5 research outputs found
Maximal subspace averages
We study maximal operators associated to singular averages along finite
subsets of the Grassmannian of -dimensional
subspaces of . The well studied case corresponds to the the
directional maximal function with respect to arbitrary finite subsets of
. We provide a systematic study of all cases
and prove essentially sharp bounds for the
maximal subspace averaging operator in terms of the cardinality of ,
with no assumption on the structure of . In the codimension case,
that is , we prove the precise critical weak -bound.
Drawing on the analogy between maximal subspace averages and -Nikodym
maximal averages, we also formulate the appropriate maximal Nikodym conjecture
for general by providing examples that determine the critical
-space for the -Nikodym problem. Unlike the case, the maximal
Kakeya and Nikodym problems are shown not to be equivalent when . In this
context, we prove the best possible -bound for the
-Nikodym maximal function for all combinations of dimension and
codimension.
Our estimates rely on Fourier analytic almost orthogonality principles,
combined with polynomial partitioning, but we also use spatial analysis based
on the precise calculation of intersections of -dimensional plates in
.Comment: 40 pages, 1 figure, submitted for publicatio