Symplectic spreads, planar functions and mutually unbiased bases

TL;DR

This paper provides explicit constructions of mutually unbiased bases and Lie algebra decompositions from symplectic spreads and pseudo-planar functions, revealing their automorphism groups and relations between different constructions.

Contribution

It introduces new explicit constructions of MUBs using pseudo-planar functions and explores the automorphism groups of these structures, connecting spreads, Lie algebras, and MUBs.

Findings

Explicit descriptions of MUBs from symplectic spreads

Automorphism groups of MUBs and Lie algebra decompositions are isomorphic

New constructions of MUBs using pseudo-planar functions in characteristic two

Abstract

In this paper we give explicit descriptions of complete sets of mutually unbiased bases (MUBs) and orthogonal decompositions of special Lie algebras $sl_n(\mathbb{C})$ obtained from commutative and symplectic semifields, and from some other non-semifield symplectic spreads. Relations between various constructions are also studied. We show that the automorphism group of a complete set of MUBs is isomorphic to the automorphism group of the corresponding orthogonal decomposition of the Lie algebra $sl_n(\mathbb{C})$. In the case of symplectic spreads this automorphism group is determined by the automorphism group of the spread. By using the new notion of pseudo-planar functions over fields of characteristic two we give new explicit constructions of complete sets of MUBs.