We show that a necessary condition for $f\!\in\!\mathbb{K}[[\underline{x}]]$ to be finitely determined by the right (respectively contact) is that it has an isolated singularity (respectively is a hypersurface with isolated singularity); the necessary condition is based on a technical lemma considering $\mathbb{K}[[\underline{x}]]$ with the $\mathfrak{m}$-adic topology. Finally, considering that the orbit application, in general, is not separable in positive characteristic, it is proved that the condition is also sufficient.
Colecciones
El ítem tiene asociados los siguientes ficheros de licencia: