Decay estimates for beam equations with potentials on the line
Abstract
This paper is devoted to the time decay estimates for the following beam equation with a potential on the line: ∂t2 u + ( 2 + m2 + V(x) ) u = 0, \ \ u(0, x) = f(x), ∂t u(0, x) = g(x), where V is a real-valued decaying potential on R, and m ∈ R. Let H = 2 + V and Pac(H) denote the projection onto the absolutely continuous spectrum of H. Then for m = 0, we establish the following decay estimates of the solution operators: \| (t H) Pac(H)\|L1 → L∞ + \| (t H)t H Pac(H)\|L1 → L∞ |t|-12. But for m ≠ 0, the solutions have different time decay estimates from the case where m=0. Specifically, the L1-L∞ estimates of (t H + m2) and (t H + m2)H + m2 are bounded by O(|t|-14) in the low-energy part and O(|t|-12) in the high-energy part. It is noteworthy that all these results remain consistent with the free cases (i.e., V = 0) whatever zero is a regular point or a resonance of H. As consequences, we establish the corresponding Strichartz estimates, which are fundamental to study nonlinear problems of beam equations.
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