Events

This talk is about an instance of a Riemann-Hilbert (RH) problem from refined  Donaldson-Thomas theory. First we will review the solution to the RH problem attached to an uncoupled BPS structure, then we will discuss the statement and a solution to an associated quantized RH problem, corresponding to refined DT theory. The foundation of the topic was presented in the previous talk by Gaetan.

https://bbb.mpim-bonn.mpg.de/b/gae-a7y-hhd

The topological period-index problem (TPIP), an analogue to the long-standing period-index conjecture in algebraic geometry, concerns a given torsion class α in the 3rd integral cohomology group of a topological space X and various principal PU_n-bundles over X associated to α. Here PU_n is the projective unitary group of order n, i.e., the unitary group U_n modulo invertible scalars. TPIP was first considered by Antieau and Williams in an attempt to find a counterexample to the period-index conjecture, but later turned out to have its own significance.

We will start an online reading group on DT invariants, stability conditions and geometry, to take place on
Fridays 10-11.30am. The first talk is background and will take place on Friday 10 (this week).