98 research outputs found
The family Floer functor is faithful
Family Floer theory yields a functor from the Fukaya category of a symplectic
manifold admitting a Lagrangian torus fibration to a (twisted) category of
perfect complexes on the mirror rigid analytic space. This functor is shown to
be faithful by a degeneration argument involving moduli spaces of annuli.Comment: 70 pages, 24 figures. Final version, with substantially enhanced
exposition, accepted for publication at JEM
Snowflake groups, Perron-Frobenius eigenvalues, and isoperimetric spectra
The k-dimensional Dehn (or isoperimetric) function of a group bounds the
volume of efficient ball-fillings of k-spheres mapped into k-connected spaces
on which the group acts properly and cocompactly; the bound is given as a
function of the volume of the sphere. We advance significantly the observed
range of behavior for such functions. First, to each non-negative integer
matrix P and positive rational number r, we associate a finite, aspherical
2-complex X_{r,P} and calculate the Dehn function of its fundamental group
G_{r,P} in terms of r and the Perron-Frobenius eigenvalue of P. The range of
functions obtained includes x^s, where s is an arbitrary rational number
greater than or equal to 2. By repeatedly forming multiple HNN extensions of
the groups G_{r,P} we exhibit a similar range of behavior among
higher-dimensional Dehn functions, proving in particular that for each positive
integer k and rational s greater than or equal to (k+1)/k there exists a group
with k-dimensional Dehn function x^s. Similar isoperimetric inequalities are
obtained for arbitrary manifold pairs (M,\partial M) in addition to
(B^{k+1},S^k).Comment: 42 pages, 8 figures. Version 2: 47 pages, 8 figures; minor revisions
and reformatting; to appear in Geom. Topo
Polynomial Bounds for Oscillation of Solutions of Fuchsian Systems
We study the problem of placing effective upper bounds for the number of
zeros of solutions of Fuchsian systems on the Riemann sphere. The principal
result is an explicit (non-uniform) upper bound, polynomially growing on the
frontier of the class of Fuchsian systems of given dimension n having m
singular points. As a function of n,m, this bound turns out to be double
exponential in the precise sense explained in the paper. As a corollary, we
obtain a solution of the so called restricted infinitesimal Hilbert 16th
problem, an explicit upper bound for the number of isolated zeros of Abelian
integrals which is polynomially growing as the Hamiltonian tends to the
degeneracy locus. This improves the exponential bounds recently established by
A. Glutsyuk and Yu. Ilyashenko.Comment: Will appear in Annales de l'institut Fourier vol. 60 (2010
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