Effective permittivity and permeability


Effective permittivity and permeability are averaged dielectric and magnetic characteristics of a microinhomogeneous medium. They are subject of Effective medium theory. There are two widely used formulae. They both were derived in quasi-static approximation when electric field inside a mixture particle may be considered as homogeneous. So, these formulae can not describe the particle size effect. Many attempts were undertaken to improve these formulae.

Maxwell Garnett's formula

The first formula was proposed by J.C. Maxwell Garnett. Maxwell Garnett was the son of physicist William Garnett, and was named after Garnett's friend, James Clerk Maxwell. He proposed his formula to explain colored pictures that are observed in glasses doped with metal nanoparticles. His formula has a form

where is effective relative complex permittivity of the mixture, is relative complex permittivity of the background medium containing small spherical inclusions of relative permittivity with volume fraction of. This formula is based on the equality

where is the absolute permittivity of free space and is electric dipole moment of a single inclusion induced by the external electric field. However this equality is good only for homogeneous medium and. Moreover the formula ignores the interaction between single inclusions. Because of these circumstances, formula gives too narrow and too high resonant curve for plasmon excitations in metal nanoparticles of the mixture.

Bruggeman's formula

The second popular formula was proposed by D.A.G. Bruggeman. His formula has a form

Here positive sign before the square root must be altered to negative sign in some cases in order to get correct imaginary part of effective complex permittivity which is related with electromagnetic wave attenuation. This formula is based on the equality

where is the jump of electric displacement flux all over the integration surface, is the component of microscopic electric field normal to the integration surface, is the local relative complex permittivity which takes the value inside the picked metal particle, the value inside the picked dielectric particle and the value outside the picked particle, is the normal component of the macroscopic electric field. Formula comes out of Maxwell's equality. Thus only one picked particle is considered in Bruggeman's approach. The interaction with all the other particles is taken into account only in mean field approximation described by. Formula gives a reasonable resonant curve for plasmon excitations in metal nanoparticles if their size is 10 nm or smaller. But it is unable to describe the size dependence for the resonant frequency of plasmon excitations that are observed in experiment

Formula describing size effect

A new formula describing size effect was proposed. This formula has a form

where is the nanoparticle radius and is wave number. It is supposed here that the time dependence of the electromagnetic field is given by the factor In this paper Bruggeman's approach was used, but electromagnetic field for electric-dipole oscillation mode inside the picked particle was computed without applying quasi-static approximation. Thus the function is due to the field nonuniformity inside the picked particle. In quasi-static region, i.e. ≤ 10 nm for Ag this function becomes constant and formula becomes identical with Bruggeman's formula.

Effective permeability formula

Formula for effective permeability of mixtures has a form

Here is effective relative complex permeability of the mixture, is relative complex permeability of the background medium containing small spherical inclusions of relative permeability with volume fraction of. This formula was derived in dipole approximation. Magnetic octupole mode and all other magnetic oscillation modes of odd orders were neglected here. When and this formula has a simple form