Your search keyword '"Rebecca Bellovin"' showing total 4 results

1. Galois representations over pseudorigid spaces

Author

Rebecca Bellovin

Subjects

Algebra and Number Theory, Mathematics::Algebraic Geometry, Mathematics - Number Theory, Mathematics::Number Theory, FOS: Mathematics, Number Theory (math.NT)

Abstract

We study $p$-adic Hodge theory for families of Galois representations over pseudorigid spaces. Such spaces are non-archimedean analytic spaces which may be of mixed characteristic, and which arise naturally in the study of eigenvarieties at the boundary of weight space. We introduce perfect and imperfect overconvergent period rings, and we use the Tate--Sen method to construct overconvergent $(\varphi, \Gamma)$-modules for Galois representations over pseudorigid spaces., Comment: Final version. To appear in J. Theor. Nombres Bordeaux

Published

2020

2. Wach modules, regulator maps, and epsilon-isomorphisms in families

Author

Rebecca Bellovin and Otmar Venjakob

Subjects

Mathematics - Number Theory, General Mathematics, Mathematics::Number Theory, 010102 general mathematics, Regulator, 01 natural sciences, 0101 Pure Mathematics, Algebra, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Number Theory (math.NT), 0101 mathematics, Mathematics

Abstract

We prove the local epsilon-isomorphism conjecture of Fukaya and Kato [FK06] for certain crystalline families of G_Qp-representations. This conjecture can be regarded as a local analogue of the Iwasawa main conjecture for families. Our work extends earlier work of Kato for rank-1 modules (cf. [Ven13]), of Benois and Berger for crystalline G_Qp-representations with respect to the cyclotomic extension (cf. [BB08]), as well as of Loeffler, Venjakob, and Zerbes (cf. [LVZ13]) for crystalline G_Qp- representations with respect to abelian p-adic Lie extensions of Qp. Nakamura [Nak13, Nak14] has also formulated a version of the epsilon-conjecture for affinoid families of (phi,Gamma)-modules over the Robba ring, and proved his conjecture in the rank-1 case. He used this case to construct an epsilon-isomorphism for families of trianguline (phi,Gamma)-modules, depending on a fixed triangulation. Our results imply that this epsilon-isomorphism is independent of the chosen triangulation for certain crystalline families. The main ingredient of our proof consists of the construction of families of Wach modules generalizing work of Wach and Berger [Ber04] and following the approach of Kisin to the construction of potentially semi-stable deformation rings [Kisa]., Comment: Revised. To appear in IMRN

Published

2016

3. $p$-adic Hodge theory in rigid analytic families

Author

Rebecca Bellovin

Subjects

Algebra and Number Theory, Functor, 14G22, Mathematics - Number Theory, Mathematics::Number Theory, rigid analytic geometry, Galois module, Coherent sheaf, Combinatorics, $p$-adic Hodge theory, 11S20, p-adic Hodge theory, FOS: Mathematics, Interval (graph theory), Number Theory (math.NT), Algebra over a field, Mathematics

Abstract

We study the functors $\D_{\B_\ast}(V)$, where $\B_\ast$ is one of Fontaine's period rings and $V$ is a family of Galois representations with coefficients in an affinoid algebra $A$. We show that $\D_{\HT}(V)=\oplus_{i\in\Z}(\D_{\Sen}(V)\cdot t^i)^{\Gamma_K}$, $\D_{\dR}(V)=\D_{\dif}(V)^{\Gamma_K}$, and $\D_{\cris}(V)=\D_{\rig}(V)[1/t]^{\Gamma_K}$, generalizing results of Sen, Fontaine, and Berger. The modules $\D_{\HT}(V)$ and $\D_{\dR}(V)$ are coherent sheaves on $\Sp(A)$, and $\Sp(A)$ is stratified by the ranks of submodules $\D_{\HT}^{[a,b]}(V)$ and $\D_{\dR}^{[a,b]}(V)$ of "periods with Hodge-Tate weights in the interval $[a,b]$". Finally, we construct functorial $\B_\ast$-admissible loci in $\Sp(A)$, generalizing a result of Berger-Colmez to the case where $A$ is not necessarily reduced., Comment: Final version. 44 pages

Published

2015

4. Generic smoothness for $G$-valued potentially semi-stable deformation rings

Author

Rebecca Bellovin

Subjects

Pure mathematics, Algebra and Number Theory, Smoothness (probability theory), Mathematics - Number Theory, Mathematics::Number Theory, 010102 general mathematics, Complete intersection, Structure (category theory), Resolution of singularities, Deformation (meteorology), Galois module, 01 natural sciences, Moduli space, 0103 physical sciences, FOS: Mathematics, Singular component, Number Theory (math.NT), 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Mathematics

Abstract

We extend Kisin's results on the structure of characteristic $0$ Galois deformation rings to deformation rings of Galois representations valued in arbitrary connected reductive groups $G$. In particular, we show that such Galois deformation rings are complete intersection. In addition, we study explicitly the structure of the moduli space $X_{\varphi,N}$ of (framed) $(\varphi,N)$-modules when $G=\GL_n$. We show that when $G=\GL_3$ and $K_0=\Q_p$, $X_{\varphi,N}$ has a singular component, and we construct a moduli-theoretic resolution of singularities., Comment: Refereed version. 33 pages. To appear in Annales_de_l'Institut_Fourier

Published

2014