Spherical Fibonacci Points: Hyperuniformity, and more

Description

Invited short talk in Point configurations on curves and surfaces and related energy problems (Minisymposium 10 organised by Doug Hardin and Alex Vlasiuk)

Abstract: One way of explicitly constructing point sets on the unit sphere in $\mathbb{R}^3$ is to map a suitable set in the unit square to the sphere by means of an area-preserving Lambert transformation.

Using the example of the Fibonacci lattice in the unit square, we study properties of its spherical analogue.

In particular, we consider hyperuniformity aspects.

Joint work with Josef Dick (UNSW) and Yuan Xu (University of Oregon).

Period	22 Jun 2022
Event title	10th International Conference on Curves and Surfaces: CS 2022
Event type	Conference
Location	Arcachon, FranceShow on map
Degree of Recognition	International