Event Detail

Event Type: 
Analysis Seminar
Monday, May 19, 2014 - 05:00
Kidder 280

Speaker Info

Local Speaker: 

We present ideas from a proof of existence of solutions to the two-dimensional incompressible Euler equations with vorticity bounded and with velocity growing more slowly than a power of the logarithm at infinity.  We place no integrability assumptions on the vorticity.  The proof of existence relies on mapping properties of a commutator operator [b,T], where b is a BMO function and T is a product of Riesz transforms.