\L ojasiewicz exponents of a certain analytic functions

TL;DR

This paper provides explicit estimations of the Łojasiewicz exponent for certain classes of non-isolated singularities of analytic functions, using combinatorial data from Newton boundaries, and explores their behavior in various cases.

Contribution

It introduces new explicit estimations of Łojasiewicz exponents for non-degenerate, non-convenient, and product analytic functions based on Newton boundary combinatorics.

Findings

Explicit estimations for Łojasiewicz exponents of non-degenerate functions.

Examples showing variability of exponents across moduli space.

Estimation methods for product functions and non-reduced cases.

Abstract

We consider the exponent of \L ojasiewicz inequality $\|\partial\,f(\mathbf z)\| \ge c |f(\mathbf z|^\theta$ for two classes of analytic functions and we will give an explicit estimation for $\theta$. First we consider certain non-degenerate functions which is not convenient. In \S 3.4, we give an example of a polynomial for which $\theta_0(f)$ is not constant on the moduli space and in \S 3.5, we show that the behaviors of the \L ojasiewicz exponents is not similar as the Milnor numbers by an example. In the last section (\S 4), we give also an estimation for product functions $f(\mathbf z)=f_1(\mathbf z)\cdots f_k(\mathbf z)$ associated to a family of a certain convenient non-degenerate complete intersection varieties. In either class, the singularity is not isolated. We will give explicit estimations of the \L ojasiewicz exponent $\theta_0(f)$ using combinatorial data of the Newton boundary of $f$. We generalize this estimation for non-reduced function $g=f_1^{m_1}\cdots f_k^{m_k}$.