Abstract
This article is devoted to the study of high order difference methods for the fractional diffusion-wave equation. The time fractional derivatives are described in the Caputo’s sense. A compact difference scheme is presented and analyzed. It is shown that the difference scheme is unconditionally convergent and stable in L ∞ -norm. The convergence order is O ( τ 3 - α + h 4 ) . Two numerical examples are also given to demonstrate the theoretical results.
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