Elasto-thermodiffusive nonlocal responses for a spherical cavity due to memory effect

• Published in: Mechanics of time-dependent materials Vol. 28; no. 3; pp. 1395 - 1419
• Main Author: Sur, Abhik
• Format: Journal Article
• Language: English
• Published: Dordrecht Springer Netherlands 01.09.2024; Springer Nature B.V
• Subjects: Characterization and Evaluation of Materials; Classical Mechanics; Comparative studies; Delay time; Diffusion effects; Diffusion theory; Engineering; Kernel functions; Laplace transforms; Mathematical analysis; Polymer Sciences; Solid Mechanics; Thermoelasticity; Time domain analysis; Transport equations; Nonlocal thermoelasticity; Memory-dependent derivative; Delay time; Moore–Gibson–Thompson theory; Spherical cavity
• ISSN: 1385-2000; 1573-2738
• DOI: 10.1007/s11043-023-09626-8

The present work is devoted to the derivation of fundamental equations in generalized thermoelastic diffusion theory. The main aim is to establish a size-dependent model with the consideration of spatial nonlocal effects of concentration and strain fields. The heat transport equation for the present problem is considered in the context of Moore–Gibson–Thompson (MGT) generalized thermoelasticity theory involving linear and nonlinear kernel functions in a delayed interval in terms of the memory-dependent derivative. The medium is considered to be one-dimensional having a spherical cavity where the boundary of the cavity is traction-free and is subjected to prescribed thermal and chemical shocks. The Laplace transform technique is incorporated for the solution of the basic equations. For numerical evaluation, the analytical expressions have been inverted in the space-time domain using the method of Zakian. From numerical results, the effects of the nonlocality parameters in the heat transport law and the nonlocality of mass-flux have been discussed. The effect of different kernel functions, the delay time, and the effect of thermodiffusion are also reported. A comparative study between the MGT theory and the hyperbolic Lord–Shulman theory is also explained.