Abstract
We describe curious properties of a tiling of "flank" triangles and regular hexagons including (i) a common isodynamic point over all flanks, (ii) conservations among sextets of flanks around a fixed regular hexagon, (iii) the ability to build an infinite grid or tiling, and (iv) families of confocal parabolas woven into the tiling, whose (v) three distinct foci are the vertices of an equilateral.
Abstract (translated)
URL
https://arxiv.org/abs/2112.02157