These two loci are Paralogous Sequence Variants. Different polymorphisms detected at P25 and 92R7 loci when performing population studies are reported.Grzybowski, Bartosz AInternational Congress
Worst-case Analysis of Distributed Parameter Systems with Application to the 2D Reaction-Diffusion Equation. Optim. Contr. Appl. Met., 31, 433-449.Kishida, M., Braatz, R.D.: `Worst-case analysis of distributed param- eter systems with application to the 2D reaction-diffusion equation', ...
An Exponential Integrator for Finite Volume Discretization of a Reaction-Advection-Diusion Equation. Computers & Mathematics with Applications, 71(9),1875-1897.Tambue, A.: An exponential integrator for finite volume discretization of a reaction- advection-diffusion equation. Comput. Math. Appl. 71(...
Abstract In this paper we consider electro–reaction–diffusion systems modelling the transport of charged species in two–dimensional heterostructures. Our aim is to investigate the case that besides of reactions with source terms of at most second order so called cluster reactions of higher order ...
R. Diffusion and Reaction Phenomena in Solution-Based Healing of Polymer Coatings Using the Diels-Alder Reaction. Macromol. Chem. Phys. 2012, 213, 173-181.P.A. Pratama, A.M. Peterson, G.R. Palmese, Diffusion and reaction phen...
Donea. Time-accurate solution of stabilized convection-diffusion-reaction equations: I. Time and space discretization. Comm. Numer. Methods Engrg., in press.A. Huerta and J. Donea. Time-accurate solution of stabilized convection-diffusion- reaction equations: r. Time and space discretization. ...
This paper uses the attached flow method for solving nonlinear second-order differential equations of the reaction–diffusion type. The key steps of the method consist of the following: (i) reducing the differentiability order by defining the first deriv
This paper uses the attached flow method for solving nonlinear second-order differential equations of the reaction–diffusion type. The key steps of the method consist of the following: (i) reducing the differentiability order by defining the first derivative of the variable as a new variable calle...
Moreover, these can be modeled in the form of partial differential equations, later named reaction–diffusion equations [5]. Despite diffusion being a steady mechanism, Turing proposed that it can also behave as a competitor for some of the other chemical reactions that are auto catalytic. ...
Reaction–diffusion equations are complex nonlinear partial differential equations, and they are typically solved using numerical methods such as the spectral method, the finite difference method, and the finite volume method [1,2]. It is well known that numerically simulating such complex partial diff...