Spherical Fibonacci Points: Hyperuniformity, and more
Johann Brauchart  1@  
1 : Graz University of Technology

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.

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