Parabolic Martin Boundaries and Asymptotic Formulas of Heat Kernels for One-Dimensional Elliptic Operators with Periodic Coefficients

Minoru Murata; Tetsuo Tsuchida

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Parabolic Martin Boundaries and Asymptotic Formulas of Heat Kernels for One-Dimensional Elliptic Operators with Periodic Coefficients

机译：具有周期系数的一维椭圆算子的抛物线马丁边界和热核的渐近公式

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摘要

We determine the Martin boundary of R × ( − ∞ , 0) for operators , where L is a one-dimensional second-order elliptic operator with periodic coefficients. We also give long-time asymptotic formulas of heat kernels generated by L in the case that the ratio of the spatial variable to the time variable is large or small.

机译：我们为算子确定R×（−∞，0）的马丁边界，其中L是具有周期系数的一维二阶椭圆算子。在空间变量与时间变量之比较大或较小的情况下，我们还给出了由L生成的热核的长时间渐近公式。

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《Potential Analysis》 |2010年第4期|p.387-414|共28页
作者
Minoru Murata; Tetsuo Tsuchida;
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正文语种 eng
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关键词
Parabolic Martin boundary; Asymptotic formulas; Heat kernel; Periodic coefficients;

机译：抛物线马丁边界;渐近公式;热核;周期系数;

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专利

1. Parabolic Martin Boundaries and Asymptotic Formulas of Heat Kernels for One-Dimensional Elliptic Operators with Periodic Coefficients [J] . Murata M., Tsuchida T. Potential analysis: An international journal devoted to the interactions between potential theory, probability theory, geometry and functional analysis . 2010,第4期

机译：具有周期系数的一维椭圆算子的抛物线马丁边界和热核的渐近公式
2. Long-time asymptotics of heat kernels for one-dimensional elliptic operators with periodic coefficients [J] . Tsuchida T Proceedings of the London Mathematical Society . 2008,第0期

机译：具有周期系数的一维椭圆算子的热核的长时间渐近性
3. Long-time asymptotics of heat kernels for one-dimensional elliptic operators with periodic coefficients [J] . Tsuchida T Proceedings of the London Mathematical Society . 2008,第Pta2期

机译：具有周期系数的一维椭圆算子的热核的长时间渐近性
4. Multiscale asymptotic analysis and numerical simulation for second elliptic problems with oscillating coefficients in parallelotope periodic structure [C] . Xin Wang, Yuenan Qiu, Shasha Gao Control, Instrumentation and Automation (ICCIA), 2011 2nd International Conference on . 2012

机译：平行系数周期结构中第二个具有振动系数的椭圆问题的多尺度渐近分析和数值模拟
5. ASYMPTOTIC BEHAVIOR OF RADIAL SOLUTIONS TO AN ELLIPTIC-PARABOLIC SYSTEM WITH NONLINEAR BOUNDARY CONDITIONS [D] . 飯田, 雅人 1995

机译：具有非线性边界条件的椭圆抛物型方程组的径向解的渐近性
6. The logarithmic contributions to the ... formula ... asymptotic massive Wilson coefficients and operator matrix elements in deeply inelastic scattering [O] . A. Behring, I. Bierenbaum, J. Blümlein, -1

机译：非弹性散射中对... ... ...渐近质量Wilson系数和算子矩阵元素的对数贡献
7. Asymptotics of Green functions and Martin boundaries for elliptic operators with periodic coefficients : joint work with Minoru Murata (Potential Theory and its related Fields) [O] . Tsuchida Tetsuo 2009

机译：具有周期系数的椭圆算子的格林函数和Martin边界的渐近性：与Minoru Murata共同研究（势理论及其相关领域）
8. Nonlinear Perturbations of Differential Operators with Nontrivial Kernel and Applications to Third Order Periodic Boundary Value Problems. [R] . Afuwape, A. U., Omari, P., Zanolin, F. 1987

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Parabolic Martin Boundaries and Asymptotic Formulas of Heat Kernels for One-Dimensional Elliptic Operators with Periodic Coefficients

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