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This Concept Map, created with IHMC CmapTools, has information related to: Generalized Feynman diagrams.cmap, two topological vertices representing direct sum and tensor product - the basic operations for Hilbert spaces ???? a) direct sum 3-vertex representing fusion of 3-surfaces and is reverse reaction analogous to stringy vertices, replacing the lines of Feynman diagrams with 4-D surfaces - orbits of 3-surfaces representing particles in very general sense reducing effectively to light-like orbits of partonic2-surfa- ces if strong form of holography implied by strong from of GCI holds true, as propagation of induced spinor field along two different paths: this does not represent particle decay as in string models leading to a topological description for what happens in double slit experiment, GENERALIZED FEYNMAN DIAGRAMS involve also generalization of string diagrams to their twistorial counterparts, generalization of string diagrams to their twistorial counterparts since induced spinor modes are loca- lized two 2-D string world sheets and partonic 2-sur- faces, GENERALIZED FEYNMAN DIAGRAMS mean reduction of Feyn- man diagramma- tics to space-time geometry and topology, a) direct sum 3-vertex representing fusion of 3-surfaces and is reverse reaction analogous to stringy vertices with interpretation as propagation of induced spinor field along two different paths: this does not represent particle decay as in string models, reduction of Feyn- man diagramma- tics to space-time geometry and topology obtained by replacing the lines of Feynman diagrams with 4-D surfaces - orbits of 3-surfaces representing particles in very general sense, GENERALIZED FEYNMAN DIAGRAMS involve two topological vertices representing direct sum and tensor product - the basic operations for Hilbert spaces, b) tensor product vertex representing the analog of 3-vertex for Feynman diag- rams: three 4-D lines meet along their ends with interpretation as decay of particle to two particles: this vertex has no counterpart in string models, two topological vertices representing direct sum and tensor product - the basic operations for Hilbert spaces ???? b) tensor product vertex representing the analog of 3-vertex for Feynman diag- rams: three 4-D lines meet along their ends, induced spinor modes are loca- lized two 2-D string world sheets and partonic 2-sur- faces by the condition that em charge is well-defined for spinor modes
