Friday, January 13, 2017 3:30 pm
-
3:30 pm
EST (GMT -05:00)
Ken Dykema, Texas A & M University
"Commuting operators in finite von Neumann algebras"
We
find
a
joint
spectral
distribution
measure
for
families
of
commuting
elements
of
a
finite
von
Neumann
algebra.
This
generalizes
the
Brown
measure
for
single
operators.
Furthermore,
we
find
a
lattice
(based
on
Borel
sets)
consisting
of
hyperinvariant
projections
that
decompose
the
spectral
distribution
measure.
This
leads
to
simultaneous
upper
triangularization
results
for
commuting
operators.
(Joint work with Ian Charlesworth, Fedor Sukochev and Dmitriy Zanin.)