dc.description.abstract | A new idea, using deterministic approach, has been applied for the elucidation of the electron
and momentum transfer phenomena at, both rigid and deformable interfaces in finely (micro,
nano, atto) dispersed systems. The behavior of e.g., liquid/liquid interfaces (emulsions and
double emulsions) is based on three forms of “instabilities”; these are rigid, elastic, and plastic.
The events are understood as interactions between the internal (immanent) and external
(incident) periodical physical fields. Since the events at the interfaces of finely dispersed
systems have to be considered at the molecular, atomic, and/or entities level it is inevitable to
introduce the electron transfer beside the classical heat, mass, and momentum transfer
commonly used in chemical engineering. Therefore, an entity can be defined as the smallest
indivisible element of matter that is related to the particular transfer phenomena. Hence, the
entity can be either differential element of mass/demon, ion, phonon as quanta of acoustic
energy, infon as quanta of information, photon, and electron. A number of theories that describe
the behavior of liquid/liquid interfaces have been developed and applied to various dispersed
systems e.g., Stokes, Reiner-Rivelin, Ericksen, Einstein, Smoluchowski, Kinch. A theory of
electroviscoelasticity, based on a new constitutive model of liquids describes the behavior of
electrified liquid/liquid interfaces in finely dispersed systems considering droplet or droplet-film
structure (collective of particles) as a macroscopic system with internal structure determined by
the way the molecules (ions) are tuned (structured) into the primary components of a cluster
configuration. How the tuning occurs depends on the physical fields involved, both potential
(elastic forces) and nonpotential (resistance forces). All these microelements of the primary
structure can be considered as electromechanical oscillators assembled into groups, so the
excitation by an external physical field may cause oscillations at the resonant/characteristic
frequency of the system itself (coupling at the characteristic frequency). Up to day, there are
three possible mathematical formalisms discussed related to the theory of electroviscoelasticity.
The first is tension tensor model, where the normal and tangential forces are considered, only in
mathematical formalism, regardless to their origin (mechanical and/or electrical). The second is
Van der Pol derivative model. Finally, the third model comprise an effort to generalize the
previous Van der Pol differential equations, both, linear and nonlinear; i.e., the ordinary time
derivatives and integrals are now replaced by corresponding fractional-order time derivatives
and integrals of order p<1. Both, the presented model and theory can facilitate the understanding
of entrainment problems in solvent extraction, developed interfaces in colloid and interface
science, chemical and biological sensors, electro analytical methods, biology/biomedicine
(hematology, genetics and electroneurophysiology). Also, this knowledge may be implemented
in studies of structure; interface barriers/symmetries, -surface (bilipid membrane cells, free
bubbles of surfactants, Langmuir Blodgett films), -line (genes, liquid crystals, microtubules), -
point (fulerenes, micro-emulsions), and -overall (dry foams, polymer elastic and rigid foams). | sr |