Please Note: This seminar will be given online.
|
Probability Seminar Series
Cristopher
Moore,
Professor Link to join seminar: Hosted on Webex. |
The Planted Matching Problem
What
happens
when
an
optimization
problem
has
a
good
solution
built
into
it,
but
which
is
partly
obscured
by
randomness?
Here
we
revisit
the
classic
assignment
problem,
i.e.,
the
minimum
perfect
matching
problem
on
bipartite
graphs.
If
the
edges
have
random
weights
in
[0,1],
Mézard
and
Parisi
conjectured
—
and
then
Aldous
proved
—
that
the
minimum
matching
has
expected
weight
zeta(2)
=
pi^2/6.
We
consider
a
“planted”
version
where
a
particular
matching
has
weights
drawn
from
an
exponential
distribution
with
mean
mu/n.
When
mu
<
1/4,
the
minimum
matching
is
almost
identical
to
the
planted
one.
When
mu
>
1/4,
the
overlap
between
the
two
is
given
by
a
system
of
differential
equations
that
result
from
a
message-passing
algorithm.
This
is
joint
work
with
Mehrdad
Moharrami
(Michigan)
and
Jiaming
Xu
(Duke).