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On ℓ-adic representations attached to non-congruence subgroups II A.…
https://www.dpmms.cam.ac.uk/~ajs1005/preprints/examples.pdf29 Jan 2010: 6. 4. Γ5,2. 4.1. Write as usual. P(τ) = 1 24. ... g(τ) =1. 24. (. 35P(35τ) 7P(7τ) 5P(5τ) P(τ)). Then the function. -
Hypersurfaces and the Weil conjectures
https://www.dpmms.cam.ac.uk/~ajs1005/preprints/bristol.pdf29 Jan 2010: 24 / 25. Conclusions. The proof is complicated but is mostly rather formal. ... 24 / 25. The end. THE END. 25 / 25. Frontmatter. -
Remarks on special values of L-functions Anthony J. Scholl* ...
https://www.dpmms.cam.ac.uk/~ajs1005/preprints/remarks.pdf29 Jan 2010: in arithmetical algebraic geometry, ed. K. Ribet (ContemporaryMathematics 67 (1987)), 1–24. -
Classical motives A. J. Scholl Introduction This paper is ...
https://www.dpmms.cam.ac.uk/~ajs1005/preprints/classical_motives.pdf29 Jan 2010: 13[Γφ]p. 24[. tΓφ]) = p13(φ,id,φ)[Y ] = r[X]. where X XX is the diagonal. ... 24. References. 1 A. Beauville; Sur l’anneau de Chow d’une variété abélienne. -
An introduction to Kato's Euler systemsA. J. Scholl to ...
https://www.dpmms.cam.ac.uk/~ajs1005/preprints/euler.pdf29 Jan 2010: andkilled by 2 in general (see for example [24]).We also need the Chern character into de Rham cohomology. -
The Beilinson conjectures Christopher Deninger and Anthony J. Scholl* …
https://www.dpmms.cam.ac.uk/~ajs1005/preprints/d-s.pdf18 Feb 2010: The Beilinson conjectures. Christopher Deninger and Anthony J. Scholl. Introduction. The Beilinson conjectures describe the leading coefficients of L-series of varieties over number fields upto rational factors in terms of generalized regulators. We -
STATISTICAL MODELLING Part IIC. Example Sheet 4 (of 4) ...
https://www.dpmms.cam.ac.uk/study/II/StatisticalModelling/2009-2010/ex4.pdf23 Feb 2010: 35 30High Yes 9 12 19 19High No 24 25 28 29. -
Lent Term 2010 R. Camina IB Groups, Rings and ...
https://www.dpmms.cam.ac.uk/study/IB/GroupsRings%2BModules/2009-2010/ex10-3.pdf23 Feb 2010: Determine which of the following polynomials are irreducible in Q[X]:. X4 2X 2, X4 18X2 24, X3 9, X3 X2 X 1, X4 1, X4 4. -
EXAMPLE SHEET 3 (LECTURES 13–18) GALOIS THEORY MICHAELMAS 2009 ...
https://www.dpmms.cam.ac.uk/study/II/Galois/2009-2010/ex3.pdf28 Mar 2010: i) What are the transitive subgroups of S4? Find a monic polynomial over Z ofdegree 4 whose Galois group is V4 = {e, (12)(34), (13)(24), (14)(23)}.(ii) Let P -
ANALYSIS II (Michaelmas 2010): EXAMPLES 1 The questions are ...
https://www.dpmms.cam.ac.uk/study/IB/AnalysisII/2010-2011/anII_ex_2010_1.pdf15 Oct 2010: ANALYSIS II (Michaelmas 2010): EXAMPLES 1. The questions are not equally difficult. Those marked with are intended as ‘additional’, to beattempted if you wish to take things further. Comments, corrections are welcome at any timeand may be sent
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