Ginkel, I., & Umlauf G. (2006).  Controlling a subdivision tuning method. (Cohen, A., Merrien J.-L., & Schumaker L.L., Ed.).Curve and Surface Fitting.

• BibTeX

SubTuning.pdf (553.79 KB)

Bobach, T., Bertram M., & Umlauf G. (2006).  Issues and implementation of C^1 and C^2 natural neighbor interpolation. (G. al., B. et, Ed.).Advances in Visual Computing. Part II.

• BibTeX

C1C2NeighborInterp.pdf (3.87 MB)

Ginkel, I., & Umlauf G. (2006).  Loop subdivision with curvature control. (Polthier, K., & Sheffer A., Ed.).Eurographics Symposium on Geometry Processing.

• BibTeX

LoopSubCurv.pdf (6.03 MB)

Bobach, T., & Umlauf G. (2006).  Natural neighbor interpolation and order of continuity. (Hagen, H., Kerren A., & Dannenmann P., Ed.).GI Lecture Notes in Informatics, Visualization of Large and Unstructured Data Sets.

• BibTeX

NatNeighborInterp.pdf (1.47 MB)

Prautzsch, H., & Umlauf G. (2006).  Parametrizations for triangular G^k spline surfaces of low degree. ACM Transactions on Graphics. 24, 1281-1293.

• BibTeX

GkSplineSurf.pdf (539.25 KB)

Lehner, B., Umlauf G., Hamann B., & Ustin S. (2006).  Topographic distance functions for interpolation of meteorological data. (Hagen, H., Kerren A., & Dannenmann P., Ed.).GI Lecture Notes in Informatics, Visualization of Large and Unstructured Data Sets.

• BibTeX

TopoDistFunc.pdf (2.27 MB)

Umlauf, G. (2005).  Analysis and tuning of subdivision schemes. (Jüttler, B., Ed.).Proceedings of Spring Conference on Computer Graphics SCCG 2005.

• BibTeX

ATSubSchemes.pdf (765.94 KB)

Ginkel, I., Peters J., & Umlauf G. (2005).  On normals and control nets. (Martin, R., Bez H., & M. 233-239 S. pages =, Ed.).Mathematics of Surfaces XI.

• BibTeX

NormalsControlNets.pdf (117.42 KB)

Umlauf, G. (2004).  A technique for verifying the smoothness of subdivision schemes. (Lucian, M.L., & Neamtu M., Ed.).Geometric Modeling and Computing: Seattle 2003.

• BibTeX

subSchemes.pdf (110.4 KB)

Peters, J., & Umlauf G. (2001).  Computing curvature bounds for bounded curvature subdivision. Computer Aided Geometric Design. 18, 455-462.

• BibTeX

CurvatBnd.pdf (179.48 KB)

Umlauf, G. (2000).  Analyzing the characteristic map of triangular subdivision schemes. Constructive Approximation. 16, 145-155.

• BibTeX

LoopCharMap.pdf (431.79 KB)

Prautzsch, H., & Umlauf G. (2000).  A G^1 and a G^2 subdivision scheme for trinagular nets. International Journal on Shape Modelling. 6, 21-35.

• BibTeX

G1G2TriAlgo.pdf (2.61 MB)

Peters, J., & Umlauf G. (2000).  Gaussian and mean curvature of subdivision surfaces. (Cipolla, R., & Martin R., Ed.).The Mathematics of Surfaces IX.

• BibTeX

SubCurvat.pdf (112.52 KB)

Prautzsch, H., & Umlauf G. (1999).  Improved triangular subdivision schemes. (Wolter, F.-E., & Patrikalakis N.M., Ed.).Proceedings of the CGI '98.

• BibTeX

TriSub.pdf (1.73 MB)

Prautzsch, H., & Umlauf G. (1999).  Triangular G^2 splines. (Laurent, P.-L., Sablonniere P., & Schumaker L.L., Ed.).Curve and Surface Design.

• BibTeX

TriG2Splines.pdf (393.87 KB)

Prautzsch, H., & Umlauf G. (1998).  A G^2 subdivision algorithm. Computing. 13, 217-224.

• BibTeX

g2algorithm.pdf (196.14 KB)