紧凑复流形上全非线性椭圆方程的尖锐 $\mathrm{L}^\infty$ 估计值

Yuxiang Qiao
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引用次数: 0

摘要

我们研究了紧凑复流形上完全非线性椭圆方程的尖锐 $\mathrm{L}^\infty$ 估计值。对于 K\"ahlermanifolds 的情况,我们证明了满足几个结构条件的全非线性椭圆方程的任何可接受解的振荡都可以由右手函数(正则化形式)的$mathrm{L}^1(\log\mathrm{L})^n(\log\mathrm{L})^r(r>n)$ 准则控制。这一结果改进了郭芳栋的结果。除了他们与辅助复数 Monge-Amp\`ere 方程的比较方法之外,我们的证明还依赖于一个老杨式的不等式和一个德乔治式的迭代 Lemma。对于具有非退化背景度量的ermitian流形,我们证明了一个类似的$\mathrm{L}^\infty$估计,它改进了Guo-Phong的估计。我们举了一个具体的例子来说明,当 $r\leqslant n-1$ 时,这里给出的 $\mathrm{L}^\infty$ 估计可能会失效。这一构造依赖于光滑的、径向的、严格的诸次谐函数的胶合定理。
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Sharp $\mathrm{L}^\infty$ estimates for fully non-linear elliptic equations on compact complex manifolds
We study the sharp $\mathrm{L}^\infty$ estimates for fully non-linear elliptic equations on compact complex manifolds. For the case of K\"ahler manifolds, we prove that the oscillation of any admissible solution to a degenerate fully non-linear elliptic equation satisfying several structural conditions can be controlled by the $\mathrm{L}^1(\log\mathrm{L})^n(\log\log\mathrm{L})^r(r>n)$ norm of the right-hand function (in a regularized form). This result improves that of Guo-Phong-Tong. In addition to their method of comparison with auxiliary complex Monge-Amp\`ere equations, our proof relies on an inequality of H\"older-Young type and an iteration lemma of De Giorgi type. For the case of Hermitian manifolds with non-degenerate background metrics, we prove a similar $\mathrm{L}^\infty$ estimate which improves that of Guo-Phong. An explicit example is constucted to show that the $\mathrm{L}^\infty$ estimates given here may fail when $r\leqslant n-1$. The construction relies on a gluing lemma of smooth, radial, strictly plurisubharmonic functions.
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