On blowup for the supercritical quadratic wave equation

E. Csobo, Irfan Glogi'c, Birgit Schorkhuber
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引用次数: 7

Abstract

We study singularity formation for the focusing quadratic wave equation in the energy supercritical case, i.e., for $d \ge 7$. We find in closed form a new, non-trivial, radial, self-similar blowup solution $u^∗$ which exists for all d $d \ge 7$. For $d = 9$, we study the stability of $u^∗$ without any symmetry assumptions on the initial data and show that there is a family of perturbations which lead to blowup via $u^*$ . In similarity coordinates, this family represents a co-dimension one Lipschitz manifold modulo translation symmetries. In addition, in $d = 7$ and $d = 9$, we prove non-radial stability of the well-known ODE blowup solution. Also, for the first time we establish persistence of regularity for the wave equation in similarity coordinates.
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超临界二次波方程的爆破问题
研究了能量超临界情况下聚焦二次波方程奇点的形成。我们以闭形式发现了一个新的、非平凡的、径向的、自相似的爆破解$u^ * $,它存在于所有的d $d $ g7 $。对于$d = 9$,我们研究了$u^*$的稳定性,在初始数据没有任何对称假设的情况下,证明了存在一组通过$u^*$导致爆炸的扰动。在相似坐标下,这个族表示一个协维的1 Lipschitz流形模平移对称。此外,在$d = 7$和$d = 9$中,我们证明了著名的ODE爆破解的非径向稳定性。同时,我们首次建立了波动方程在相似坐标下的正则性的持久性。
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