Geometric properties of SIC-POVM tensor square

TL;DR

This paper explores the geometric structure of SIC-POVMs, showing that for Weyl-Heisenberg type SICs, their tensor square frames can be derived from specific basis projections, aiding SIC search and construction.

Contribution

It demonstrates that WH-type SIC tensor squares are projections of WH-type bases, provides a full description of these bases, and offers a geometric construction of related fusion frames.

Findings

Tensor squares of WH-type SICs are projections of WH-type bases.

A particular basis element closely resembles SIC solutions.

Constructed SIC-related symmetric tight fusion frames in odd dimensions.

Abstract

It's known that if $d^2$ vectors from $d$-dimensional Hilbert space $H$ form a SIC-POVM (SIC for short) then tensor square of those vectors form an equiangular tight frame on the symmetric subspace of $H\otimes H$. We prove that for any SIC of WH-type (Weyl-Heisenberg group covariant) this squared frame can be obtained as a projection of WH-type basis of $H\otimes H$ onto the symmetric subspace. We give a full description of the set of all WH-type bases, so this set could be used as a search space for SIC solutions. Also we show that a particular element of this set is close to a SIC solution in some structural sense. Finally we give a geometric construction of a SIC-related symmetric tight fusion frames that were discovered in odd dimensions.