On the auto Igusa-zeta function of an algebraic curve

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• 作者：Andrew R. Stout ^{astout@bmcc.cuny.edu" class="auth_mail" title="E-mail the corresponding author}
• 关键词：Computational algebraic geometry ; Jet schemes ; Hilbert schemes ; Igusa-zeta functions ; Motivic integration ; Formal schemes ; Grothendieck topologies ; Sieves
• 刊名：Journal of Symbolic Computation
• 出版年：2017
• 出版时间：March-April 2017
• 年：2017
• 卷：79
• 期：part_P1
• 页码：156-185
• 全文大小：575 K

文摘

We study endomorphisms of complete Noetherian local rings in the context of motivic integration. Using the notion of an auto-arc space, we introduce the (reduced) auto-Igusa zeta series at a point, which appears to measure the degree to which a variety is not smooth that point. We conjecture a closed formula in the case of curves with one singular point, and we provide explicit formulas for this series in the case of the cusp and the node. Using the work of Denef and Loeser, one can show that this series will often be rational. These ideas were obtained through extensive calculations in Sage. Thus, we include a Sage script which was used in these calculations. It computes the affine arc spaces ∇_nX${\mathrm{\nabla }}_{\mathfrak{n}}X$ provided that X   is affine, n$\mathfrak{n}$ is a fat point, and the ground field is of characteristic zero. Finally, we show that the auto Poincaré series will often be rational as well and connect this to questions concerning new types of motivic integrals.