Structural Geometric Topology II by Albert P. Carpenter

Home » Uncategorized » New Work. Geometric Topology is defined as the study of topological structures such as knots, links, tori/handlebodies and Mobial structures with geometric composition as for example polyhedra, polygons, lines and points.

New Work. Geometric Topology is defined as the study of topological structures such as knots, links, tori/handlebodies and Mobial structures with geometric composition as for example polyhedra, polygons, lines and points.

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Mobial Surface

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Kleinian Surface #1

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Kleinian Surface #2

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Polygonal Handlebody and Polygonal Knot

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Polygonal Handlebody and Polygonal Knot

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Icosahedral Handlebody

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Dodecahedral Stewart Toroid

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Hexagonal Prismic Mobial Structure

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Klein Cube

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Polyhedral Handlebody

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Annulus

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Sieve

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Pentafoil Sieve and Pentafoil Knot #3

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Mobius strip #3dsc00733

Mobius strip #4

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Mobius strip #5

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Mobius strip #6dsc00747

Tetrafoil Sieve and Knot #1

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Tetrafoil Sieve and Knot #2

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Tetrafoil Sieve and Knot #3

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Sieve and Partial Linked Tessellation

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Sieve and Braid

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Partial Knotted Tessellation #1

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Partial Knotted Tessellation #2

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Two Sieves and two Hexafoil Knots (Colored)

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Link

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Sieve and Pentafoil Knot (midpoint)

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Sieve and Pentafoil Knot (vertices)

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Sieve and Knot

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Never Ending Sieve and Never Ending Knot

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Brunnian Link

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Decaknot

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Chiral Crescent Sieves 60(5) x 2

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Monocyclic Annulus – 8(8);8(5)

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