Robert Ammann
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Robert Ammann (October 1, 1946 - May, 1994) was an amateur mathematician who made several significant and groundbreaking contributions to the theory of quasicrystals and aperiodic tilings.
Ammann attended Brandeis University, but generally did not go to classes, and left after three years. He worked as a programmer for Honeywell. After ten years, his position was eliminated as part of a routine cutback, and Ammann ended up working as a mail sorter for the post office.
In 1975, Ammann read an announcement by Martin Gardner of new work by Roger Penrose. Penrose had discovered two simple sets of aperiodic tiles, each consisting of just two quadrilaterals. Since Penrose was taking out a patent, he wasn't ready to publish them, and Gardner's description was rather vague. Ammann wrote a letter to Gardner, describing his own work, which duplicated one of Penrose's sets, plus a foursome of "golden rhombohedra" that formed aperiodic tilings in space.
More letters followed, and Ammann became a correspondent with many of the professional researchers. He discovered several new aperiodic tilings, including the first simple examples that did not involve the golden ratio. He also showed how to generate tilings using lines in the plane as guides for lines marked on the tiles, now called "Ammann bars".
The discovery of quasicrystals in 1982 elevated the status of aperiodic tilings, and Ammann's work, from mere recreational mathematics to an important application. Explanation needed for understanding of what specific applications quasicrystals can be applied to.
After more than ten years of coaxing, he agreed to meet various professionals in person, and eventually even went to two conferences and delivered a lecture at each. Afterwards, Ammann dropped out of sight, and died of a heart attack a few years later. News of his death did not reach the research community for a few more years.
Ammann invented pentagonal and octogonal tilings but his achievement came to notice only after Penrose had published his own discovery and gained priority. In 1981 de Bruijn exposed the cut and project method and in 1984 came the sensational news about Shechtman quasicrystal which promoted the Penrose tiling to fame. But in 1982 Beenker published a similar mathematical explanation for the octogonal case [1] which became known as the Ammann-Beenker tiling. In 1987 Wang, Chen and Kuo anounced the discovery of a quasicrystal with octogonal symmetry [2].The decagonal covering of the Penrose tiling was proposed in 1996 and two years later F. Gahler proposed an octogonal variant for the Ammann-Beenker tiling[3] Ammann's name became that of the perennial second. It is acknowledged however that Robert Ammann first proposed the construction of rhombic prisms which is the three-dimensional model of Shechtman's quasicrystals.
[edit] References and Notes
- ^ Beenker FPM, Algebric theory of non periodic tilings of the plane by two simple building blocks: a square and a rhombus, TH Report 82-WSK-04 (1982), Technische Hogeschool, Eindhoven
- ^ Wang N., Chen H. and Kuo K., Phys Rev Lett. 59(1987) 1010
- ^ S. Ben Abraham and F. Gahler, Phys. Rev. B60(1999)860
- Senechal, Marjorie, "The Mysterious Mr. Ammann", The Mathematical Intelligencer, 26:4 (2004).
- Amman tilings and references at the Tilings encyclopedia