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Commutative algebra seminar Tuesday, 27 September 2022 @3.30 pm. Venue: Ramanujan Hall Speaker: Tony Puthenpurakal, IIT Bombay Title: On coefficient ideals-II Abstract: Let (A, m) be a Cohen-Macaulay local ring of dimension d ≥ 2 with infinite residue field and let I be an m-primary ideal. Let For 0 ≤ i ≤ d let Ii be the i th-coefficient ideal of I. Also let Ie = Id denote the Ratliff-Rush closure of A. Let G = GI (A) be the associated graded ring of I. We show that if dim H j G+ (G) ∨ ≤ j−1 for 1 ≤ j ≤ i ≤ d−1 then (I n)d−i = Ifn for all n ≥ 1. In particular if G is generalized Cohen-Macaulay then (I n)1 = Ifn for all n ≥ 1. As a consequence we get that if A is an analytically unramified domain with G generalized Cohen-Macaulay, then the S2-ification of the Rees algebra A[It] is L n≥0 Ifn.
Dear all, Prof. Nitin Nitsure will give a series of lectures on 'Algebraic Stacks and Moduli Theory' starting next week. The draft announcement is attached. The first talk will be introductory and will be accessible to everyone with very minimal knowledge of algebraic geometry. For the benefit of students, this is a very central and important area of algebraic geometry and Prof. Nitsure is a very good lecturer. Do try and attend the first lecture in Ramanujan Hall on Tuesday 27th at 5:10 pm. The first talk will be of 1 hour.
Date 28 September 2022
Time 4-5 pm
Venue: Ramanujan Hall
Speaker: Prof. Eknath Ghate, TIFR, Mumbai
Title: Semi-stable representations as limits of crystalline representations
Abstract: We construct an explicit sequence of crystalline representations
converging to a given irreducible two-dimensional semi-stable
representation of the Galois group of Q_p. The convergence takes place in
the blow-up space of two-dimensional trianguline representations studied
by Colmez and Chenevier. It is connected to a classical formula going back
to Greenberg and Stevens expressing the L-invariant as a logarithmic
derivative.
Our convergence result can be used to compute the reductions of any
irreducible two-dimensional semi-stable representation in terms of the
reductions of certain nearby crystalline representations of exceptional
weight. For instance, using our zig-zag conjecture on the reductions of
crystalline representations of exceptional weights, we recover completely
the work of Breuil-Mezard and Guerberoff-Park on the reductions of
irreducible semi-stable representations of weights at most p+1, at least
on the inertia subgroup. As new cases of the zig-zag conjecture are
proved, we further obtain some new information about the reductions for
small odd weights.
Finally, we use the above ideas to explain away some apparent violations
to local constancy in the weight of the reductions of crystalline
representations of small weight that were noted in our earlier work and
which provided the initial impetus for this work.
This is joint work with Anand Chitrao and Seidai Yasuda.