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- Pure_spinor abstract "In a field of mathematics known as representation theory pure spinors (or simple spinors) are spinor representations of the special orthogonal group that are annihilated by the largest possible subspace of the Clifford algebra. They were introduced by Élie Cartan in the 1930s to classify complex structures. Pure spinors were introduced into the realm of theoretical physics, and elevated in their importance in the study of spin geometry more generally, by Roger Penrose in the 1960s, where they became among the basic objects of study in twistor theory.".
- Pure_spinor wikiPageExternalLink charlton_thesis.pdf.
- Pure_spinor wikiPageExternalLink www.ift.unesp.br.
- Pure_spinor wikiPageExternalLink theme3.py?level=1&index1=315073.
- Pure_spinor wikiPageExternalLink 0001035.
- Pure_spinor wikiPageExternalLink 0209099.
- Pure_spinor wikiPageID "6843863".
- Pure_spinor wikiPageRevisionID "596726717".
- Pure_spinor hasPhotoCollection Pure_spinor.
- Pure_spinor subject Category:Spinors.
- Pure_spinor comment "In a field of mathematics known as representation theory pure spinors (or simple spinors) are spinor representations of the special orthogonal group that are annihilated by the largest possible subspace of the Clifford algebra. They were introduced by Élie Cartan in the 1930s to classify complex structures.".
- Pure_spinor label "Pure spinor".
- Pure_spinor label "纯旋量".
- Pure_spinor sameAs m.0gs65m.
- Pure_spinor sameAs Q7261160.
- Pure_spinor sameAs Q7261160.
- Pure_spinor wasDerivedFrom Pure_spinor?oldid=596726717.
- Pure_spinor isPrimaryTopicOf Pure_spinor.