Fractional Generalization of Higher-Order Diffusion
Abstract
A fractional generalization of the second author's higher-order diffusion theory is given and fundamental solutions are obtained. The extension from the integer to the fractional case involves a proper treatment of the fractional Laplacian of Riesz type. This is done with analogy to an earlier treatment in extending the second author's gradient elasticity model from the integer to the fractional case.
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