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Explicit stable methods for second order parabolic systems

N. Limić
M. Rogina


Puni tekst: engleski pdf 246 Kb

str. 97-115

preuzimanja: 697

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Sažetak

We show that it is possible to construct stable, explicit finite difference
approximations for the classical solution of the initial value problem for the parabolic systems of the form $\partial_tu=A(t,{\bf x})u+f$ on $\R^d$, where
$A(t,{\bf x}) \ = \ \sum_{ij} a_{ij}(t,{\bf x}) \partial_i\partial_j \ + \
\sum_i b_i(t,{\bf x}) \partial_i \ + \ c(t,{\bf x})$. The numerical scheme relies on an approximation of the elliptic operator $A(t,{\bf x})$ on an equidistant mesh by matrices that possess structure of a generator of Markov jump process.
In the case of ${\R}^2$ scaling of second difference operators can be applied to get the necessary structure of approximations, while in the case of $\R^d, \: d > 2$, rotations at grid-knots are performed in order to get the mentioned structure.
Numerical experiments illustrate the theory.

Ključne riječi

parabolic systems; finite difference schemes; Markov chains

Hrčak ID:

853

URI

https://hrcak.srce.hr/853

Datum izdavanja:

20.12.2000.

Posjeta: 1.361 *