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Exact(3)
The first part is dedicated to the study of the discretization scheme of equation (13).
In order to construct the universal difference scheme (θ-difference scheme), we shall introduce the classic explicit scheme and implicit scheme of equation (3).
Based on these data from Shepherd and Garland, we are able to determine that the likely site of ATP, ADP, and AMP binding is enzyme state 2 the complex E·OAA−2 in the proposed scheme of Equation (19).
Similar(57)
In order to construct the ASE-I scheme, we give some difference schemes of equation (3).
This discretization enables to contruct highly accurate numerical scheme of given equation.
Applying the forward Euler scheme to the system of equations (1), we obtain the discrete-time prey-predator system: left { textstylebegin{array}{l} xto x+delta [ax (1-frac{x}{k} )-frac{bxy}{x+l} ], yto y+delta [1-frac{my}{nx+q}-d ]y, end{array}displaystyle right.
From the strong or weak satisfaction of boundary conditions and a simple analytical discretization scheme a linear system of equations for the boundary sources is obtained.
In practice, stability estimates for the solution of the difference scheme for the hyperbolic system of equations with nonlocal boundary conditions are obtained.
In applications, stability estimates for the solution of the difference scheme for a hyperbolic system of equations with nonlocal boundary conditions are obtained.
Both of the approaches actually imply an exact linearization scheme of measurement equations.
As mentioned above, the approaches in [22] and [23] essentially boil down to an exact linearization scheme of measurement equations.
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Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com