. . . . "Cohomologie de Weil"@fr . . . . . . . . . . . "Une cohomologie de Weil est une th\u00E9orie cohomologique des vari\u00E9t\u00E9s alg\u00E9briques, \u00E0 coefficients dans un corps, satisfaisant un certain jeu d'axiomes."@fr . . . . . . . "In algebraic geometry, a Weil cohomology or Weil cohomology theory is a cohomology satisfying certain axioms concerning the interplay of algebraic cycles and cohomology groups. The name is in honor of Andr\u00E9 Weil. Any Weil cohomology theory factors uniquely through the category of Chow motives, but the category of Chow motives itself is not a Weil cohomology theory, since it is not an abelian category."@en . . . . . . . . . . "\u4EE3\u6570\u5E7E\u4F55\u5B66\u306B\u304A\u3044\u3066\u3001\u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC (Weil cohomology) \u3042\u308B\u3044\u306F \u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6 (Weil cohomology theory) \u3068\u306F\u3001\u4EE3\u6570\u7684\u30B5\u30A4\u30AF\u30EB\u3068\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u7FA4\u306E\u95A2\u4FC2\u6027\u306B\u3064\u3044\u3066\u306E\u3042\u308B\u516C\u7406\u7CFB\u3092\u6E80\u305F\u3059\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u306E\u3053\u3068\u3092\u8A00\u3046\u3002\u540D\u524D\u306F\u30A2\u30F3\u30C9\u30EC\u30FB\u30F4\u30A7\u30A4\u30E6 (Andr\u00E9 Weil) \u306B\u3061\u306A\u3080\u3002\u5468\u30E2\u30C1\u30FC\u30D5\u3092\u901A\u3057\u3066\u30F4\u30A7\u30A3\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u304C\u5206\u89E3\u3059\u308B\u3068\u3044\u3046\u610F\u5473\u3067\u3001\u5468\u30E2\u30C1\u30FC\u30D5\u306E\u570F\u304C\u666E\u904D\u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6\u3067\u3042\u308B\u9650\u308A\u306F\u3001\u30F4\u30A7\u30A3\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6\u304C\u30E2\u30C1\u30FC\u30D5\u306E\u7406\u8AD6\u3067\u91CD\u8981\u306A\u5F79\u5272\u3092\u6F14\u3058\u308B\u3002\u3057\u304B\u3057\u306A\u304C\u3089\u3001\u5468\u30E2\u30C1\u30FC\u30D5\u306E\u570F\u306F\u30A2\u30FC\u30D9\u30EB\u570F\u3067\u306F\u306A\u3044\u306E\u3067\u3001\u30F4\u30A7\u30A3\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6\u3092\u3082\u305F\u3089\u3055\u306A\u3044\u3053\u3068\u306B\u3082\u6CE8\u610F\u3059\u308B\u5FC5\u8981\u304C\u3042\u308B\u3002"@ja . . . . . . "5497"^^ . . . . . "\u4EE3\u6570\u5E7E\u4F55\u5B66\u306B\u304A\u3044\u3066\u3001\u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC (Weil cohomology) \u3042\u308B\u3044\u306F \u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6 (Weil cohomology theory) \u3068\u306F\u3001\u4EE3\u6570\u7684\u30B5\u30A4\u30AF\u30EB\u3068\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u7FA4\u306E\u95A2\u4FC2\u6027\u306B\u3064\u3044\u3066\u306E\u3042\u308B\u516C\u7406\u7CFB\u3092\u6E80\u305F\u3059\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u306E\u3053\u3068\u3092\u8A00\u3046\u3002\u540D\u524D\u306F\u30A2\u30F3\u30C9\u30EC\u30FB\u30F4\u30A7\u30A4\u30E6 (Andr\u00E9 Weil) \u306B\u3061\u306A\u3080\u3002\u5468\u30E2\u30C1\u30FC\u30D5\u3092\u901A\u3057\u3066\u30F4\u30A7\u30A3\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u304C\u5206\u89E3\u3059\u308B\u3068\u3044\u3046\u610F\u5473\u3067\u3001\u5468\u30E2\u30C1\u30FC\u30D5\u306E\u570F\u304C\u666E\u904D\u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6\u3067\u3042\u308B\u9650\u308A\u306F\u3001\u30F4\u30A7\u30A3\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6\u304C\u30E2\u30C1\u30FC\u30D5\u306E\u7406\u8AD6\u3067\u91CD\u8981\u306A\u5F79\u5272\u3092\u6F14\u3058\u308B\u3002\u3057\u304B\u3057\u306A\u304C\u3089\u3001\u5468\u30E2\u30C1\u30FC\u30D5\u306E\u570F\u306F\u30A2\u30FC\u30D9\u30EB\u570F\u3067\u306F\u306A\u3044\u306E\u3067\u3001\u30F4\u30A7\u30A3\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC\u8AD6\u3092\u3082\u305F\u3089\u3055\u306A\u3044\u3053\u3068\u306B\u3082\u6CE8\u610F\u3059\u308B\u5FC5\u8981\u304C\u3042\u308B\u3002"@ja . . . . "Weil cohomology theory"@en . . . "2960213"^^ . . "Une cohomologie de Weil est une th\u00E9orie cohomologique des vari\u00E9t\u00E9s alg\u00E9briques, \u00E0 coefficients dans un corps, satisfaisant un certain jeu d'axiomes."@fr . . . . "1080821652"^^ . "In algebraic geometry, a Weil cohomology or Weil cohomology theory is a cohomology satisfying certain axioms concerning the interplay of algebraic cycles and cohomology groups. The name is in honor of Andr\u00E9 Weil. Any Weil cohomology theory factors uniquely through the category of Chow motives, but the category of Chow motives itself is not a Weil cohomology theory, since it is not an abelian category."@en . . . . . "\u30F4\u30A7\u30A4\u30E6\u30B3\u30DB\u30E2\u30ED\u30B8\u30FC"@ja . . .