. . . . . . . . . . . . . . . . . . . . . . . . "Die Quincunx-Kartenprojektion ist eine von Charles S. Peirce im Jahr 1879 ver\u00F6ffentlichte konforme Kartenprojektion (auch Stereografische Projektion), die in allen Bereichen mit Ausnahme der Ecken der inneren Hemisph\u00E4re konform, das hei\u00DFt winkeltreu ist."@de . . . . . . "Die Quincunx-Kartenprojektion ist eine von Charles S. Peirce im Jahr 1879 ver\u00F6ffentlichte konforme Kartenprojektion (auch Stereografische Projektion), die in allen Bereichen mit Ausnahme der Ecken der inneren Hemisph\u00E4re konform, das hei\u00DFt winkeltreu ist."@de . "Peirce quincuncial projection"@en . "\u30D1\u30FC\u30B9\u30FB\u30AF\u30A4\u30F3\u30AB\u30F3\u30B7\u30E3\u30EB\u56F3\u6CD5"@ja . . . "1094078737"^^ . . . "Quincunx-Kartenprojektion"@de . . . "13044"^^ . . . . . . . . . . . . . . . . . . . "January 2018"@en . . . . . . . . . . . . . . . . . . "The Peirce quincuncial projection is the conformal map projection from the sphere to an unfolded square dihedron, developed by Charles Sanders Peirce in 1879. Each octant projects onto an isosceles right triangle, and these are arranged into a square. The name quincuncial refers to this arrangement: the north pole at the center and quarters of the south pole in the corners form a quincunx pattern like the pips on the five face of a traditional die. The projection has the distinctive property that it forms a seamless square tiling of the plane, conformal except at four singular points along the equator. Typically the projection is square and oriented such that the north pole lies at the center, but an oblique aspect in a rectangle was proposed by \u00C9mile Guyou in 1887, and a transverse aspect was proposed by Oscar Adams in 1925. The projection has seen use in digital photography for portraying spherical panoramas."@en . . . . "\u30D1\u30FC\u30B9\u30FB\u30AF\u30A4\u30F3\u30AB\u30F3\u30B7\u30E3\u30EB\u56F3\u6CD5\uFF08\u30D1\u30FC\u30B9\u30FB\u30AF\u30A4\u30F3\u30AB\u30F3\u30B7\u30E3\u30EB\u305A\u307B\u3046\u3001\u82F1\u8A9E: Peirce quincuncial projection\uFF09\u3068\u306F\u3001\u5730\u56F3\u6295\u5F71\u6CD5\u306E\u4E00\u7A2E\u3067\u3001\u7403\u9762\u3092\u6B63\u65B9\u5F62\u306B\u6295\u5F71\u3059\u308B\u3001\u6709\u9650\u500B\u306E\u70B9\u3092\u9664\u304D\u6B63\u89D2\u306A\u56F3\u6CD5\u3067\u3042\u308B\u30021879\u5E74\u3001\u30A2\u30E1\u30EA\u30AB\u6CBF\u5CB8\u6E2C\u5730\u5C40\uFF08\u73FE\u5728\u306E\u30A2\u30E1\u30EA\u30AB\u6D77\u6D0B\u5927\u6C17\u5E81\u56FD\u7ACB\u6E2C\u5730\u6E2C\u91CF\u5C40\u3068\u6CBF\u5CB8\u6E2C\u91CF\u90E8\u306E\u524D\u8EAB\uFF09\u306B\u5728\u7C4D\u3057\u3066\u3044\u305F\u30C1\u30E3\u30FC\u30EB\u30BA\u30FB\u30B5\u30F3\u30C0\u30FC\u30B9\u30FB\u30D1\u30FC\u30B9\u304C\u3001en:Schwarz\u2013Christoffel mapping\u3092\u5143\u306B\u3057\u3066\u8003\u6848\u3057\u305F\u3002"@ja . . . "yes"@en . "\u30D1\u30FC\u30B9\u30FB\u30AF\u30A4\u30F3\u30AB\u30F3\u30B7\u30E3\u30EB\u56F3\u6CD5\uFF08\u30D1\u30FC\u30B9\u30FB\u30AF\u30A4\u30F3\u30AB\u30F3\u30B7\u30E3\u30EB\u305A\u307B\u3046\u3001\u82F1\u8A9E: Peirce quincuncial projection\uFF09\u3068\u306F\u3001\u5730\u56F3\u6295\u5F71\u6CD5\u306E\u4E00\u7A2E\u3067\u3001\u7403\u9762\u3092\u6B63\u65B9\u5F62\u306B\u6295\u5F71\u3059\u308B\u3001\u6709\u9650\u500B\u306E\u70B9\u3092\u9664\u304D\u6B63\u89D2\u306A\u56F3\u6CD5\u3067\u3042\u308B\u30021879\u5E74\u3001\u30A2\u30E1\u30EA\u30AB\u6CBF\u5CB8\u6E2C\u5730\u5C40\uFF08\u73FE\u5728\u306E\u30A2\u30E1\u30EA\u30AB\u6D77\u6D0B\u5927\u6C17\u5E81\u56FD\u7ACB\u6E2C\u5730\u6E2C\u91CF\u5C40\u3068\u6CBF\u5CB8\u6E2C\u91CF\u90E8\u306E\u524D\u8EAB\uFF09\u306B\u5728\u7C4D\u3057\u3066\u3044\u305F\u30C1\u30E3\u30FC\u30EB\u30BA\u30FB\u30B5\u30F3\u30C0\u30FC\u30B9\u30FB\u30D1\u30FC\u30B9\u304C\u3001en:Schwarz\u2013Christoffel mapping\u3092\u5143\u306B\u3057\u3066\u8003\u6848\u3057\u305F\u3002"@ja . . . . . . . . . "The Peirce quincuncial projection is the conformal map projection from the sphere to an unfolded square dihedron, developed by Charles Sanders Peirce in 1879. Each octant projects onto an isosceles right triangle, and these are arranged into a square. The name quincuncial refers to this arrangement: the north pole at the center and quarters of the south pole in the corners form a quincunx pattern like the pips on the five face of a traditional die. The projection has the distinctive property that it forms a seamless square tiling of the plane, conformal except at four singular points along the equator."@en . . . . . "InternetArchiveBot"@en . . . . . "7693581"^^ . . . . .