Christian Seifert: On fractional powers of sectorial operators
Time: Wed 2022-05-25 10.30 - 11.30
Location: Kräftriket, House 6, Room 306 and Zoom
Video link: Meeting ID: 618 4952 4438
Participating: Christian Seifert (TU Hamburg, Germany)
In 2007, Caffarelli and Silvestre published a paper how to obtain the fractional Laplacian, i.e. \((-\Delta)^\alpha\) for some \(\alpha\in (0,1)\), by means of an extension problem. Put differently, the solution of an (abstract) ODE gives rise to the fractional Laplacian. Since then there has been quite a few steps to generalise the approach, first to operators on Hilbert spaces and then to some classes of operators to Banach spaces. In this talk we will explain the method and show that for a general sectorial operator in a Banach space the extension problem can be used to obtain fractional powers.