An Extended Model of Fractional-Dimensional Space for Anisotropic Solids with Deformed Derivatives
Abstract
In this work, we extend a fractional-dimensional space model for anisotropic solids by incorporating a q-deformed derivative operator, inspired by Tsallis' nonadditive entropy framework. This generalization provides an analytical framework for exploring anisotropic thermal properties, within a unified and flexible mathematical formalism. We derive modified expressions for the phonon density of states and specific heat capacity, highlighting the impact of the deformation parameters on thermodynamic behavior. We apply the model to various solid-state materials, achieving excellent agreement with experimental data, across a wide temperature range and demonstrating its effectiveness in capturing anisotropic and subextensive effects in real systems.