A logarithmic Hardy inequality

del Pino M.; Dolbeault J.; Filippas S.; Tertikas A.

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A logarithmic Hardy inequality

机译：对数的Hardy不等式

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We prove a new inequality which improves on the classical Hardy inequality in the sense that a nonlinear integral quantity with super-quadratic growth, which is computed with respect to an inverse square weight, is controlled by the energy. This inequality differs from standard logarithmic Sobolev inequalities in the sense that the measure is neither Lebesgue's measure nor a probability measure. All terms are scale invariant. After an Emden-Fowler transformation, the inequality can be rewritten as an optimal inequality of logarithmic Sobolev type on the cylinder. Explicit expressions of the sharp constant, as well as minimizers, are established in the radial case. However, when no symmetry is imposed, the sharp constants are not achieved by radial functions, in some range of the parameters.

机译：我们证明了一个新的不等式，该不等式在经典哈代不等式的基础上得到了改进，该意义是相对于平方反比计算的具有超二次增长的非线性积分量受能量控制。该不等式与标准对数Sobolev不等式的不同之处在于该度量既不是Lebesgue的度量也不是概率的度量。所有术语都是尺度不变的。经过Emden-Fowler变换后，不等式可以重写为圆柱上对数Sobolev类型的最佳不等式。在径向情况下建立了尖锐常数以及极小值的显式表达式。但是，当不施加对称性时，在某些参数范围内，径向函数无法获得尖锐常数。

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来源
《Journal of Functional Analysis》 |2010年第8期|共28页
作者
del Pino M.; Dolbeault J.; Filippas S.; Tertikas A.;
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正文语种 eng
中图分类数学;
关键词
Caffarelli-Kohn-Nirenberg inequalities; Emden-Fowler transformation; Hardy inequality; Hardy-Sobolev inequalities; Interpolation; Logarithmic Sobolev inequality; Radial symmetry; Scale invariance; Sobolev inequality; Symmetry breaking;

机译：Caffarelli-Kohn-Nirenberg不等式;Emden-Fowler变换;Hardy不等式;Hardy-Sobolev不等式;插值;对数Sobolev不等式;径向对称;比例不变;Sobolev不等式;对称破坏;

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A logarithmic Hardy inequality

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