...
  • 主题
高级搜索  >
历史搜索 清空历史
首页> 外文期刊>Communications in Nonlinear Science and Numerical Simulation >Anomalous diffusion and electrical impedance response: Fractional operators with singular and non-singular kernels
【24h】

Anomalous diffusion and electrical impedance response: Fractional operators with singular and non-singular kernels

机译:异常扩散和电气阻抗响应:具有奇异和非奇异内核的分数算子

获取原文
获取原文并翻译 | 示例
页面导航
  • 摘要
  • 著录项
  • 相似文献
  • 相关主题

摘要

We revisit the electrochemical impedance spectroscopy problem in the framework of the Poisson-Nernst-Planck model for a semi-infinite electrolytic cell, using the Gouy-Chapman interface approximation. The drift-diffusion problem is formulated in terms of fractional differential operators having singular and non-singular kernels. These operators are con-sidered as extending the diffusion equations related to the ions' motion in the sample to the arbitrary order. The solutions to these equations are searched in the small AC linear approximation for the applied voltage. In this way as well, we show that the resulting electrical impedance, taking into account anomalous diffusion effects, naturally predicts a constant-phase elements behavior emerging from the physicochemical parameters, with-out considering equivalent circuits. The whole approach yields different, non-usual scenar-ios for the electrical impedance response of the cell, which may be connected to anoma-lous diffusion behavior of the mobile charges. (c) 2021 Elsevier B.V. All rights reserved.
机译:我们使用Gouy-Chapman接口近似来重新释放泊松 - 内斯特 - 普朗克模型的电化学阻抗谱问题,用于半无限电解电池。根据具有奇异和非奇异核的分数差分算子来配制漂移扩散问题。这些操作员被CON-SIVERED作为将与样品中的离子运动相关的扩散方程延伸到任意顺序。在施加电压的小AC线性近似下搜索对这些等式的解决方案。通过这种方式,我们表明所得到的电阻抗,考虑了异常扩散效果,自然地预测了从物理化学参数出现的恒相元件行为,考虑到等效电路。整个方法可以为电池的电阻抗响应产生不同,非通常的场景-IO,其可以连接到移动电荷的基瘤扩散行为。 (c)2021 elestvier b.v.保留所有权利。

著录项

  • 来源
    《Communications in Nonlinear Science and Numerical Simulation》 |2021年第11期|105907.1-105907.10|共10页
  • 作者

    Lenzi E. K.; Guilherme L. M. S.; da Silva B. V. H. V.; Koltun A. P. S.; Evangelista L. R.; Zola R. S.;

  • 作者单位

    Univ Estadual Ponta Grossa Dept Fis Ave Gen Carlos Cavalcanti 4748 BR-84030900 Ponta Grossa Parana Brazil|Ctr Brasileiro Pesquisas Fis Natl Inst Sci & Technol Complex Syst BR-22290180 Rio De Janeiro Brazil;

    Univ Estadual Ponta Grossa Dept Fis Ave Gen Carlos Cavalcanti 4748 BR-84030900 Ponta Grossa Parana Brazil;

    Univ Estadual Ponta Grossa Dept Fis Ave Gen Carlos Cavalcanti 4748 BR-84030900 Ponta Grossa Parana Brazil;

    Univ Estadual Ponta Grossa Dept Fis Ave Gen Carlos Cavalcanti 4748 BR-84030900 Ponta Grossa Parana Brazil;

    Univ Estadual Maringa Dept Fis Ave Colombo 5790 BR-87020900 Maringa Parana Brazil|Inst Fis USP Natl Inst Sci & Technol Complex Fluids BR-05508090 Sao Paulo SP Brazil|Univ Tecnol Fed Parana Dept Fis Ave Marcilio Dias 635 Apucarana Parana Brazil;

    Univ Estadual Maringa Dept Fis Ave Colombo 5790 BR-87020900 Maringa Parana Brazil|Inst Fis USP Natl Inst Sci & Technol Complex Fluids BR-05508090 Sao Paulo SP Brazil|Univ Tecnol Fed Parana Dept Fis Ave Marcilio Dias 635 Apucarana Parana Brazil;

  • 收录信息
  • 原文格式 PDF
  • 正文语种 eng
  • 中图分类
  • 关键词

    Fractional diffusion equation; Anomalous diffusion; Electric impedance;

    机译:分数扩散方程;异常扩散;电阻抗;

相似文献

  • 外文文献
  • 中文文献
  • 专利
获取原文

客服邮箱:kefu@zhangqiaokeyan.com

京公网安备:11010802029741号 ICP备案号:京ICP备15016152号-6 六维联合信息科技 (北京) 有限公司©版权所有

  • 客服微信

  • 服务号