Daniel Hug
Daniel Hug
Professor of Mathematics, Karlsruhe Institute of Technology (KIT)
Verified email at kit.edu
Cited by
Cited by
The Orlicz-Brunn-Minkowski theory: a general framework, additions, and inequalities
RJ Gardner, D Hug, W Weil
Journal of Differential Geometry 97 (3), 427-476, 2014
Minkowski tensor shape analysis of cellular, granular and porous structures
GE Schröder‐Turk, W Mickel, SC Kapfer, MA Klatt, FM Schaller, ...
Advanced Materials 23 (22‐23), 2535-2553, 2011
A local Steiner–type formula for general closed sets and applications
D Hug, G Last, W Weil
Mathematische Zeitschrift 246 (1-2), 237-272, 2004
Minkowski tensors of anisotropic spatial structure
GE Schröder-Turk, W Mickel, SC Kapfer, FM Schaller, B Breidenbach, ...
New Journal of Physics 15 (8), 083028, 2013
On the Lp Minkowski Problem for Polytopes
D Hug, E Lutwak, D Yang, G Zhang
Discrete & Computational Geometry 33 (4), 699-715, 2005
Operations between sets in geometry
RJ Gardner, D Hug, W Weil
arXiv preprint arXiv:1205.4327, 2012
The dual Orlicz–Brunn–Minkowski theory
RJ Gardner, D Hug, W Weil, D Ye
Journal of Mathematical Analysis and Applications 430 (2), 810-829, 2015
Contributions to affine surface area
D Hug
manuscripta mathematica 91 (1), 283-301, 1996
Random polytopes
D Hug
Stochastic geometry, spatial statistics and random fields, 205-238, 2013
Integral geometry of tensor valuations
D Hug, R Schneider, R Schuster
Advances in Applied Mathematics 41 (4), 482-509, 2008
Intrinsic volumes and polar sets in spherical space
F Gao, D Hug, R Schneider
Math. Inst., 2003
The space of isometry covariant tensor valuations
D Hug, R Schneider, R Schuster
St. Petersburg Mathematical Journal 19 (1), 137-158, 2008
The limit shape of the zero cell in a stationary Poisson hyperplane tessellation
D Hug, M Reitzner, R Schneider
The Annals of Probability 32 (1B), 1140-1167, 2004
Asymptotic shapes of large cells in random tessellations
D Hug, R Schneider
GAFA Geometric And Functional Analysis 17 (1), 156-191, 2007
Curvature relations and affine surface area for a general convex body and its polar
D Hug
Results in Mathematics 29 (3-4), 233-248, 1996
Kinematic formulas for tensor valuations
A Bernig, D Hug
Journal für die reine und angewandte Mathematik 2018 (736), 141-191, 2018
Second-order properties and central limit theorems for geometric functionals of Boolean models
D Hug, G Last, M Schulte
The Annals of Applied Probability 26 (1), 73-135, 2016
Large Poisson-Voronoi cells and Crofton cells
D Hug, M Reitzner, R Schneider
Advances in applied probability, 667-690, 2004
On support measures in Minkowski spaces and contact distributions in stochastic geometry
D Hug, G Last
Annals of probability, 796-850, 2000
Measures, curvatures and currents in convex geometry
D Hug
Verlag nicht ermittelbar, 2000
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