551 Documenta Math. The Eisenstein Ideal and Jacquet-Langlands Isogeny over Function Fields

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Date: 2015-05-26 12:24:45 Modular forms Mathematical analysis Mathematics Abstract algebra Modular curve AtkinLehner theory Elliptic curve Eisenstein ideal Hecke operator Langlands program Cohomology Congruence subgroup		551 Documenta Math. The Eisenstein Ideal and Jacquet-Langlands Isogeny over Function Fields Add to Reading List Source URL: www.math.uiuc.edu Download Document from Source Website File Size: 785,62 KB Share Document on Facebook

	551 Documenta Math. The Eisenstein Ideal and Jacquet-Langlands Isogeny over Function Fields DocID: 1stSb - View Document
	551 Documenta Math. The Eisenstein Ideal and Jacquet-Langlands Isogeny over Function Fields DocID: 1pV1P - View Document
	On the Eisenstein ideal for imaginary quadratic fields - Erratum Tobias Berger June 21, 2011 The statement in Theorem 15 about the perfectness of the Poincar´e and Lefschetz pairings for Dedekind domains (attributed to DocID: 1jmkb - View Document
	The kernel of the Eisenstein ideal by J´ anos Csirik B.A. (University of Cambridge) 1994 DocID: c2yZ - View Document
	Tobias Berger Title: An Eisenstein ideal for imaginary quadratic fields Abstract: For certain algebraic Hecke characters χ of an imaginary quadratic field F we define an Eisenstein ideal in a Hecke algebra acting on cus DocID: 8H14 - View Document