45,637 research outputs found
On realizing diagrams of Pi-algebras
Given a diagram of Pi-algebras (graded groups equipped with an action of the
primary homotopy operations), we ask whether it can be realized as the homotopy
groups of a diagram of spaces. The answer given here is in the form of an
obstruction theory, of somewhat wider application, formulated in terms of
generalized Pi-algebras. This extends a program begun in [J. Pure Appl. Alg.
103 (1995) 167-188] and [Topology 43 (2004) 857-892] to study the realization
of a single Pi-algebra. In particular, we explicitly analyze the simple case of
a single map, and provide a detailed example, illustrating the connections to
higher homotopy operations.Comment: This is the version published by Algebraic & Geometric Topology on 21
June 200
Moduli spaces of 2-stage Postnikov systems
Using the obstruction theory of Blanc-Dwyer-Goerss, we compute the moduli
space of realizations of 2-stage Pi-algebras concentrated in dimensions 1 and n
or in dimensions n and n+1. The main technical tools are Postnikov truncation
and connected covers of Pi-algebras, and their effect on Quillen cohomology.Comment: Version 3: Added conventions in section 1.3. Minor change
The number of conjugacy classes of elements of the Cremona group of some given finite order
This note presents the study of the conjugacy classes of elements of some
given finite order n in the Cremona group of the plane. In particular, it is
shown that the number of conjugacy classes is infinite if n is even, n=3 or
n=5, and that it is equal to 3 (respectively 9) if n=9 (respectively 15), and
is exactly 1 for all remaining odd orders.
Some precise representative elements of the classes are given.Comment: 14 page
On the inertia group of elliptic curves in the Cremona group of the plane
We study the group of birational transformations of the plane that fix (each
point of) a curve of geometric genus 1.
A precise description of the finite elements is given; it is shown in
particular that the order is at most 6, and that if the group contains a
non-trivial torsion, the fixed curve is the image of a smooth cubic by a
birational transformation of the plane.
We show that for a smooth cubic, the group is generated by its elements of
degree 3, and prove that it contains a free product of Z/2Z, indexed by the
points of the curve.Comment: 14 pages, no figur
CW simplicial resolutions of spaces, with an application to loop spaces
We show how a certain type of CW simplicial resolutions of space by wedges of
spheres may be constructed for any topological space, and how such resolutions
yield an obstruction theory for a given space X to be a loop space.Comment: AMSLATEX, 20 page
Simple relations in the Cremona group
We give a simple set of generators and relations for the Cremona group of the
plane. Namely, we show that the Cremona group is the amalgamated product of the
de Jonqui\`eres group with the group of automorphisms of the plane, divided by
one relation which is , where and \sigma=(x:y:z)\dasharrow (yz:xz:xy)
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