Announcement the Rigid Analytic Period Mapping , Lubin - Tate Space , and Stable Homotopy Theory
نویسندگان
چکیده
The geometry of the Lubin-Tate space of deformations of a formal group is studied via anétale, rigid analytic map from the deformation space to projective space. This leads to a simple description of the equivariant canonical bundle of the deformation space which, in turn, yields a formula for the dualizing complex in stable homotopy theory.
منابع مشابه
The Rigid Analytic Period Mapping, Lubin-tate Space, and Stable Homotopy Theory
The geometry of the Lubin-Tate space of deformations of a formal group is studied via an étale, rigid analytic map from the deformation space to projective space. This leads to a simple description of the equivariant canonical bundle of the deformation space which, in turn, yields a formula for the dualizing complex in stable homotopy theory. Introduction Ever since Quillen [22, 1 ] discovered ...
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