- Construction of diffusion processes on fractals, d-sets, and general metric measure spaces
- Localization and Tensorization Properties of the Curvature-Dimension Condition for Metric Measure Spaces
- Ricci Bounds for Euclidean and Spherical Cones Kathrin Bacher, Karl-Theodor Sturm
- CONVEX FUNCTIONALS OF PROBABILITY MEASURES AND NONLINEAR DIFFUSIONS ON MANIFOLDS
- On a Liouville type theorem for harmonic maps to convex spaces via Markov chains
- Contemporary Mathematics Probability Measures on Metric Spaces of Nonpositive
- Localization and Tensorization Properties of the Curvature-Dimension Condition for Metric Measure Spaces.
- Generalized Ricci Bounds and Convergence of Metric Measure Bornes Generalisees de la Courbure Ricci et Convergence des
- Rheinische Friedrich-Wilhelms-Universitat Bonn On the Geometry of Metric Measure Spaces
- Expectations and Martingales in Metric Spaces T. Christiansen and K.T. Sturm
- Generalized Orlicz Spaces and Wasserstein Distances for Convex-Concave Scale Functions
- COUPLING, REGULARITY AND CURVATURE KARL-THEODOR STURM
- Wasserstein space over the Wiener space Shizan FANGa,b
- Elect. Comm. in Probab. 8 (2003) 110 ELECTRONIC COMMUNICATIONS
- MAXIMAL COUPLING OF EUCLIDEAN BROWNIAN ELTON P. HSU AND KARL-THEODOR STURM
- Schriftenverzeichnis [48] : Generalized Ricci curvature bounds and convergence of metric measure spaces.
- Mass transportation and rough curvature bounds for discrete spaces Anca-Iuliana Bonciocata, Karl-Theodor Sturm,b
- Extended Version On the Geometry of Metric Measure Spaces. II.
- Entropic Measure and Wasserstein Diffusion Max-K. von Renesse, Karl-Theodor Sturm
- Stochastische Analysis Karl-Theodor Sturm
- Entropic Measure on Multidimensional Spaces Karl-Theodor Sturm
- A Semigroup Approach to Harmonic Maps Karl-Theodor Sturm
- Optimal Transport from Lebesgue to Poisson Martin Huesmann & Karl-Theodor Sturm
- A Monotone Approximation to the Wasserstein Diffusion Karl-Theodor Sturm
- Non-contraction of heat flow on Minkowski spaces Shin-ichi Ohta
- Heat Flow on Finsler Manifolds Shin-ichi Ohta
- A Curvature-Dimension Condition for Metric Measure Spaces Une Condition de Type Courbure-Dimension pour des Espaces
- Stochastische Prozesse Sommersemester 2011
- Transport Inequalities, Gradient Estimates, Entropy and Ricci Curvature
- CDloc(K, N) IMPLIES MCP(K, N) FABIO CAVALLETTI AND KARL-THEODOR STURM
