Article révisé par les pairs
Résumé : | An edge-to-edge tiling of the Euclidian plane by equilateral triangles, squares and regular hexagons is said to be of type (t,s,h) if there are exactly t orbits of triangles, s orbits of squares and h orbits of hexagons under the symmetry group of the tiling. We prove that there exist tilings of type (t,s,h) for every t ≥ 92, s ≥ 2, h ≥ 43. We completely determine the values of t and h for which tilings of type (t,1,h) exist. © 1980 Birkhäuser Verlag. |