On the best bound of the minimal twisted height of linear subspaces |
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| Authors: | Takao Watanabe |
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| Affiliation: | (1) Department of Mathematics, Graduate School of Science, Osaka University, Toyonaka, Osaka 560-0043, Japan |
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| Abstract: | Let V be a vector space over a global field k, g an element of the adele group  and Hg the twisted height defined on the k-subspaces of V . We show that the square root of the generalized Hermite-Rankin constant for k gives the best upper bound of the function  , where  runs over all m-dimensional k-subspaces of V and  runs over all n-dimensional k-subspaces of  . Received: 17 June 2005 |
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| Keywords: | 11H06 11H50 |
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