Ali Jafari scite author profile

In the present paper, thermomechanical vibration characteristics of functionally graded (FG) Reddy beams made of porous material subjected to various thermal loadings are investigated by utilizing a Navier solution method for the first time. Four types of thermal loadings, namely, uniform, linear, nonlinear, and sinusoidal temperature rises, through the thickness direction are considered. Thermomechanical material properties of FG beam are assumed to be temperature-dependent and supposed to vary through thickness direction of the constituents according to power-law distribution (P-FGM) which is modified to approximate the porous material properties with even and uneven distributions of porosities phases. The governing differential equations of motion are derived based on higher order shear deformation beam theory. Hamilton’s principle is applied to obtain the governing differential equations of motion which are solved by employing an analytical technique called the Navier type solution method. Influences of several important parameters such as power-law exponents, porosity distributions, porosity volume fractions, thermal effects, and slenderness ratios on natural frequencies of the temperature-dependent FG beams with porosities are investigated and discussed in detail. It is concluded that these effects play significant role in the thermodynamic behavior of porous FG beams.

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Partial discharge localization in transformer windings using multi-conductor transmission line model

Jafari

Akbari

2008

Electric Power Systems Research

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Vibration analysis of magneto-electro-elastic heterogeneous porous material plates resting on elastic foundations

Ebrahimi

Jafari

Barati

2017

Thin-Walled Structures

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A Novel and Accurate Ritz Formulation for Free Vibration of Rectangular and Skew Plates

Eftekhari

Jafari

2012

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One of the major limitations of the conventional Ritz method is its difficulty in implementation to the differential equations with natural boundary conditions at the boundary pointsllines. Plates involving free edges/corners and irregularly shaped plates are two historical and classical examples which show that their solutions cannot be accurately approximated by the conventional Ritz method. To solve this difficulty, a simple, novel, and accurate Ritz formulation is introduced in this paper. It is revealed that the proposed methodology can produce much better accuracy than the conventional Ritz method for rectangular plates involving free edges/corners and skew plates.

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A simple and accurate Ritz formulation for free vibration of thick rectangular and skew plates with general boundary conditions

Eftekhari

Jafari

2012

Acta Mech

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High accuracy mixed finite element-Ritz formulation for free vibration analysis of plates with general boundary conditions

Eftekhari

Jafari

2012

Applied Mathematics and Computation

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The Value of Intra-Day Markets in Power Systems With High Wind Power Penetration

Jafari

Zareipour

Schellenberg

et al. 2014

IEEE Trans. Power Syst.

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Ali Jafari

A mixed Ritz-DQ method for forced vibration of functionally graded beams carrying moving loads

A Higher-Order Thermomechanical Vibration Analysis of Temperature-Dependent FGM Beams with Porosities

Partial discharge localization in transformer windings using multi-conductor transmission line model

Vibration analysis of magneto-electro-elastic heterogeneous porous material plates resting on elastic foundations

A Novel and Accurate Ritz Formulation for Free Vibration of Rectangular and Skew Plates

A simple and accurate Ritz formulation for free vibration of thick rectangular and skew plates with general boundary conditions

High accuracy mixed finite element-Ritz formulation for free vibration analysis of plates with general boundary conditions

The Value of Intra-Day Markets in Power Systems With High Wind Power Penetration

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