Faculty of Mathematics
Collaborative Research Centre 701
Spectral Structures and Topological Methods in Mathematics
stripes SFB701

Project A6

Analysis and stochastic processes on metric measure spaces


Principal Investigator(s) Other Investigators
Alexander Grigor'yan
Michael Hinz
Eryan Hu
Meng Yang

Summary:

The purpose of the project is to investigate the properties of reversible stochastic processes on metric measure spaces in relation with the geometric properties of these spaces.

Recent Preprints:

17017 Existence of positive solutions to some nonlinear equations on locally finite graphs PDF | PS.GZ
17016 Kazdan-Warner equation on graph PDF | PS.GZ
17015 Yamabe type equations on finite graphs PDF | PS.GZ
17014 Heat kernel estimates on connected sums of parabolic manifolds PDF | PS.GZ
17013 Lower estimates of heat kernels for non-local Dirichlet forms on metric measure spaces PDF | PS.GZ
17012 Nearly hyperharmonic functions and Jensen measures PDF | PS.GZ
16038 Reduced functions and Jensen measures PDF | PS.GZ
16005 Darning and gluing of diffusions PDF | PS.GZ
15040 Pointwise estimates of solutions to semilinear elliptic equations and inequalities PDF | PS.GZ
15037 Fundamental groupoids of digraphs and graphs PDF | PS.GZ