Thermoelastic composites with columnar microstructure and cylindrically anisotropic phases. Part II: One-parameter generalized self-consistent estimates
“…This result is an extension of the well-known GSCM of Christensen and Lo [10] and of the relevant result of Le Quang and He [22] to nanocomposites with cylindrically anisotropic phases and interface effects.…”
Section: and Bsupporting
confidence: 72%
“…In the cylindrical coordinate system (r, θ, z), (21) and (22) can be rewritten in the equivalent form:…”
Section: Effective Transverse Shear Modulus M *mentioning
confidence: 99%
“…Under the boundary conditions (23) and (24), the displacement solution fields in the core fiber, coating matrix, and external homogeneous medium are provided by (see [18,22]):…”
Section: Effective Transverse Shear Modulus M *mentioning
Recent developments in nanotechnology make it possible to fabricate nanofibers and identify their mechanical fibers. In particular, nanofibers are used as reinforcement in composites. The present work concerns unidirectional nanofibrous composites with cylindrically anisotropic phases and aims to analytically estimate their effective thermoelastic moduli. This objective is achieved by extending the classical generalized selfconsistent model to the setting of thermoelasticity, to the case of cylindrically anisotropic phases, and to the incorporation of interface stress effect. Analytical closed-form estimations are derived for all the effective thermoelastic moduli, showing that these moduli depend on the fiber cross-section size. Numerical examples are provided to illustrate this size-dependent effect.
“…This result is an extension of the well-known GSCM of Christensen and Lo [10] and of the relevant result of Le Quang and He [22] to nanocomposites with cylindrically anisotropic phases and interface effects.…”
Section: and Bsupporting
confidence: 72%
“…In the cylindrical coordinate system (r, θ, z), (21) and (22) can be rewritten in the equivalent form:…”
Section: Effective Transverse Shear Modulus M *mentioning
confidence: 99%
“…Under the boundary conditions (23) and (24), the displacement solution fields in the core fiber, coating matrix, and external homogeneous medium are provided by (see [18,22]):…”
Section: Effective Transverse Shear Modulus M *mentioning
Recent developments in nanotechnology make it possible to fabricate nanofibers and identify their mechanical fibers. In particular, nanofibers are used as reinforcement in composites. The present work concerns unidirectional nanofibrous composites with cylindrically anisotropic phases and aims to analytically estimate their effective thermoelastic moduli. This objective is achieved by extending the classical generalized selfconsistent model to the setting of thermoelasticity, to the case of cylindrically anisotropic phases, and to the incorporation of interface stress effect. Analytical closed-form estimations are derived for all the effective thermoelastic moduli, showing that these moduli depend on the fiber cross-section size. Numerical examples are provided to illustrate this size-dependent effect.
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.