Gastvortrag von Prof. Frederic Leymarie am 5. Juli 2010

Modellierung medizinischer Daten aus unstrukturierter 3D-Punktwolken mithilfe von Medial Scaffolds


Prof. Frederic Fol Leymarie von der Universität London (Goldsmiths College) wird einen Vortrag zum Thema "Modellierung biomedizinischer Daten aus unstrukturierten 3D Punktwolken mithilfe von Medial Scaffolds" halten. Dieser spannende Vortrag wird am Montag, dem 5. Juli 2010, um 15 Uhr s.t. im Raum F435 (Stahlbausaal) im Hauptgebäude der Leibniz Universität Hannover stattfinden.

Zu diesem Vortrag laden wir alle Interessenten ganz herzlich ein!


A General Approach to Model Biomedical Data from 3D Unorganised Point Clouds with Medial Scaffolds

Joint work with: Dr. Ming-Ching Chang (GE, Global Research), Dr. Celina Imielinska (Columbia Uni., Bioinformatics), and Prof. Ben Kimia (Brown Uni., Engineering)

Shape understanding and modeling is a central task in biomedical imaging and associated applications. We present the latest developments in modeling 3D biomedical data via the Medial Scaffold (MS), a 3D acyclic oriented graph representation of the Medial Axis (MA). Both can be computed as the result of the singularities of a geometric wave propagation simulation.


We consider here some of the potential applications of this shape model in the realm of biomedical imaging. We can reconstruct complex object surfaces and make explicit the coarse-scale structures, which are ready-to-use in a number of practical applications, including: morphological measurement for cortex or bone thickness, centerline extraction (curve skeleton) for tracheotomy or colonoscopy, surface partitioning for cortical or anatomical surface classification, as well as registration and matching of shapes of tumors or carpal bones.


The MS permits to automatically and efficiently map an unorganised point cloud, i.e., simple 3D coordinates of point samples, to a coherent surface set and associated approximate MA. The derived MS is used to further recover significant medium and large scale features, such as surface ridges and main axial symmetries. The radius field of the MS provides an intuitive definition for morphological measurements, while the graph structure made explicit by the MS is useful for shape registration and matching applications.


Mehr über Prof. Leymarie: www.folleymarie.com

     







23.06.10, 14:24