Regularizing effect of the interplay between coefficients in some noncoercive integral functionals

Pub Date : 2024-08-21 DOI:10.21136/cmj.2024.0216-24

Aiping Zhang, Zesheng Feng, Hongya Gao

引用次数: 0

Abstract

We are interested in regularizing effect of the interplay between the coefficient of zero order term and the datum in some noncoercive integral functionals of the type

$$\cal{J} (v)= \int_\Omega j(x,v,\nabla v)\, {\rm d}x +\int_\Omega a(x) \vert v\vert^{2} \, {\rm d} x -\int_\Omega fv \, {\rm d}x, \quad v\in W^{1,2}_{0}(\Omega),$$

where Ω ⊂ ℝ^N, j is a Carathéodory function such that ξ ↦ j(x, s, ξ) is convex, and there exist constants 0 ⩽ τ < 1 and M > 0 such that

$${\vert\xi\vert^{2}}{\over{{(1+\vert s\vert)^{\tau}}}}\leqslant j(x,s,\xi)\leqslant M\vert\xi\vert^2$$

for almost all x ∈ Ω, all s ∈ ℝ and all ξ ∈ ℝ^N. We show that, even if 0 < a(x) and f(x) only belong to L¹(Ω), the interplay

$$\vert f(x)\vert\leqslant2 Qa(x)$$

implies the existence of a minimizer u ∈ W ^1,2₀ (Ω) which belongs to L^∞(Ω).

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某些非强制积分函数中系数间相互作用的正则效应

我们感兴趣的是零阶项的系数与一些非胁迫积分函数类型$$cal{J} (v)= \int_\Omega j(x,v,\nabla v)\, {\rm d}x +\int_\Omega a(x) \vert vvert\^{2} 中的基准点之间相互作用的正则效应\, {\rm d}x -\int_\Omega fv \, {\rm d}x, \quad v\in W^{1,2}_{0}(\Omega),$$where Ω ⊂ ℝN, j is a Carathéodory function such that ξ ↦ j(x, s, ξ) is convex, and there exist constants 0 ⩽ τ <；1 and M > 0 such that$${vert\xi\vert^{2}}{over{{(1+\vert s\vert)^{\tau}}}}\leqslant j(x,s,\xi)\leqslant M\vert\xi\vert^2$$ for almost all x∈ Ω, all s∈ ℝ and all ξ∈ ℝN.我们证明，即使 0 < a(x) 和 f(x) 只属于 L1(Ω)，相互影响$$\vert f(x)\vert\leqslant2 Qa(x)$$ 也意味着存在一个属于 L∞(Ω)的最小值 u∈ W1,20 (Ω) 。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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