Title: Erdos-Hajnal meets Gyarfas-Sumner
| Speaker: | Paul Seymour |
| Affiliation: | Princeton |
| Room: | QNC 1501 |
Abstract:
The
Gyarfas-Sumner
conjecture
says
that
every
graph
with
huge
(enough)
chromatic
number
and
bounded
clique
number
contains
any
given
forest
as
an
induced
subgraph.
(And
non-forests
do
not
have
this
property.)
The
Erdos-Hajnal
conjecture
says
that
for
every
graph
H,
all
graphs
not
containing
H
as
an
induced
subgraph
have
a
clique
or
stable
set
of
polynomial
size.
Both
conjectures
are
well-known,
and
impossibly
difficult.
This
talk
is
about
a
much
nicer
problem
vaguely
related
to
both
of
these,
the
following.
Say
an
n-vertex
graph
is
ʿʿc-coherentʾʾ
if
every
vertex
has
degree
<cn,
and
every
two
disjoint
vertex
subsets
of
size
at
least
cn
have
an
edge
between
them.
Which
graphs
H
have
the
property
that
all
c-coherent
graphs
contain
H
if
c
is
small
enough?
The
answer
turns
out
to
be
forests
(like
the
Gyarfas-Sumner
conjecture,
only
this
time
we
can
prove
it);
proved
in
joint
work
with
Maria
Chudnovsky,
Alex
Scott,
and
Sophie
Spirkl
a
few
weeks
ago.
This
extends
some
previous
theorems
(Bousquet,
Lagoutte,
and
Thomasse
proved
it
for
paths;
and
Liebenau,
Pilipczuk,
Spirkl
and
I
proved
it
for
subdivided
caterpillars).
All
three
proofs
are
quite
pretty
and
I
will
sketch
them
if
there
is
time.
The
connection
with
Erdos-Hajnal
is,
it
implies
that
for
every
forest
H,
all
graphs
that
contain
neither
H
nor
its
complement
have
two
linear
sets
of
vertices
that
either
have
no
edges
between
or
are
complete
to
each
other;
and
this
implies
that
all
such
graphs
have
a
polynomial-sized
clique
or
stable
set.
We
also
have
some
results
(the
four
of
us
with
Jacob
Fox)
about
what
you
can
say
when
you
exclude
H
and
its
complement,
and
neither
of
them
is
a
forest.
(You
can
still
get
two
sets
that
are
complete
or
anticomplete,
but
not
such
big
ones.)