Friday, April 14, 2023 3:30 pm
-
3:30 pm
EDT (GMT -04:00)
Title: Sets that Support a Joint Distribution
| Speaker: | Peter Winkler |
| Affiliation: | Dartmouth College |
| Location: | MC 5501 or contact Eva Lee for Zoom link |
Abstract: Given a closed set on the plane and two probability distributions on the real line, when are there random variables with the given distributions whose joint distribution is supported by the given set?
We
consider
both
discrete
and
continuous
distributions.
In
the
discrete
case,
what
is
needed
is
a
full,
nowhere-zero
flow
in
a
node-weighted
bipartite
graph.
In
the
continuous
case,
the
problem
is
equivalent
to
asking
which
sets
in
the
unit
square
can
support
a
permuton---AKA,
a
doubly-stochastic
measure.
Joint
work
with
Chris
Coscia
and
Martin
Tassy.