Presented by: 
Jesse Gell-Redman (University of Melbourne)
Date: 
Mon 22 May, 2:00 pm - 3:00 pm
Venue: 
45-204

This talk concerns recent work on the Hodge theorem, a fundamental theorem in differential geometry which identifies a topological feature of a closed manifold (namely its de Rham cohomology) with a special class of differential forms called harmonic forms.  I will give a gentle introduction to this theorem and then explain how it has been extended to certain singular spaces or non-compact spaces, in particular I will explain the deep significance of the Hodge theorem of Hausel-Hunsicker-Mazzeo.  I will then discuss work toward extending the Hodge theorem to certain singular spaces, namely those for which the singularity arises as one approaches a given subspace, near which the geometry brakes up into components which have uniform rates of collapse.  This includes the moduli space of punctured Riemann surfaces with the Weil-Petersson metric, and we will discuss this important example if time permits.  This is based on joint works with R. Melrose and with J. Swoboda.