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Line 180: \| first4 = M. \| last4 = Rudzsky \| title = Fast geodesic active contours \| journal = IEEE Transactions on Image Processing \| year = 2001 \| volume = {10 \| pages = 1467-1475 \| issue = 10}}</ref> for rapid computation of this segmentation method. The uniqueness and existence of this combined model were proven in&nbsp:;<ref name=":GuixCPAA09">{{Cite journal \| first1 = L. \| last1 = Guilot \| first2 = M. \| last2 = Bergounioux \| title = Existence and uniqueness results for the gradient vector flow and geodesic active contours mixed model \| journal = Communications on Pure and Applied Analysis \| year = 2009 \| volume = 8 \| issue = 4 \| pages = 1333-1349}}</ref>. Line 187: to achieve even better segmentation for images with complex geometric objects. GVF has been used to find both inner, central, and central cortical surfaces in the analysis of brain images <ref name=":HanxNI04"/>, as shown in Figure 4. The process first finds the inner surface using a three-dimensional geometric deformable model with conventional forces. Then the central▼ ~~central, and central cortical surfaces in the analysis of brain~~ surface is found by exploiting the central tendency property of GVF. In particular, the cortical membership function of the human brain▼ ~~images~\cite{HanxNI04}, as shown in Figure~\ref{fig:Cortex}. The~~ cortex, derived using a fuzzy classifier, is used to compute GVF as if itself were a thick edge map. The computed GVF vectors point towards▼ ~~process first finds the inner surface using a three-dimensional~~ the center of the cortex and can then be used as external forces to drive the inner surface to the central surface. Finally, another▼ ▲geometric deformable model with conventional forces. Then the central geometric deformable model with conventional forces is used to drive the central surface to a position on the outer surface of the cortex.▼ ▲surface is found by exploiting the central tendency property of GVF. ~~In particular, the cortical membership function of the human brain~~ ▲cortex, derived using a fuzzy classifier, is used to compute GVF as if ~~itself were a thick edge map. The computed GVF vectors point towards~~ ▲the center of the cortex and can then be used as external forces to ~~drive the inner surface to the central surface. Finally, another~~ ~~geometric deformable model with conventional forces is used to drive~~ ▲the central surface to a position on the outer surface of the cortex. Several notable recent applications of GVF include constructing graphs for optimal surface segmentation in spectral-___domain optical coherence tomography volumes~~~\cite{~~ <ref name=":MirxCMIG17}"/>, a learning based probabilistic GVF active contour formulation to give more weights to objects ▼ ~~optimal surface segmentation in spectral-___domain optical coherence~~ of interest in ultrasound image segmentation~~~\cite{~~ <ref name =":HafxCBM14}"/>, and an adaptive multi-feature GVF active contour ▼ ▲tomography volumes~\cite{MirxCMIG17}, a learning based probabilistic GVF active contour for improved ultrasound image segmentation without hand tuned paramaters <ref name=":RodxJVCIR13>{{Cite journal \| title=Multi-feature gradient vector flow snakes for adaptive segmentation of the ultrasound images of breast cancer \| last1 = Rodtook \| first1 = A. \| last2 = Makhanov \| first2 = S.S. \| journal=Journal of Visual Communication and Image Representation \| volume=24 \| issue = 8 \| pages=1414-1430 \| year=2013 \| publisher=Elsevier}}</ref> ~~formulation to give more weights to objects of interst in ultrasound image~~ ▲segmentation~\cite{HafxCBM14}, and an adaptive multi-feature GVF active contour ~~for improved ultrasound image segmentation without hand tuned~~ ~~paramaters~\cite{RodxJVCIR13}.~~ ==Related Concepts==

Gradient vector flow: Difference between revisions