Strongly compatible systems associated to semistable abelian varieties
Abstract
We prove a motivic refinement of a result of Weil, Deligne and Raynaud on the existence of strongly compatible systems associated to abelian varieties. More precisely, given an abelian variety A over a number field E⊂ C, we prove that after replacing E by a finite extension, the action of Gal( E/ E) on the -adic cohomology H1et(A E, Q) gives rise to a strongly compatible system of -adic representations valued in the Mumford--Tate group G of A. This involves an independence of -statement for the Weil--Deligne representation associated to A at places of semistable reduction, extending previous work of ours at places of good reduction.
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