L2-growth property for wave equations with higher derivative terms
Abstract
We consider the Cauchy problems in the whole space for wave equations with higher derivative terms. We derive sharp growth estimates of the L2-norm of the solution itself in the case of the space 1, 2 dimensions. By imposing the weighted L1-initial velocity, we can get the lower and upper bound estimates of the solution itself. In three or more dimensions, we observe that the L2-growth behavior of the solution never occurs in the (L2 L1)-framework of the initial data.
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