. . . . . . . . . . . . "Groupe de Witt"@fr . "( \uC774 \uBB38\uC11C\uB294 \uC774\uCC28 \uD615\uC2DD\uC758 \uB3D9\uCE58\uB958\uB85C \uAD6C\uC131\uB41C \uAC00\uD658\uD658\uC5D0 \uAD00\uD55C \uAC83\uC785\uB2C8\uB2E4. \uBE44\uD2B8 \uBCA1\uD130\uB85C \uAD6C\uC131\uB41C \uAC00\uD658\uD658\uC5D0 \uB300\uD574\uC11C\uB294 \uBE44\uD2B8 \uBCA1\uD130 \uBB38\uC11C\uB97C \uCC38\uACE0\uD558\uC2ED\uC2DC\uC624.) \uC774\uCC28 \uD615\uC2DD \uC774\uB860\uC5D0\uC11C, \uBE44\uD2B8 \uD658(Witt\u74B0, \uC601\uC5B4: Witt ring)\uC740 \uBE44\uD1F4\uD654 \uC774\uCC28 \uD615\uC2DD\uC758 \uB3D9\uCE58\uB958\uB85C \uAD6C\uC131\uB41C \uAC00\uD658\uD658\uC774\uB2E4."@ko . . . "En math\u00E9matiques, un groupe de Witt sur un corps commutatif, nomm\u00E9 d'apr\u00E8s Ernst Witt, est un groupe ab\u00E9lien dont les \u00E9l\u00E9ments sont repr\u00E9sent\u00E9s par des formes bilin\u00E9aires sym\u00E9triques sur ce corps."@fr . . . . . . . . . . . . . . . . . . . . . "( \uC774 \uBB38\uC11C\uB294 \uC774\uCC28 \uD615\uC2DD\uC758 \uB3D9\uCE58\uB958\uB85C \uAD6C\uC131\uB41C \uAC00\uD658\uD658\uC5D0 \uAD00\uD55C \uAC83\uC785\uB2C8\uB2E4. \uBE44\uD2B8 \uBCA1\uD130\uB85C \uAD6C\uC131\uB41C \uAC00\uD658\uD658\uC5D0 \uB300\uD574\uC11C\uB294 \uBE44\uD2B8 \uBCA1\uD130 \uBB38\uC11C\uB97C \uCC38\uACE0\uD558\uC2ED\uC2DC\uC624.) \uC774\uCC28 \uD615\uC2DD \uC774\uB860\uC5D0\uC11C, \uBE44\uD2B8 \uD658(Witt\u74B0, \uC601\uC5B4: Witt ring)\uC740 \uBE44\uD1F4\uD654 \uC774\uCC28 \uD615\uC2DD\uC758 \uB3D9\uCE58\uB958\uB85C \uAD6C\uC131\uB41C \uAC00\uD658\uD658\uC774\uB2E4."@ko . . . "In mathematics, a Witt group of a field, named after Ernst Witt, is an abelian group whose elements are represented by symmetric bilinear forms over the field."@en . . . . "Witt group"@en . . . . . . . . . . . . . . . . . . . . "\uBE44\uD2B8 \uD658"@ko . . . . . "In mathematics, a Witt group of a field, named after Ernst Witt, is an abelian group whose elements are represented by symmetric bilinear forms over the field."@en . . . . . . "Der Begriff des Witt-Rings stammt aus der Algebra. Er soll die quadratischen R\u00E4ume \u00FCber einem Ring , d. h. die -Moduln mit symmetrischer Bilinearform, zusammenfassen. Er wurde 1937 von Ernst Witt eingef\u00FChrt."@de . . . "1122574573"^^ . . . . . . . . . . . . . . . . . . . . "Der Begriff des Witt-Rings stammt aus der Algebra. Er soll die quadratischen R\u00E4ume \u00FCber einem Ring , d. h. die -Moduln mit symmetrischer Bilinearform, zusammenfassen. Er wurde 1937 von Ernst Witt eingef\u00FChrt."@de . . "21740"^^ . . . . . . . . . . . . . . . . . "5578523"^^ . . . . . . . . . "Witt-Ring"@de . . . . . . . . . "En math\u00E9matiques, un groupe de Witt sur un corps commutatif, nomm\u00E9 d'apr\u00E8s Ernst Witt, est un groupe ab\u00E9lien dont les \u00E9l\u00E9ments sont repr\u00E9sent\u00E9s par des formes bilin\u00E9aires sym\u00E9triques sur ce corps."@fr . . . . . .