On dielectric relaxation equation for anisotropic polarizable reacting fluid mixtures

IF 0.6 Q3 MULTIDISCIPLINARY SCIENCES

Atti Accademia Peloritana dei Pericolanti-Classe di Scienze Fisiche Matematiche e Naturali Pub Date : 2019-12-20 DOI:10.1478/AAPP.97S2A3

L. Restuccia, L. Palese, A. Labianca

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引用次数: 0

Abstract

In this paper a linear theory for dielectric relaxation phenomena in polarizable reacting fluid mixtures is developed, in the frame of thermodynamics of irreversible processes with internal variables. The microscopic irreversible phenomena giving rise to dielectric relaxation are described splitting the total specific polarization in two irreversible parts and introducing one of these partial specific polarizations as internal variable in the thermodynamic state vector. The phenomenological equations for these fluid mixtures are derived and, in the linear case, a generalized Debye equation for dielectric relaxation phenomena is derived. Special cases are also treated. Linear theories for polarizable continuous media with dielectric relaxation phenomena were derived in the same frame of non-equilibrium thermodynamics with internal variables in previous papers by one of the authors (LR). A phenomenological theory for these phenomena was developed by Maugin for complex materials, using microscopic considerations and introducing articular partial polarizations per unit mass. The obtained results in this paper have applications in several fields of applied sciences, as, for instance, in medicine and biology, where complex fluids presenting dielectric relaxation, are constitued by different types of molecules, with own dielectric susceptibility and relaxation time.

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各向异性极化反应流体混合物的介电弛豫方程

本文在不可逆内变量热力学的框架下，建立了极化反应流体混合物中介电弛豫现象的线性理论。描述了引起介电弛豫的微观不可逆现象，将总比极化分为两个不可逆部分，并将其中一个部分比极化作为热力学状态矢量的内变量引入。导出了这些流体混合物的现象学方程，在线性情况下，导出了介电弛豫现象的广义德拜方程。特殊情况也会得到处理。具有介电弛豫现象的极化连续介质的线性理论是由作者之一(LR)在以前的论文中在带有内变量的非平衡热力学框架下推导出来的。这些现象的现象学理论是由毛金发展的复杂材料，使用微观考虑和引入关节部分极化每单位质量。本文所获得的结果可应用于若干应用科学领域，例如，在医学和生物学中，呈现介电弛豫的复杂流体是由不同类型的分子组成的，具有自己的介电磁化率和弛豫时间。

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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来源期刊

Atti Accademia Peloritana dei Pericolanti-Classe di Scienze Fisiche Matematiche e Naturali MULTIDISCIPLINARY SCIENCES-

CiteScore

3.80

自引率

0.00%

发文量

审稿时长

31 weeks

期刊介绍： This journal is of a multi- and inter-disciplinary nature and covers a broad range of fields including mathematics, computer science, physics, chemistry, biology, earth sciences, and their intersection. History of science is also included within the topics addressed by the journal. The transactions of the Pelorian Academy started out as periodic news sheets containing the notes presented by the members of the Divisions into which the Academy has been and still is organized, according to subject areas. The publication of these notes for the Division (“Classe”) of Mathematical, Physical and Natural Sciences is the responsibility of the Editorial Committee, which is composed of the Director of the division with the role of Chairman, the Vice-Director, the Secretary and two or more other members. Besides original research articles, the journal also accepts texts from conferences and invited talks held in the Academy. These contributions are published in a different section of the journal. In addition to the regular issues, single monographic supplements are occasionally published which assemble reports and communications presented at congresses, symposia, seminars, study meetings and other scientific events organized by the Academy or under its patronage. Since 2004 these transactions have been published online in the form of an open access electronic journal.