Numerical analysis for distributed order differential equations
21/05/2008 Wednesday 21st May 2008, 16:00 (Room P3.10, Mathematics Building)
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Neville Ford, University of Chester
In this talk we present and analyse a numerical method for the solution of a distributed order differential equation of the general form $\int_0^m \mathcal{A}(r, D^r_*u(t)) \, dr = f(t)$, where the derivative $D^r_*$ is taken to be a fractional derivative of Caputo type of order $r$. We give a convergence theory for our method and conclude with some numerical examples.
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