It is fundamental to understand a manifold with positive scalar
curvature and its topology. The minimal surface approach pioneered
by R. Schoen and S.T. Yau have advanced our understanding of
positively curved manifolds. A very important result is...
A linear matrix is a matrix whose entries are linear forms in
some indeterminates $t_1,\dots, t_m$ with coefficients in some
field $F$. The commutative rank of a linear matrix is
obtained by interpreting it as a matrix with entries in the
function...
In the course of constructing the Langlands correspondence for
GL(2) over a function field, Drinfeld discovered a surprising fact
about the interaction between étale fundamental groups and products
of schemes in characteristic p. We state this...
How should one estimate a signal, given only access to noisy
versions of the signal corrupted by unknown cyclic shifts? This
simple problem has surprisingly broad applications, in fields from
aircraft radar imaging to structural biology with the...
Randomness dispersers are an important tool in the theory of
pseudorandomness, with numerous applications. In this talk, we will
consider one-bit strong dispersers and show their connection to
erasure list-decodable codes and Ramsey graphs.
Fred Appel, Princeton University Press (Executive Editor Anthropology and Religion) Eric Henney, Basic Books (Editor) Gillian Greenough, Wiley (Executive Editor, Life and Physical Sciences) Eric Crahan, Princeton University Press (Executive Editor for His
Princeton University Press will spearhead a discussion with
others in the publishing realm on the current and future state of
academic publishing.
Dilworth Room, Simons Hall 12-2:00 p.m.
Suggested Audience: IAS Members and Visitors and partners...
This talk is concerned with the radius of convergence of p-adic
families of modular forms --- q-series over a p-adic disc whose
specialization to certain integer points is the q-expansion of a
classical Hecke eigenform of level p. Numerical...
We consider the Navier–Stokes equations posed on the half space,
with Dirichlet boundary conditions. We give a direct energy based
proof for the instantaneous space-time analyticity and Gevrey class
regularity of the solutions, uniformly up to the...
We prove that the systole (or more generally, any k-th homology
systole) of a minimal surface in an ambient three manifold of
positive Ricci curvature tends to zero as the genus of the minimal
surfaces becomes unbounded. This is joint work...
We shall present a procedure which to any admissible family of
immersions of surfaces into an arbitrary closed riemannian
manifolds assigns a smooth, possibly branched, minimal surface
whose area is equal to the width of the corresponding minmax...