#1D. Gomez(UBC: University of British Columbia)H-Index: 1
#2S. Iyaniwura(UBC: University of British Columbia)H-Index: 1
Last. Michael J. Ward(UBC: University of British Columbia)H-Index: 33
view all 4 authors...
Some analytical and numerical results are presented for pattern formation properties associated with novel types of reactiondiffusion (RD) systems that involve the coupling of bulk diffusion in the...
Last. Adriana T. Dawes(OSU: The Ohio State University)H-Index: 9
view all 4 authors...
Virtually all forms of life, from single-cell eukaryotes to complex, highly differentiated multicellular organisms, exhibit a property referred to as symmetry. However, precise measures of symmetry...
Last. Václav Klika(ČVUT: Czech Technical University in Prague)H-Index: 19
view all 4 authors...
In the nearly seven decades since the publication of Alan Turings work on morphogenesis, enormous progress has been made in understanding both the mathematical and biological aspects of his propose...
Periodic patterns form intricate arrays in the vertebrate anatomy, notably the hair and feather follicles of the skin, but also internally the villi of the gut and the many branches of the lung, ki...
In 1952, Alan Turing proposed a theory showing how morphogenesis could occur from a simple two morphogen reactiondiffusion system [Turing, A. M. (1952) Phil. Trans. R. Soc. Lond. A 237, 3772. (doi:...
Last. Václav Klika(ČVUT: Czech Technical University in Prague)H-Index: 19
view all 4 authors...
Elucidating pattern forming processes is an important problem in the physical, chemical and biological sciences. Turing's contribution, after being initially neglected, eventually catalysed a huge ...
First proposed by Turing in 1952, the eponymous Turing instability and Turing pattern remain key tools for the modern study of diffusion-driven pattern formation. In spatially homogeneous Turing sy...
A recent study of canonical activator-inhibitor Schnakenberg-like models posed on an infinite line is extended to include models, such as GrayScott, with bistability of homogeneous equilibria. A ho...
Skin patterns are the first example of the existence of Turing patterns in living organisms. Extensive research on zebrafish, a model organism with stripes on its skin, has revealed the principles ...
#2Moritz Mercker(Interdisciplinary Center for Scientific Computing)H-Index: 9
Last. Anna Marciniak-Czochra(Interdisciplinary Center for Scientific Computing)H-Index: 30
view all 3 authors...
Turing patterns are commonly understood as specific instabilities of a spatially homogeneous steady state, resulting from activatorinhibitor interaction destabilized by diffusion. We argue that thi...
We use cookies to improve your online experience. By continuing to use our website we assume you agree to the placement of these cookies. To learn more, you can find in our Privacy Policy.