Harnack inequalities and local central limit theorem for the polynomial lower tail random conductance model

Omar Boukhadra; Takashi Kumagai; Pierre Mathieu

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Harnack inequalities and local central limit theorem for the polynomial lower tail random conductance model

机译：多项式下尾随机电导模型的Harnack不等式和局部中心极限定理

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We prove upper bounds on the transition probabilities of random walks with i.i.d. random conductances with a polynomial lower tail near 0. We consider both constant and variable speed models. Our estimates are sharp. As a consequence, we derive local central limit theorems, parabolic Harnack inequalities and Gaussian bounds for the heat kernel. Some of the arguments are robust and applicable for random walks on general graphs. Such results are stated under a general setting.

机译：我们证明了i.i.d随机游走的过渡概率的上限。多项式下尾部接近0的随机电导。我们同时考虑了恒定速度模型和变速模型。我们的估计很准确。结果，我们得出了热核的局部中心极限定理，抛物线型Harnack不等式和高斯边界。一些论点是可靠的，并且适用于一般图上的随机游动。这些结果在一般情况下陈述。

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来源
《Journal of the Mathematical Society of Japan》 |2015年第4期|1413-1448|共36页
作者
Omar Boukhadra; Takashi Kumagai; Pierre Mathieu;
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作者单位

Departement de Mathematiques Universite de Constantine 1 Algerie;

Research Institute for Mathematical Sciences Kyoto University Kyoto 606-8502, Japan;

Centre de Mathematiques et Informatique Aix Marseille Universite CNRS, Centrale Marseille I2M, UMR 7373 13453 Marseille France;

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收录信息美国《科学引文索引》(SCI);
原文格式 PDF
正文语种 eng
中图分类
关键词
Markov chains; random walk; random environments; random conductances; percolation;

机译：马尔可夫链随机漫步随机环境;随机电导;渗滤;

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3. Standard Spectral Dimension for the Polynomial Lower Tail Random Conductances Model [J] . Boukhadra Omar Electronic Journal of Probability . 2010,第33期

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7. Harnack Inequalities and Local Central Limit Theorem for the Polynomial Lower Tail Random Conductance Model [O] . Boukhadra, Omar, Kumagai, Takashi, Mathieu, Pierre 2015

机译：多项式的Harnack不等式和局部中心极限定理下尾随机电导模型

Harnack inequalities and local central limit theorem for the polynomial lower tail random conductance model

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