Robert Berger
Robert Berger is an American mathematician recognized for his groundbreaking work in the field of aperiodic tiling. In 1964, he presented a collection of over 20,000 shapes that could only create non-periodic tessellations, which sparked significant interest and research in this area. His contributions have been fundamental to the understanding of how certain shapes can tile a plane without repeating patterns.
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Countries Mentioned
| Country | Mentions | Sentiment | Dominance | + Persistence | x Population | = Reach | x GDP (millions) | = Power |
|---|---|---|---|---|---|---|---|---|
| Spain | 1 | 8.00 | 0.04% | +0% | 46,754,778 | 16,716 | $1,400,000 | 501$ |
| Totals | 1 | 46,754,778 | 16,716 | $1,400,000 | 501$ |
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Each country's color is based on "Mentions" from the table above.
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Spain:
Robert Berger provided a collection of pieces that only allows for non-periodic tessellations.
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