HIGHLIGHTS
- who: Jacques-Olivier Lachaud and colleagues from the (UNIVERSITY) have published the paper: Corrected Curvature Measures, in the Journal: (JOURNAL)
- what: The authors show that the corrected curvature measures of_(S, u) approximate well Federer's curvature measures of a smooth surface X, provided that S is close to X in the Hausdorff sense and that u is close to the normal vector field of X. - The authors show that the estimators outperform also in practice state-of-the-art methods like digital integral invariants . The authors provide stability results for curvature measures with respect . . .
If you want to have access to all the content you need to log in!
Thanks :)
If you don't have an account, you can create one here.