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Quadratic Zero-Difference Balanced Functions, APN Functions and Strongly Regular Graphs

Information Theory 2014-11-03 v2 Combinatorics math.IT

Abstract

Let FF be a function from Fpn\mathbb{F}_{p^n} to itself and δ\delta a positive integer. FF is called zero-difference δ\delta-balanced if the equation F(x+a)F(x)=0F(x+a)-F(x)=0 has exactly δ\delta solutions for all non-zero aFpna\in\mathbb{F}_{p^n}. As a particular case, all known quadratic planar functions are zero-difference 1-balanced; and some quadratic APN functions over F2n\mathbb{F}_{2^n} are zero-difference 2-balanced. In this paper, we study the relationship between this notion and differential uniformity; we show that all quadratic zero-difference δ\delta-balanced functions are differentially δ\delta-uniform and we investigate in particular such functions with the form F=G(xd)F=G(x^d), where gcd(d,pn1)=δ+1\gcd(d,p^n-1)=\delta +1 and where the restriction of GG to the set of all non-zero (δ+1)(\delta +1)-th powers in Fpn\mathbb{F}_{p^n} is an injection. We introduce new families of zero-difference ptp^t-balanced functions. More interestingly, we show that the image set of such functions is a regular partial difference set, and hence yields strongly regular graphs; this generalizes the constructions of strongly regular graphs using planar functions by Weng et al. Using recently discovered quadratic APN functions on F28\mathbb{F}_{2^8}, we obtain 1515 new (256,85,24,30)(256, 85, 24, 30) negative Latin square type strongly regular graphs.

Keywords

Cite

@article{arxiv.1410.2903,
  title  = {Quadratic Zero-Difference Balanced Functions, APN Functions and Strongly Regular Graphs},
  author = {Claude Carlet and Guang Gong and Yin Tan},
  journal= {arXiv preprint arXiv:1410.2903},
  year   = {2014}
}
R2 v1 2026-06-22T06:19:57.489Z