Ultrametric properties for valuation spaces of normal surface singularities

TL;DR

This paper characterizes arborescent normal surface singularities through ultrametric properties of a valuation-based function and extends these results to broader semivaluation spaces, revealing deep links between topology and metric properties.

Contribution

It proves that the ultrametric property of the valuation function characterizes arborescent singularities and extends this to semivaluations, providing a new topological-metric perspective.

Findings

Ultrametricity of $u_L$ characterizes arborescent singularities.

Existence of large sets of branches where $u_L$ remains an ultrametric.

Tree structures are described via dual graphs of resolutions.

Abstract

Let $L$ be a fixed branch -- that is, an irreducible germ of curve -- on a normal surface singularity $X$. If $A,B$ are two other branches, define $u_L(A,B) := \dfrac{(L \cdot A) \: (L \cdot B)}{A \cdot B}$, where $A \cdot B$ denotes the intersection number of $A$ and $B$. Call $X$ arborescent if all the dual graphs of its resolutions are trees. In a previous paper, the first three authors extended a 1985 theorem of P{\l}oski by proving that whenever $X$ is arborescent, the function $u_L$ is an ultrametric on the set of branches on $X$ different from $L$. In the present paper we prove that, conversely, if $u_L$ is an ultrametric, then $X$ is arborescent. We also show that for any normal surface singularity, one may find arbitrarily large sets of branches on $X$, characterized uniquely in terms of the topology of the resolutions of their sum, in restriction to which $u_L$ is still an ultrametric. Moreover, we describe the associated tree in terms of the dual graphs of such resolutions. Then we extend our setting by allowing $L$ to be an arbitrary semivaluation on $X$ and by defining $u_L$ on a suitable space of semivaluations. We prove that any such function is again an ultrametric if and only if $X$ is arborescent, and without any restriction on $X$ we exhibit special subspaces of the space of semivaluations in restriction to which $u_L$ is still an ultrametric.