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1	Iwasawa theory of r-adic [rho-adic] Lie extensions Venjakob, Otmar. January 2000 (has links) (PDF) Heidelberg, Univ., Diss., 2001. / Computerdatei im Fernzugriff. Iwasawa-Theorie
2	Iwasawa theory of r-adic [rho-adic] Lie extensions Venjakob, Otmar. January 2000 (has links) (PDF) Heidelberg, Univ., Diss., 2001. / Computerdatei im Fernzugriff. Iwasawa-Theorie
3	Iwasawa theory of r-adic [rho-adic] Lie extensions Venjakob, Otmar. January 2000 (has links) (PDF) Heidelberg, University, Diss., 2001. Iwasawa-Theorie
4	A new approach to the investigation of Iwasawa invariants Kleine, Sören 16 December 2014 (has links) No description available. 510 Iwasawa theory Iwasawa invariants Mathematics (PPN61756535X)
5	The Change in Lambda Invariants for Cyclic p-Extensions of Z(p)-Fields Schettler, Jordan Christian January 2012 (has links) The well-known Riemann-Hurwitz formula for Riemann surfaces (or the corresponding formulas of the same name for curves/function fields) is used in genus computations. In 1979, Yûji Kida proved a strikingly analogous formula in [Kid80] for p-extensions of CM-fields (p an odd prime) which is similarly used to compute Iwasawa λ -invariants. However, the relationship between Kida’s formula and the statement for surfaces is not entirely clear since the proofs are of a very different flavor. Also, there were a few hypotheses for Kida’s result which were not fully satisfying; for example, Kida’s formula requires CM-fields rather than more general number fields and excludes the prime p = 2. Around a year after Kida’s result was published, Kenkichi Iwasawa used Galois cohomology in [Iwa81] to establish a more general formula (about representations) that did not exclude the prime p = 2 nor need the CM-field assumption. Moreover, Kida’s formula follows as a corollary from Iwasawa’s formula. We’ll prove a slight generalization of Iwasawa’s formula and use this to give a new proof of a result of Kida in [Kid79] and Ferrero in [Fer80] which computes λ-invariants in imaginary quadratic extensions for the prime p = 2. We go on to produce special generalizations of Iwasawa’s formula in the case of cyclic p-extensions; these formulas can be realized as statements about Q(p)-representations, and, in the cases of degree p or p², about p-adic integral representations. One upshot of these formulas is a vanishing criterion for λ-invariants which generalizes a result of Takashi Fukuda et al. in [FKOT97]. Other applications include new congruences and inequalities for λ-invariants that cannot be gleaned from Iwasawa’s formula. Lastly, we give a scheme theoretic approach to produce a general formula for finite, separable morphisms of Dedekind schemes which simultaneously encompasses the classical Riemann-Hurwitz formula and Iwasawa’s formula. lambda Mathematics invariants Iwasawa
6	Some results in Iwasawa Theory and the p-adic representation theory of p-adic GL₂ Kidwell, Keenan James 25 June 2014 (has links) This thesis is divided into two parts. In the first, we generalize results of Greenberg-Vatsal on the behavior of algebraic lambda-invariants of p-ordinary modular forms under congruence. In the second, we generalize a result of Emerton on maps between locally algebraic parabolically induced representations and unitary Banach space representations of GL₂ over a p-adic field. / text Representation theory Iwasawa theory
7	Iwasawa theory for elliptic curves with cyclic isogenies / Nichifor, Alexandra. January 2004 (has links) Thesis (Ph. D.)--University of Washington, 2004. / Vita. Includes bibliographical references (p. 55-56). Iwasawa theory. Curves, Elliptic.
8	The split prime μ-conjecture and further topics in Iwasawa theory Crisan, Vlad-Cristian 04 March 2019 (has links) No description available. 510 Iwasawa theory Mathematics (PPN61756535X)
9	Iwasawa Algebras and Parabolic Induction of p-adic Banach Representations Roberts, Jeremiah 01 May 2024 (has links) (PDF) Let G be a reductive group, and P a parabolic subgroup. Let L ⊆ K be finiteextensions of Qp and let G = G(L), P = P(L). In this thesis, we define the Iwasawa algebra K[[G]] and prove that it is isomorphic to the convolution algebra of compactly supported distributions on G. We show that under Schneider-Teitelbaum duality the func- tor of parabolic induction on the side of the admissible representations corresponds to the functor K[[G]] ⊗K[[P ]] − on the side of the K[[G]]-modules.This has important applications in the theory of admissible representations of G on p-adicBanach spaces. In particular, we prove the parabolic induction of an admissible represen- tation is again admissible, and prove Frobenius reciprocity for admissible representations. Banach Iwasawa Algebra Nonarchimedian Representations
10	Selmer groups for elliptic curves with isogenies of prime degree / Mailhot, James Michael. January 2003 (has links) Thesis (Ph. D.)--University of Washington, 2003. / Vita. Includes bibliographical references (p. 65-68).

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