Thermal-stress analysis of a damaged solid sphere using hyperbolic two-temperature generalized thermoelasticity theory

Youssef, Hamdy M.; El-Bary, Alaa A.; Al-Lehaibi, Eman A. N.

doi:10.1038/s41598-021-82127-1

Cited by 19 publications

(20 citation statements)

References 30 publications

(37 reference statements)

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“…As a result, they modified the two-temperature model to the hyperbolic twotemperature model, in which the difference between the second derivative concerning the time of the dynamical and conductive temperature is proportional to the heat supply, and found that this model introduces a thermal wave that propagates with a limited speed. Recently, [22][23][24] discussed different types of problems in the context of the HTT theory of thermoelasticity.…”

Section: Introductionmentioning

confidence: 99%

Analysis of axisymmetric deformation in generalized micropolar thermoelasticity within the framework of Moore-Gibson-Thompson heat equation incorporating non-local and hyperbolic two-temperature effect

Kumar,

Kaushal,

Kochar

2024

The Journal of Strain Analysis for Engineering Design

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An axisymmetric problem in micropolar thermoelastic model based on the Moore-Gibson-Thompson heat equation (MGT) under non-local and hyperbolic two-temperature (HTT) is explored due to mechanical loading. After transforming the system of equations into dimensionless form and employing potential functions, a new set of governing equations are solved using Laplace and Hankel transforms. A specific set of restrictions are applied on the boundary in the form of ring load and disk load for examining the significance of the problem. The transformed form of components of displacement, stresses, tangential couple stress, conductive temperature, and thermodynamic temperature are obtained. A numerical inversion technique is applied to recover the physical quantities in the original domain. The graphic representation of numerical findings for stress components, tangential couple stress, and conductive temperature reveals the impact of non-local and HTT parameters. Certain cases of interest are drawn out. Physical views presented in the article may be useful for the composition of new materials, geophysics, earthquake engineering, and other scientific disciplines.

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Section: Introductionmentioning

confidence: 99%

Analysis of axisymmetric deformation in generalized micropolar thermoelasticity within the framework of Moore-Gibson-Thompson heat equation incorporating non-local and hyperbolic two-temperature effect

Kumar,

Kaushal,

Kochar

2024

The Journal of Strain Analysis for Engineering Design

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“…Kumar and Sharma (2021b) studied the impact of two-temperature in a piezothermoelastic medium with fractional order derivative. Further, considering the accelerating thermal and conductive temperatures, Youssef and Bary (Youssef and El-Bary, 2018) discovered the new hyperbolic-two-temperature (HTT) model updated the CTT model and found a way to address the paradox of thermal wave propagation at infinite speed. Bassiouny and Rajagopalan (2020), Bassiouny (2021) and Hobiny et al (2022) investigated the different thermoelastic models in the framework of the HTT theory.…”

Section: Introductionmentioning

confidence: 99%

Energy analysis at the interface of piezo/thermoelastic half spaces

Gupta

Kumar²,

Kumar³

et al. 2023

HFF

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Purpose This paper aims to study the energy ratios of plane waves on an interface of nonlocal thermoelastic halfspace (NTS) and nonlocal orthotropic piezothermoelastic half-space (NOPS). Design/methodology/approach The memory-dependent derivatives (MDDs) approach with a hyperbolic two-temperature (HTT), three-phase lag theory is used here to study how the energy ratios change at the interface with the angle of incidence. Findings Plane waves that travel through NTS and hit the interface as a longitudinal wave, a thermal wave, or a transversal wave send four waves into the NOPS medium and three waves back into the NTS medium. The amplitude ratios of the different waves that are reflected and transmitted are used to calculate the energy ratios of the waves. It is observed that these ratios are affected by the HTT, nonlocal and MDD parameters. Research limitations/implications The energy ratios correspond to four distinct models; nonlocal HTT with memory, nonlocal HTT without memory, local HTT with memory and nonlocal classical-two-temperature with memory concerning the angle of incidence from 0 degree to 90 degree. Practical implications This model applies to several fields, including earthquake engineering, soil dynamics, high-energy particle physics, nuclear fusion, aeronautics and other fields where nonlocality, MDD and conductive temperature play an important role. Originality/value The authors produced the submitted document entirely on their initiative, with equal contributions from all of them.

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“…Youssef (2006) expanded the field equations of thermoelasticity by incorporating the thermal relaxation parameter, developing the generalized theory of two temperatures. Furthermore, addressing the paradoxical phenomenon of thermal wave propagation occurring at an infinite speed, Youssef and El-Bary (2018) introduced a new model called the hyperbolic-two-temperature (HTT), which pertains to the phenomenon of accelerating conductive and thermal temperatures. Hobiny et al (2022) conducted a comprehensive exploration of various thermoelastic models, analyzing their characteristics and behavior under the HTT framework.…”

Section: Introductionmentioning

confidence: 99%

Photo-thermo-piezo-elastic waves in semiconductor medium subject to distinct two temperature models with higher order memory dependencies

Gupta,

Barak

2023

HFF

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Purpose This study aims to examine the impacts of higher memory dependencies on a novel semiconductor material that exhibits generalized photo-piezo-thermo-elastic properties. Specifically, the research focuses on analyzing the behavior of the semiconductor under three distinct temperature models. Design/methodology/approach The study assumes a homogeneous and orthotropic piezo-semiconductor medium during photo-thermal excitation. The field equations have been devised to encompass higher order parameters, temporal delays and a specifically tailored kernel function to address the problem. The eigenmode technique is used to solve these equations and derive analytical expressions. Findings The research presents graphical representations of the physical field distribution across different temperatures, higher order plasma heat conduction models and time. The results reveal that the amplitude of the distribution profile is markedly affected by factors such as the memory effect, time, conductive temperature and spatial coordinates. These factors cannot be overlooked in the analysis and design of the semiconductor. Research limitations/implications Specific cases are also discussed in detail, offering the potential to advance the creation of precise models and facilitate future simulations. Practical implications The research offers valuable information on the physical field distribution across various temperatures, allowing engineers and designers to optimize the design of semiconductor devices. Understanding the impact of memory effect, time, conductive temperature and spatial coordinates enables device performance and efficiency improvement. Originality/value This manuscript is the result of the joint efforts of the authors, who independently initiated and contributed equally to this study.

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Thermal-stress analysis of a damaged solid sphere using hyperbolic two-temperature generalized thermoelasticity theory

Cited by 19 publications

References 30 publications

Analysis of axisymmetric deformation in generalized micropolar thermoelasticity within the framework of Moore-Gibson-Thompson heat equation incorporating non-local and hyperbolic two-temperature effect

Analysis of axisymmetric deformation in generalized micropolar thermoelasticity within the framework of Moore-Gibson-Thompson heat equation incorporating non-local and hyperbolic two-temperature effect

Energy analysis at the interface of piezo/thermoelastic half spaces

Photo-thermo-piezo-elastic waves in semiconductor medium subject to distinct two temperature models with higher order memory dependencies

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