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ISSN Imprimir: 1543-1649
ISSN On-line: 1940-4352
Volume 18, 2020
Volume 17, 2019
Volume 16, 2018
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Volume 14, 2016
Volume 13, 2015
Volume 12, 2014
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Volume 1, 2003
International Journal for Multiscale Computational Engineering
THERMODYNAMICALLY CONSISTENT APPROACH FOR ONE-DIMENSIONAL PHENOMENOLOGICAL MODELING OF SHAPE MEMORY ALLOYS
Chetan S. Jarali
Dynamics and Adaptive Structures Group, Structural Technological Division, CSIR National
Aerospace Laboratories, Bengaluru-560017, Karnataka, India
Ravishankar N. Chikkangoudar
PhD Research Centre, Visvesvaraya Technological University, Belagavi-590008, Karnataka,
India; Department of Mechanical Engineering, K.L.E. Dr. M.S. Sheshgiri College of Engineering and Technology, Belagavi-590008, Karnataka, India
Subhas F. Patil
Department of Mechanical Engineering, K.L.E. Dr. M.S. Sheshgiri College of Engineering and
Technology, Belagavi-590008, Karnataka, India
Dynamics and Adaptive Structures Group, Structural Technologies Division, CSIR National
Aerospace Laboratories, Bengaluru-560017, Karnataka, India
Y. Charles Lu
Department of Mechanical Engineering, University of Kentucky, Lexington, KY 40506, USA
Department of Civil Engineering and Engineering Mechanics, Columbia University, 610
Seeley W. Mudd Building, 500 West 120th Street, Mail Code 4709, New York, 10027, New
The present work investigates the thermodynamic inconsistency in the definition of constant and nonconstant material functions for the one-dimensional shape-memory alloy constitutive models, with respect to the first principles. Thermodynamic consistency for the one-dimensional shape memory alloy differential equation is also investigated within the framework of one-dimensional elasticity at different length scales of stress and martensite fraction. It is shown that the previously proposed improvements in constitutive models using compatible nonconstant material functions cannot be derived from the first principles, yielding inconsistencies in the definition of the differential form of the constitutive
relations. Additionally, the compatibility conditions on stress due to the previously defined compatible material functions in terms of constant and nonconstant material functions are also discussed. Derivations are provided to highlight the inconsistencies in the definition of differential form of constitutive relation due to previously proposed expressions for material functions. Finally, in this work new expressions for the differential equation with constant material function and corresponding transformation tensor are derived from the first principles. Subsequently, a consistent form of a differential constitutive model for shape-memory alloys is proposed. The discussions highlight that there is further requirement to propose compatible forms of nonconstant material functions through consistent definition of differential form of constitutive relation, which may help to further rebuild the 2D and 3D SMA models based on multiscale modeling.
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