Semistable reduction theorem

Template:Short description In algebraic geometry, semistable reduction theorems state that, given a proper flat morphism ${\displaystyle X\to S}$, there exists a morphism ${\displaystyle S^{\prime }\to S}$ (called base change) such that ${\displaystyle X{\times }_S{S}^{\prime }\to S^{\prime }}$ is semistable (i.e., the singularities are mild in some sense). Precise formulations depend on the specific versions of the theorem. For example, if ${\displaystyle S}$ is the unit disk in ${\displaystyle ℂ}$, then "semistable" means that the special fiber is a divisor with normal crossings.^[1]

The fundamental semistable reduction theorem for Abelian varieties by Grothendieck shows that if ${\displaystyle A}$ is an Abelian variety over the fraction field ${\displaystyle K}$ of a discrete valuation ring ${\displaystyle 𝒪}$, then there is a finite field extension ${\displaystyle L/K}$ such that ${\displaystyle A_{(L)}=A{\otimes }_{K}L}$ has semistable reduction over the integral closure ${\displaystyle {𝒪}_L}$ of ${\displaystyle 𝒪}$ in ${\displaystyle L}$. Semistability here means more precisely that if ${\displaystyle {𝒜}_L}$ is the Néron model of ${\displaystyle A_{(L)}}$ over ${\displaystyle {𝒪}_L,}$ then the fibres ${\displaystyle {𝒜}_{L,s}}$ of ${\displaystyle {𝒜}_L}$ over the closed points ${\displaystyle s\in S=\mathrm{S}\mathrm{p}\mathrm{e}\mathrm{c}({𝒪}_L)}$ (which are always a smooth algebraic groups) are extensions of Abelian varieties by tori.^[2] Here ${\displaystyle S}$ is the algebro-geometric analogue of "small" disc around the ${\displaystyle s\in S}$, and the condition of the theorem states essentially that ${\displaystyle A}$ can be thought of as a smooth family of Abelian varieties away from ${\displaystyle s}$; the conclusion then shows that after base change this "family" extends to the ${\displaystyle s}$ so that also the fibres over the ${\displaystyle s}$ are close to being Abelian varieties.

The important semistable reduction theorem for algebraic curves was first proved by Deligne and Mumford.^[3] The proof proceeds by showing that the curve has semistable reduction if and only if its Jacobian variety (which is an Abelian variety) has semistable reduction; one then applies the theorem for Abelian varieties above.

Template:Reflist

• Template:Cite journal
• Template:Cite book
• Template:Citation
• Template:Cite book

• Template:Cite web

Template:Algebraic-geometry-stub