线性化复蒙日-安培方程的内部荷尔德估计

IF 2.1 2区 数学 Q1 MATHEMATICS Calculus of Variations and Partial Differential Equations Pub Date : 2024-08-20 DOI:10.1007/s00526-024-02814-5
Yulun Xu
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引用次数: 0

摘要

让 \(w_0\) 是定义在 \(B_1\subset \mathbb {C}^n\) 上的有界、(C^3\)、严格的多重谐函数。那么 \(w_0\) 在 \(L^{\infty }(B_1)\) 中有一个邻域。假设我们在这个邻域中有一个函数\(\phi\),其值为\(1-\varepsilon \le MA(\phi )\le 1+\varepsilon \),并且存在一个函数u可以求解线性化复数Monge-Amp\ (\grave\text {e}}\)方程:\det(\phi _{k\bar{l}})\phi ^{i\bar{j}}u_{i\bar{j}}=0\).然后存在常数 \(\alpha >0\) 和 C,使得 \(|u|_{C^{\alpha }(B_{\frac{1}{2}}(0))}\le C\), 其中 \(\alpha >;0)取决于 n,而 C 取决于 n 和 \(|u|_{L^{\infty}(B_1(0))}\),只要 \(\epsilon \)很小,取决于 n。这就将卡法雷利-古铁雷斯对线性化实数 Monge-Amp\(\grave\text {e}}\)re方程的估计部分推广到了复数版本。
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Interior Hölder estimate for the linearized complex Monge–Ampère equation

Let \(w_0\) be a bounded, \(C^3\), strictly plurisubharmonic function defined on \(B_1\subset \mathbb {C}^n\). Then \(w_0\) has a neighborhood in \(L^{\infty }(B_1)\). Suppose that we have a function \(\phi \) in this neighborhood with \(1-\varepsilon \le MA(\phi )\le 1+\varepsilon \) and there exists a function u solving the linearized complex Monge–Amp\(\grave{\text {e}}\)re equation: \(det(\phi _{k\bar{l}})\phi ^{i\bar{j}}u_{i\bar{j}}=0\). Then there exist constants \(\alpha >0\) and C such that \(|u|_{C^{\alpha }(B_{\frac{1}{2}}(0))}\le C\), where \(\alpha >0\) depends on n and C depends on n and \(|u|_{L^{\infty }(B_1(0))}\), as long as \(\epsilon \) is small depending on n. This partially generalizes Caffarelli–Gutierrez’s estimate for linearized real Monge–Amp\(\grave{\text {e}}\)re equation to the complex version.

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来源期刊
CiteScore
3.30
自引率
4.80%
发文量
224
审稿时长
6 months
期刊介绍: Calculus of variations and partial differential equations are classical, very active, closely related areas of mathematics, with important ramifications in differential geometry and mathematical physics. In the last four decades this subject has enjoyed a flourishing development worldwide, which is still continuing and extending to broader perspectives. This journal will attract and collect many of the important top-quality contributions to this field of research, and stress the interactions between analysts, geometers, and physicists. The field of Calculus of Variations and Partial Differential Equations is extensive; nonetheless, the journal will be open to all interesting new developments. Topics to be covered include: - Minimization problems for variational integrals, existence and regularity theory for minimizers and critical points, geometric measure theory - Variational methods for partial differential equations, optimal mass transportation, linear and nonlinear eigenvalue problems - Variational problems in differential and complex geometry - Variational methods in global analysis and topology - Dynamical systems, symplectic geometry, periodic solutions of Hamiltonian systems - Variational methods in mathematical physics, nonlinear elasticity, asymptotic variational problems, homogenization, capillarity phenomena, free boundary problems and phase transitions - Monge-Ampère equations and other fully nonlinear partial differential equations related to problems in differential geometry, complex geometry, and physics.
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