[[File:Order 7-3 rhombic tiling in the Band Model.png|thumb|The order 7-3 rhombic tiling shown in a portion of the '''band model'''.]] The '''band model''' is a conformal model of the hyperbolic plane. The band model employs a portion of the Euclidean plane between two parallel lines.<ref>{{cite book|url=http://matrixeditions.com/TeichmullerVol1.html|title=Teichmüller Theory and Applications to Geometry, Topology, and Dynamics|date=|publisher=Matrix Editions|last=Hubbard|first=John H.|year=2006|authorlink=John H. Hubbard|isbn=9780971576629|location=Ithaca, NY|oclc=57965863|chapter=2|chapter-url=http://matrixeditions.com/TVol1.Chap2.pdf|page=25}}</ref> Distance is preserved along one line through the middle of the band. Assuming the band is given by <math>\{z \in \mathbb C: \left|\operatorname {Im} z\right| < \pi / 2\}</math>, the metric is given by <math>|dz| \sec (\operatorname{Im} z)</math>. [[File:Geodesics in the Band Model.png|thumb|Geodesics shown in a portion of the '''band model'''.]] Geodesics include the line along the middle of the band, and any open line segment perpendicular to boundaries of the band connecting the sides of the band. Every end of a geodesic either meets a boundary of the band at a right angle or is asymptotic to the midline; the midline itself is the only geodesic that does not meet a boundary.<ref>{{Cite web|url=https://pi.math.cornell.edu/~bowman/metrics.pdf|title=612 CLASS LECTURE: HYPERBOLIC GEOMETRY|last=Bowman|first=Joshua|date=|website=|archive-url=|archive-date=|access-date=August 12, 2018}}</ref> Lines parallel to the boundaries of the band within the band are hypercycles whose common axis is the line through the middle of the band.
==See also== * Mercator projection
==References== <!-- Inline citations added to your article will automatically display here. See https://en.wikipedia.org/wiki/WP:REFB for instructions on how to add citations. --> {{reflist}}
==External links== * [http://www.roguetemple.com/z/hyper/models.php Models of hyperbolic geometry] * [http://bulatov.org/math/1001/ Conformal Models of the Hyperbolic Geometry]
Category:Conformal geometry Category:Hyperbolic geometry
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