An application of $L^1$ estimates for oscillating integrals to parabolic like semi-linear structurally damped $\sigma$-evolution models

TL;DR

This paper develops $L^1$ estimates for oscillating integrals to analyze solutions of semi-linear structurally damped $\sigma$-evolution models, establishing global existence results for small initial data in Sobolev spaces.

Contribution

It introduces new $L^1$ estimates for oscillating integrals in the context of damped $\sigma$-evolution models and proves global existence of solutions with minimal regularity assumptions.

Findings

Established $L^1$ estimates for oscillating integrals using Bessel functions and Faà di Bruno's formula.

Proved global existence of small data Sobolev solutions for the semi-linear models.

Extended analysis to initial data with additional $L^m$ regularity.

Abstract

We study the following Cauchy problems for semi-linear structurally damped $\sigma$-evolution models: \begin{equation*} u_{tt}+ (-\Delta)^\sigma u+ \mu (-\Delta)^\delta u_t = f(u,u_t),\, u(0,x)= u_0(x),\, u_t(0,x)=u_1(x) \end{equation*} with $\sigma \ge 1$, $\mu>0$ and $\delta \in (0,\frac{\sigma}{2})$. Here the function $f(u,u_t)$ stands for the power nonlinearities $|u|^{p}$ and $|u_t|^{p}$ with a given number $p>1$. We are interested in investigating $L^{1}$ estimates for oscillating integrals in the presentation of the solutions to the corresponding linear models with vanishing right-hand sides by applying the theory of modified Bessel functions and Fa\`{a} di Bruno's formula. By assuming additional $L^{m}$ regularity on the initial data, we use $(L^{m}\cap L^{q})- L^{q}$ and $L^{q}- L^{q}$ estimates with $q\in (1,\infty)$ and $m\in [1,q)$, to prove the global (in time) existence of small data Sobolev solutions to the above semi-linear models from suitable function spaces basing on $L^q$ spaces.