Multiplicity structure of the arc space of a fat point

IF 0.9 1区数学 Q2 MATHEMATICS

Algebra & Number Theory Pub Date : 2024-04-16 DOI:10.2140/ant.2024.18.947

Rida Ait El Manssour, Gleb Pogudin

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引用次数: 0

Abstract

The equation $x^{m} = 0$ defines a fat point on a line. The algebra of regular functions on the arc space of this scheme is the quotient of $k [x, x^{'}, x^{(2)}, \dots]$ by all differential consequences of $x^{m} = 0$ . This infinite-dimensional algebra admits a natural filtration by finite-dimensional algebras corresponding to the truncations of arcs. We show that the generating series for their dimensions equals $m ∕ (1 - m t)$ . We also determine the lexicographic initial ideal of the defining ideal of the arc space. These results are motivated by the nonreduced version of the geometric motivic Poincaré series, multiplicities in differential algebra, and connections between arc spaces and the Rogers–Ramanujan identities. We also prove a recent conjecture put forth by Afsharijoo in the latter context.

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胖点弧空间的多重性结构

方程 xm= 0 定义了直线上的一个胖点。这个方案的弧空间上的正则函数代数是 xm= 0 的所有微分结果对 k[x,x′,x(2),... ]的商。我们证明了它们维数的生成数列等于 m∕(1-mt)。我们还确定了弧空间定义理想的词典初始理想。这些结果是由几何动机波恩卡列数列的非还原版本、微分代数中的乘法，以及弧空间与罗杰斯-拉曼努扬（Rogers-Ramanujan）等式之间的联系激发的。我们还证明了阿夫沙里朱最近在后一种情况下提出的一个猜想。

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来源期刊

Algebra & Number Theory MATHEMATICS-

CiteScore

1.80

自引率

7.70%

发文量

审稿时长

6-12 weeks

期刊介绍： ANT’s inclusive definition of algebra and number theory allows it to print research covering a wide range of subtopics, including algebraic and arithmetic geometry. ANT publishes high-quality articles of interest to a broad readership, at a level surpassing all but the top four or five mathematics journals. It exists in both print and electronic forms. The policies of ANT are set by the editorial board — a group of working mathematicians — rather than by a profit-oriented company, so they will remain friendly to mathematicians'' interests. In particular, they will promote broad dissemination, easy electronic access, and permissive use of content to the greatest extent compatible with survival of the journal. All electronic content becomes free and open access 5 years after publication.