A Random Walk Approach to Transport in Tissues and Complex Media: From Microscale Descriptions to Macroscale Models
暂无分享,去创建一个
[1] Enrico Gratton,et al. Free Extracellular Diffusion Creates the Dpp Morphogen Gradient of the Drosophila Wing Disc , 2012, Current Biology.
[2] Jay A. Stotsky,et al. Growth control in the Drosophila wing disk , 2020, Wiley interdisciplinary reviews. Systems biology and medicine.
[3] R. Palmer,et al. Godzilla-dependent transcytosis promotes Wingless signalling in Drosophila wing imaginal discs , 2016, Nature Cell Biology.
[4] Rayanne A. Luke,et al. Parameter Estimation for Evaporation-Driven Tear Film Thinning , 2020, Bulletin of Mathematical Biology.
[5] E. Montroll,et al. Random walks and generalized master equations with internal degrees of freedom. , 1977, Proceedings of the National Academy of Sciences of the United States of America.
[6] J. Dobnikar,et al. E. coli superdiffusion and chemotaxis-search strategy, precision, and motility. , 2009, Biophysical journal.
[7] M. Shlesinger,et al. Stochastic theory of multistate diffusion in perfect and defective systems. II. Case studies , 1979 .
[8] M. O’Connor,et al. Synergistic signaling by two BMP ligands through the SAX and TKV receptors controls wing growth and patterning in Drosophila. , 1998, Development.
[9] M. Shlesinger,et al. Stochastic theory of multistate diffusion in perfect and defective systems. I. Mathematical formalism , 1979 .
[10] E. Montroll,et al. CHAPTER 2 – On an Enriched Collection of Stochastic Processes* , 1979 .
[11] S. Havlin,et al. Diffusion in disordered media , 2002 .
[12] C. Dahmann,et al. Wingless signaling and the control of cell shape in Drosophila wing imaginal discs. , 2009 .
[13] H. Othmer,et al. A Model for the Hippo Pathway in the Drosophila Wing Disc , 2018, Biophysical journal.
[14] H. Othmer. A continuum model for coupled cells , 1983, Journal of mathematical biology.
[15] P. Bressloff,et al. Stochastic models of intracellular transport , 2013 .
[16] G. Weiss,et al. Random Walks: Theory and Selected Applications , 2007 .
[17] Elliott W. Montroll,et al. Random Walks on Lattices. III. Calculation of First‐Passage Times with Application to Exciton Trapping on Photosynthetic Units , 1969 .
[18] Samuel A. Isaacson,et al. The Reaction-Diffusion Master Equation as an Asymptotic Approximation of Diffusion to a Small Target , 2009, SIAM J. Appl. Math..
[19] Hamid Teimouri,et al. All-time dynamics of continuous-time random walks on complex networks. , 2013, The Journal of chemical physics.
[20] T. Kornberg,et al. Cytonemes and the dispersion of morphogens , 2014, Wiley interdisciplinary reviews. Developmental biology.
[21] Paul C Bressloff,et al. Bidirectional transport model of morphogen gradient formation via cytonemes , 2018, Physical biology.
[22] Y. Kalaidzidis,et al. Kinetics of Morphogen Gradient Formation , 2007, Science.
[23] G. Schubiger,et al. Lumenal transmission of decapentaplegic in Drosophila imaginal discs. , 2002, Developmental cell.
[24] N. Kampen,et al. Stochastic processes in physics and chemistry , 1981 .
[25] H. Othmer,et al. Improving Parameter Inference from FRAP Data: an Analysis Motivated by Pattern Formation in the Drosophila Wing Disc , 2017, Bulletin of mathematical biology.
[26] T. Kornberg,et al. Cytoneme-Mediated Contact-Dependent Transport of the Drosophila Decapentaplegic Signaling Protein , 2014, Science.
[27] P. A. P. Moran,et al. An introduction to probability theory , 1968 .
[28] K. Shuler,et al. Asymptotic properties of multistate random walks. I. Theory , 1985 .
[29] Scott A. McKinley,et al. Renewal Reward Perspective on Linear Switching Diffusion Systems in Models of Intracellular Transport , 2019, Bulletin of mathematical biology.
[30] Shlomo Havlin,et al. Some properties of a random walk on a comb structure , 1986 .
[31] Kwang-Wook Choi. Upstream paths for Hippo signaling in Drosophila organ development , 2018, BMB reports.
[32] A. Berezhkovskii,et al. From normal to anomalous diffusion in comb-like structures in three dimensions. , 2014, The Journal of chemical physics.
[33] O. Shimmi,et al. Dally regulates Dpp morphogen gradient formation by stabilizing Dpp on the cell surface. , 2008, Developmental biology.
[34] Thomas Pfohl,et al. Reaction front propagation of actin polymerization in a comb-reaction system , 2016 .
[35] J. Roerdink,et al. Asymptotic properties of multistate random walks. II. Applications to inhomogeneous periodic and random lattices , 1985 .
[36] Frank Jülicher,et al. Understanding morphogenetic growth control — lessons from flies , 2011, Nature Reviews Molecular Cell Biology.
[37] M. Affolter,et al. A nanobody-based toolset to investigate the role of protein localization and dispersal in Drosophila , 2017, bioRxiv.
[38] David M. Umulis,et al. The Intersection of Theory and Application in Elucidating Pattern Formation in Developmental Biology. , 2009, Mathematical modelling of natural phenomena.
[39] J. Klafter,et al. The random walk's guide to anomalous diffusion: a fractional dynamics approach , 2000 .
[40] Franz Aurenhammer,et al. Voronoi Diagrams and Delaunay Triangulations , 2013 .
[41] Marcos González-Gaitán,et al. Gradient Formation of the TGF-β Homolog Dpp , 2000, Cell.
[42] R. Bracewell. The Fourier Transform and Its Applications , 1966 .
[43] H. Othmer,et al. Models of dispersal in biological systems , 1988, Journal of mathematical biology.
[44] E. Montroll,et al. Random Walks on Lattices. II , 1965 .
[45] Sougata Roy,et al. Cytonemes as specialized signaling filopodia , 2014, Development.
[46] H. Othmer,et al. A theoretical analysis of filament length fluctuations in actin and other polymers , 2011, Journal of mathematical biology.
[47] L E Scriven,et al. Instability and dynamic pattern in cellular networks. , 1971, Journal of theoretical biology.
[48] H. Othmer,et al. A stochastic analysis of first-order reaction networks , 2005, Bulletin of mathematical biology.
[49] Paul C. Bressloff,et al. Direct vs. Synaptic Coupling in a Mathematical Model of Cytoneme-Based Morphogen Gradient Formation , 2018, SIAM J. Appl. Math..
[50] H Scher,et al. Random walk theory of a trap-controlled hopping transport process. , 1981, Proceedings of the National Academy of Sciences of the United States of America.
[51] H. Othmer,et al. A new method for choosing the computational cell in stochastic reaction–diffusion systems , 2012, Journal of mathematical biology.
[52] Grigorios A. Pavliotis,et al. Multiscale Methods: Averaging and Homogenization , 2008 .
[53] M. Gibson,et al. Cell topology, geometry, and morphogenesis in proliferating epithelia. , 2009, Current topics in developmental biology.
[54] A. Iomin. Richardson diffusion in neurons. , 2019, Physical review. E.
[55] U. Tepass,et al. Adherens junctions: from molecules to morphogenesis , 2010, Nature Reviews Molecular Cell Biology.
[56] Continuum description of anomalous diffusion on a comb structure , 1998 .
[57] Goldhirsch,et al. Analytic method for calculating properties of random walks on networks. , 1986, Physical review. A, General physics.
[58] Rolf Klein,et al. Voronoi Diagrams and Delaunay Triangulations , 2013, Encyclopedia of Algorithms.
[59] A. Berezhkovskii,et al. Biased diffusion in three-dimensional comb-like structures. , 2015, The Journal of chemical physics.
[60] F. Henyey,et al. On the number of distinct sites visited in 2D lattices , 1982 .
[61] Samuel Karlin,et al. A First Course on Stochastic Processes , 1968 .
[62] V. Méndez,et al. Reaction-subdiffusion front propagation in a comblike model of spiny dendrites. , 2013, Physical review. E, Statistical, nonlinear, and soft matter physics.
[63] A. Iomin. Subdiffusion on a fractal comb. , 2011, Physical review. E, Statistical, nonlinear, and soft matter physics.
[64] R. Gorenflo,et al. Fractional calculus and continuous-time finance II: the waiting-time distribution , 2000, cond-mat/0006454.
[65] Goldhirsch,et al. Biased random walk on networks. , 1987, Physical review. A, General physics.
[66] S. Chandrasekhar. Stochastic problems in Physics and Astronomy , 1943 .
[67] M. Shlesinger. Asymptotic solutions of continuous-time random walks , 1974 .