A KLEIMAN–BERTINI THEOREM FOR SHEAF TENSOR PRODUCTS EZRA MILLER AND DAVID E SPEYER Abstract. Fix a variety X with a transitive (left) action by an algebraic group G. Let E and F be coherent sheaves on X. We prove that - Bundle theory - Document - PDFSEARCH.IO

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	A KLEIMAN–BERTINI THEOREM FOR SHEAF TENSOR PRODUCTS EZRA MILLER AND DAVID E SPEYER Abstract. Fix a variety X with a transitive (left) action by an algebraic group G. Let E and F be coherent sheaves on X. We prove that Add to Reading List Document Date: 2007-09-04 19:52:43 Open Document File Size: 102,18 KB Share Result on Facebook City Minneapolis / Boston / Springer-Verlag / New York / / Company sheaf OY / Cambridge University Press / / / Facility University of Minnesota / Clay Mathematics Institute / University of Michigan / / IndustryTerm tensor product / algebraic / computing / connected linear algebraic / / Organization Cambridge University / Department of Mathematics / School of Mathematics / Clay Mathematics Institute / University of Michigan / Ann Arbor / National Science Foundation / University of Minnesota / / Person DAVID E SPEYER / Michel Raynaud / Brian Conrad / Robin Hartshorne / Igor Dolgachev / / Product Canon GL1 Camcorder / / ProvinceOrState Minnesota / New York / Massachusetts / Michigan / / PublishedMedium Journal of Algebra / / SocialTag Homological algebra Sheaf theory Algebraic geometry Algebraic topology Sheaf Ample line bundle Coherent sheaf Grothendieck group Stalk Abstract algebra

A KLEIMAN–BERTINI THEOREM FOR SHEAF TENSOR PRODUCTS EZRA MILLER AND DAVID E SPEYER Abstract. Fix a variety X with a transitive (left) action by an algebraic group G. Let E and F be coherent sheaves on X. We prove that Add to Reading List