An imaginary-order pseudogonal tiling is a noncompact hyperbolic tiling related to the infinite-order apeirogonal tiling, but its faces and vertex figures are pseudogons, which are special kinds of apeirogon that tile hypercycles in a hyperbolic plane.
See Also[]
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Pseudogonal hosohedron
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Imaginary-order triangular tiling
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Imaginary-order square tiling
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Imaginary-order pentagonal tiling
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Imaginary-order hexagonal tiling
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Imaginary-order heptagonal tiling
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Imaginary-order octagonal tiling
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Imaginary-order apeirogonal tiling
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Imaginary-order pseudogonal tiling
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Pseudogonal dihedron
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Order-3 pseudogonal tiling
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Order-4 pseudogonal tiling
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Order-5 pseudogonal tiling
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Order-6 pseudogonal tiling
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Order-7 pseudogonal tiling
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Order-8 pseudogonal tiling
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Infinite-order pseudogonal tiling
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Imaginary-order pseudogonal tiling
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