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Group theory --- p-adic fields --- Hecke algebras --- Representations of groups --- Symplectic groups --- Groups, Symplectic --- Linear algebraic groups --- Group representation (Mathematics) --- Groups, Representation theory of --- Algebras, Hecke --- Group algebras --- Algebraic fields --- p-adic numbers --- Groupes symplectiques --- Représentations de groupes --- Hecke, Algèbres de --- Groupes symplectiques. --- Représentations de groupes. --- Hecke, Algèbres de.
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Symplectic geometry. --- Symplectic groups. --- Domains of holomorphy. --- Géométrie symplectique. --- Groupes symplectiques. --- Domaines d'holomorphie. --- Géométrie symplectique --- Groupes symplectiques --- Domaines d'holomorphie --- Symplectic geometry --- Symplectic groups --- Domains of holomorphy --- Holomorphy domains --- Analytic continuation --- Functions of several complex variables --- Groups, Symplectic --- Linear algebraic groups --- Geometry, Differential
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Functional analysis --- Symplectic groups. --- Groupes symplectiques --- Trace formulas. --- Formules de trace --- Orbit method. --- Orbites, Méthode des --- Representations of groups. --- Représentations de groupes --- Orbit method --- Representations of groups --- Symplectic groups --- Trace formulas --- Formulas, Trace --- Automorphic forms --- Discontinuous groups --- Groups, Symplectic --- Linear algebraic groups --- Group representation (Mathematics) --- Groups, Representation theory of --- Group theory --- Method of orbits --- Orbits, Method of --- Representations of algebras --- Groupes symplectiques. --- Formules de trace. --- Orbites, Méthode des. --- Représentations de groupes.
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"We study the non-semisimple terms in the geometric side of the Arthur trace formula for the split symplectic similitude group and the split symplectic group of rank 2 over any algebraic number field. In particular, we express the global coefficients of unipotent orbital integrals in terms of Dedekind zeta functions, Hecke L-functions, and the Shintani zeta function for the space of binary quadratic forms."--
Selberg trace formula. --- Trace formulas. --- Geometry, Algebraic. --- Symplectic groups. --- Formule de trace de Selberg --- Formules de trace --- Géométrie algébrique --- Groupes symplectiques --- Selberg, Formule de trace de --- Selberg trace formula --- Trace formulas --- Geometry, Algebraic --- Symplectic groups --- Functions, Zeta --- Number theory --- Riemann surfaces --- Groups, Symplectic --- Linear algebraic groups --- Algebraic geometry --- Geometry --- Formulas, Trace --- Automorphic forms --- Discontinuous groups --- Representations of groups --- Selberg, Formule de trace de. --- Formules de trace. --- Géométrie algébrique. --- Groupes symplectiques.
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Group theory --- p-adic fields. --- Groupes p-adiques. --- Symplectic groups. --- Groupes symplectiques. --- Representations of groups. --- Représentations de groupes. --- p-adic fields --- Representations of groups --- Symplectic groups --- Groups, Symplectic --- Linear algebraic groups --- Group representation (Mathematics) --- Groups, Representation theory of --- Algebraic fields --- p-adic numbers
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Group theory --- Functional analysis --- Symplectic groups. --- Groupes symplectiques. --- p-adic fields. --- Groupes p-adiques. --- Representations of groups. --- Représentations de groupes. --- p-adic fields --- Representations of groups --- Symplectic groups --- Groups, Symplectic --- Linear algebraic groups --- Group representation (Mathematics) --- Groups, Representation theory of --- Algebraic fields --- p-adic numbers
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One of the basic ideas in differential geometry is that the study of analytic properties of certain differential operators acting on sections of vector bundles yields geometric and topological properties of the underlying base manifold. Symplectic spinor fields are sections in an L^2-Hilbert space bundle over a symplectic manifold and symplectic Dirac operators, acting on symplectic spinor fields, are associated to the symplectic manifold in a very natural way. Hence they may be expected to give interesting applications in symplectic geometry and symplectic topology. These symplectic Dirac operators are called Dirac operators, since they are defined in an analogous way as the classical Riemannian Dirac operator known from Riemannian spin geometry. They are called symplectic because they are constructed by use of the symplectic setting of the underlying symplectic manifold. This volume is the first one that gives a systematic and self-contained introduction to the theory of symplectic Dirac operators and reflects the current state of the subject. At the same time, it is intended to establish the idea that symplectic spin geometry and symplectic Dirac operators may give valuable tools in symplectic geometry and symplectic topology, which have become important fields and very active areas of mathematical research.
Symplectic geometry. --- Symplectic and contact topology. --- Symplectic groups. --- Dirac equation. --- Géométrie symplectique --- Topologie symplectique et de contact --- Groupes symplectiques --- Dirac, Equation de --- Symplectic geometry --- Symplectic and contact topology --- Symplectic groups --- Dirac equation --- Mathematics --- Physical Sciences & Mathematics --- Geometry --- Algebra --- Clifford algebras. --- Differential operators. --- Operators, Differential --- Geometric algebras --- Mathematics. --- Global analysis (Mathematics). --- Manifolds (Mathematics). --- Differential geometry. --- Differential Geometry. --- Global Analysis and Analysis on Manifolds. --- Differential geometry --- Geometry, Differential --- Topology --- Analysis, Global (Mathematics) --- Differential topology --- Functions of complex variables --- Geometry, Algebraic --- Math --- Science --- Differential equations --- Operator theory --- Differential equations, Partial --- Quantum field theory --- Wave equation --- Algebras, Linear --- Global differential geometry. --- Global analysis. --- Global analysis (Mathematics) --- Groups, Symplectic --- Linear algebraic groups --- Topology, Symplectic and contact
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