Description
This volume highlights the potential of an experimental approach, which offers a relatively simple and inexpensive alternative to conventional techniques. Its basis is the set of changes of thermodynamic variables that occur when an electric field is applied to an ideal dielectric. If these processes are experimentally measured as a function of temperature, and suitable hypotheses are met, many thermodynamic quantities can be derived from dielectric physical quantities. This enables a shift from standard dielectric thermal analysis to a more targeted dielectric calorimetry.
A central parameter affected by the electric field is the entropy variation known as Fröhlich entropy (FE), introduced by H. Fröhlich. When the imaginary part of the static dielectric function is negligible, far from resonances, FE can be calculated, under the right assumptions, from the real part of the dielectric function. Fröhlich suggested that FE reflects the state of order of the system, making it a useful figure of merit.
Assuming this interpretation, FE values offer insight into the behavior of materials, particularly with respect to temperature, phase stability, transitions, and order disorder processes. Because the underlying assumptions are weak, the method applies to many physical systems and effectively extends traditional dielectric techniques.
FE estimation has been successfully used across diverse areas of condensed matter physics, including dipolar liquids, liquid and nematic crystals, dipolar glasses, organic molecular crystals, semiconductors, metallic nanoparticles, inorganic disordered ferroelectrics, proteins, and enzymes. This breadth demonstrates its reliability and its significant, still underexplored, potential.
Introduction Dielectric Calorimetry and Fröhlich Entropy Estimation.- Elements of Thermodynamics of Dielectrics and Basic Theory of Fröhlich Entropy.- Generalized Fröhlich Entropy Anisotropic and Nonlinear Media.- Experimental Techniques to Investigate the State of Order in Condensed Matter.- Meaning and Applications of Fröhlich Entropy.- Fröhlich Entropy of Nanoparticles Investigation of Phases Phase Transitions and Melting.- Fröhlich Entropy in Soft Matter and Extreme Conditions.- Dielectric Thermodynamics of Organic Semiconductors.- Order disorder Transitions of Ferroelectric Perovskites by Fröhlich Entropy Investigations.
Jacopo Parravicini is a Senior Assistant Professor (Italian RTDB) at the Department of Physics and Astronomy, University of Florence. He earned his M.D. in Physics in 2006 from the University of Milan and his Ph.D. in Photonics from the University of Pavia, where he focused on nonlinear optical materials and received the "A. Righi" prize in 2008 from the Italian Physical Society. His research interests include nonlinear optics, disordered systems, phase transitions, photovoltaic materials, and quantum simulations. He has held positions at universities and institutes in France and Italy, authored 83 publications, and is a member of the Italian Physical Society, the European Physical Society, and a "Senior Member" of the Optical Society of America since 2019.
