Mather Discrepancy as an Embedding Dimension in the Space of Arcs

Let $X$ be a variety over a field $k$ and let $X_\infty$ be its space of arcs. We study the complete local ring $\widehat{A}:=\widehat{{\cal O}_{X_\infty, P_{eE}}}$, where $P_{eE}$ is the stable point defined by an integer $e \geq 1$ and a divisorial valuation $\nu_E$ on $X$. Assuming char $k =0$, w...

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Bibliographic Details
Published in	Publications of the Research Institute for Mathematical Sciences Vol. 54; no. 1; pp. 105 - 139
Main Authors	Mourtada, Hussein, Reguera, Ana
Format	Journal Article
Language	English
Published	Zuerich, Switzerland European Mathematical Society Publishing House 01.01.2018 European Mathematical Society
Subjects	Algebraic geometry Analysis Arcs (Geometry) Commutative rings and algebras Mathematics Rings (Mathematics) United States Space of arcs embedding dimension divisorial valuations Mather discrepancy space of arcs
Online Access	Get full text
ISSN	0034-5318 1663-4926
DOI	10.4171/PRIMS/54-1-4

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Summary:	Let $X$ be a variety over a field $k$ and let $X_\infty$ be its space of arcs. We study the complete local ring $\widehat{A}:=\widehat{{\cal O}_{X_\infty, P_{eE}}}$, where $P_{eE}$ is the stable point defined by an integer $e \geq 1$ and a divisorial valuation $\nu_E$ on $X$. Assuming char $k =0$, we prove that embdim $\widehat{A} = e ( \widehat{k}_E + 1)$, where $\widehat{k}_E $ is the Mather discrepancy of $X$ with respect to $\nu_E$. We also obtain that dim $\widehat{A}$ has as lower bound $e ( a_{\rm {MJ}}(E;X))$, where $ a_{\rm {MJ}}(E;X)$ is the Mather–Jacobian log-discrepancy of $X$ with respect to $\nu_E$. For $X$ normal and a complete intersection, we prove as a consequence that if $P_E$ has codimension 1 in $X_\infty$ then the discrepancy $k_E \leq 0$.
ISSN:	0034-5318 1663-4926
DOI:	10.4171/PRIMS/54-1-4