Extending particle tracking capability with Delaunay triangulation.
暂无分享,去创建一个
[1] David P. Dobkin,et al. The quickhull algorithm for convex hulls , 1996, TOMS.
[2] K. Jaqaman,et al. Robust single particle tracking in live cell time-lapse sequences , 2008, Nature Methods.
[3] Masaru Kuno,et al. Universal emission intermittency in quantum dots, nanorods and nanowires , 2008, 0810.2509.
[4] Sung Chul Bae,et al. Single-molecule observation of long jumps in polymer adsorption. , 2013, ACS nano.
[5] Paul L. Rosin. Measuring shape: ellipticity, rectangularity, and triangularity , 2003, Machine Vision and Applications.
[6] Adam Cohen Simonsen,et al. Domain shapes, coarsening, and random patterns in ternary membranes. , 2007, Langmuir : the ACS journal of surfaces and colloids.
[7] Yan Shi,et al. An adaptive spatial clustering algorithm based on delaunay triangulation , 2011, Comput. Environ. Urban Syst..
[8] Wenping Wang,et al. Reconstructing B-spline Curves from Point Clouds--A Tangential Flow Approach Using Least Squares Minimization , 2005, International Conference on Shape Modeling and Applications 2005 (SMI' 05).
[9] Aurélie Dupont,et al. Nanoscale three-dimensional single particle tracking. , 2011, Nanoscale.
[10] Chih-Chen Hsieh,et al. An experimental study of DNA rotational relaxation time in nanoslits , 2007 .
[11] Jovisa D. Zunic,et al. Measuring Shape Ellipticity , 2011, CAIP.
[12] Erik Luijten,et al. Psl trails guide exploration and microcolony formation in early P. aeruginosa biofilms , 2013, Nature.
[13] Ickjai Lee,et al. Multi-Level Clustering and its Visualization for Exploratory Spatial Analysis , 2002, GeoInformatica.
[14] Michael J Rust,et al. Sub-diffraction-limit imaging by stochastic optical reconstruction microscopy (STORM) , 2006, Nature Methods.
[15] P Cignoni,et al. DeWall: A fast divide and conquer Delaunay triangulation algorithm in Ed , 1998, Comput. Aided Des..
[16] Paul H. C. Eilers,et al. Flexible smoothing with B-splines and penalties , 1996 .
[17] Ching Y. Suen,et al. Thinning Methodologies - A Comprehensive Survey , 1992, IEEE Trans. Pattern Anal. Mach. Intell..
[18] Anil K. Jain. Data clustering: 50 years beyond K-means , 2008, Pattern Recognit. Lett..
[19] Steve Granick,et al. Automated single-molecule imaging to track DNA shape. , 2011, Langmuir : the ACS journal of surfaces and colloids.
[20] AurenhammerFranz. Voronoi diagramsa survey of a fundamental geometric data structure , 1991 .
[21] K. Jacobson,et al. Single-particle tracking: applications to membrane dynamics. , 1997, Annual review of biophysics and biomolecular structure.
[22] J. Shimada,et al. Moments for DNA topoisomers: The helical wormlike chain , 1988, Biopolymers.
[23] Lance A Davidson,et al. Microscopy tools for quantifying developmental dynamics in Xenopus embryos. , 2012, Methods in molecular biology.
[24] X. Fang,et al. Single-molecule fluorescence imaging in living cells. , 2013, Annual review of physical chemistry.
[25] Michael J Saxton,et al. Single-particle tracking: connecting the dots , 2008, Nature Methods.
[26] Kristina D. Micheva,et al. Single-Synapse Analysis of a Diverse Synapse Population: Proteomic Imaging Methods and Markers , 2010, Neuron.
[27] W E Moerner,et al. New directions in single-molecule imaging and analysis , 2007, Proceedings of the National Academy of Sciences.
[28] Sung Chul Bae,et al. Confining potential when a biopolymer filament reptates. , 2010, Physical review letters.
[29] X. Zhuang,et al. Statistical deconvolution for superresolution fluorescence microscopy. , 2012, Biophysical journal.
[30] Mark Kastantin,et al. High throughput single molecule tracking for analysis of rare populations and events. , 2012, The Analyst.
[31] Franz Aurenhammer,et al. Voronoi diagrams—a survey of a fundamental geometric data structure , 1991, CSUR.
[32] E. T. Y. Lee,et al. Comments on some B-spline algorithms , 1986, Computing.
[33] J. Lippincott-Schwartz,et al. Imaging Intracellular Fluorescent Proteins at Nanometer Resolution , 2006, Science.