402 research outputs found
Syzygies of Segre embeddings and Delta-modules
We study syzygies of the Segre embedding of P(V_1) x ... x P(V_n), and prove
two finiteness results. First, for fixed p but varying n and V_i, there is a
finite list of "master p-syzygies" from which all other p-syzygies can be
derived by simple substitutions. Second, we define a power series f_p with
coefficients in something like the Schur algebra, which contains essentially
all the information of p-syzygies of Segre embeddings (for all n and V_i), and
show that it is a rational function. The list of master p-syzygies and the
numerator and denominator of f_p can be computed algorithmically (in theory).
The central observation of this paper is that by considering all Segre
embeddings at once (i.e., letting n and the V_i vary) certain structure on the
space of p-syzygies emerges. We formalize this structure in the concept of a
Delta-module. Many of our results on syzygies are specializations of general
results on Delta-modules that we establish. Our theory also applies to certain
other families of varieties, such as tangent and secant varieties of Segre
embeddings.Comment: 34 page
Residual irreducibility of compatible systems
We show that if is a compatible system of absolutely
irreducible Galois representations of a number field then the residual
representation is absolutely irreducible for in
a density 1 set of primes. The key technical result is the following theorem:
the image of is an open subgroup of a hyperspecial maximal
compact subgroup of its Zariski closure with bounded index (as varies).
This result combines a theorem of Larsen on the semi-simple part of the image
with an analogous result for the central torus that was recently proved by
Barnet-Lamb, Gee, Geraghty, and Taylor, and for which we give a new proof.Comment: 11 page
Periodicity in the cohomology of symmetric groups via divided powers
A famous theorem of Nakaoka asserts that the cohomology of the symmetric
group stabilizes. The first author generalized this theorem to non-trivial
coefficient systems, in the form of -modules over a field, though
one now obtains periodicity of the cohomology instead of stability. In this
paper, we further refine these results. Our main theorem states that if is
a finitely generated -module over a noetherian ring
then admits the structure of a
-module, where is the divided power algebra over
in a single variable, and moreover, this -module is
"nearly" finitely presented. This immediately recovers the periodicity result
when is a field, but also shows, for example, how the torsion
varies with when . Using the theory of connections
on -modules, we establish sharp bounds on the period in the case
where is a field. We apply our theory to obtain results on the
modular cohomology of Specht modules and the integral cohomology of unordered
configuration spaces of manifolds.Comment: Fixed some minor mistakes and expanded the section on configuration
space
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