On the Niho type locally-APN power functions and their boomerang spectrum

TL;DR

This paper investigates a specific class of Niho type power functions over finite fields, proving their locally-APN property, determining their differential and boomerang spectra, and showing they encompass all such functions for certain parameters.

Contribution

It introduces a new family of Niho type locally-APN power functions, analyzes their spectra, and generalizes previous results on boomerang spectra for these functions.

Findings

Proves the locally-APN property for the family of functions.

Determines the differential spectrum of these functions.

Calculates the boomerang spectrum, extending recent results.

Abstract

In this article, we focus on the concept of locally-APN-ness (``APN" is the abbreviation of the well-known notion of Almost Perfect Nonlinear) introduced by Blondeau, Canteaut, and Charpin, which makes the corpus of S-boxes somehow larger regarding their differential uniformity and, therefore, possibly, more suitable candidates against the differential attack (or their variants). Specifically, given two coprime positive integers $m$ and $k$ such that $\gcd(2^m+1,2^k+1)=1$, we investigate the locally-APN-ness property of an infinite family of Niho type power functions in the form $F(x)=x^{s(2^m-1)+1}$ over the finite field ${\mathbb F}_{2^{2m}}$ for $s=(2^k+1)^{-1}$, where $(2^k+1)^{-1}$ denotes the multiplicative inverse modulo $2^m+1$. By employing finer studies of the number of solutions of certain equations over finite fields (with even characteristic) as well as some subtle manipulations of solving some equations, we prove that $F(x)$ is locally APN and determine its differential spectrum. It is worth noting that computer experiments show that this class of locally-APN power functions covers all Niho type locally-APN power functions for $2\leq m\leq10$. In addition, we also determine the boomerang spectrum of $F(x)$ by using its differential spectrum, which particularly generalizes a recent result by Yan, Zhang, and Li.