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11 Mar 2015: 20. Let d 6= 0, 1 be a square free integer, K = Q(d), D = DK.

2 Jun 2015: Silverberg [20]. The above formulae are taken from [10, Sections 8, 9 and 13], with. ... Poonen, E.F. Schaefer and M. Stoll, Twists of X(7) and primitive solutions to x2 y3 =. z7, Duke Math. J. 137 (2007), no. 1, 103–158. [20] K.

18 Feb 2015: Togetherwith the recent proof of semi-simplicity of Hrint [16, Thm. 5.20(3)] this yields. ... Thanks to [9, 20, 16], the étale cohomology of Y again decomposes as H = HintHrest, where.

15 Sep 2015: X,ε)Q integral D(Q/X). , (20). where again for sufficiently large X we have |E′′(X,ε)| < εXn(n1)/2. ... By (18), the leftmost expressionin (19) approaches ρDn (). p ρn(p) as ε 0, while expression (20) approaches ρDn by definition.

22 Sep 2015: f(t)= f. ′(t). f(t)2. 20. (x) By the product rule and the quotient rule,. ... 10 20. n0 = n =n01. 0 1. Suppose it is true for all k K 1.

11 Sep 2015: If L = K(β) thisgives equations. (20) mi(x1,. ,x4) = Qi(x βy,u βv). ... solving conics over K, and over quadratic extensions of K. 20 TOM FISHER.

20 May 2015: vn) d(v1,. ,vj,. ,vj,. ,vn) = 0. 20 SIMON WADSLEY. Since the first and last terms on the left are zero, the statement follows immediately.

2 Dec 2015: n. Thus 1,. ,n are LI as claimed. 20 SIMON WADSLEY.

3 Apr 2015: 4 Shimura curves and Hida varieties 6. 5 Galois theory 20.

7 Aug 2015: We can extend ÙD to a sheaf defined on general smooth rigid analytic varieties.Then we prove the following analogue of Kiehl’s Theorem [20] for coherent sheavesof O-modules on