A new approach in the solution of the thermoelasticity problems by the use of primal-mixed finite elements dr Dubravka Mijuca Faculty of Mathematics Department of Mechanics University of Belgrade Studentski trg 16 - 11000 Belgrade - P.O.Box 550 Serbia and Monte Negro www.matf.bg.ac.yu/~dmijuca
Motive The present investigation is motivated by idea that any numerical procedures of analysis which threats all variable of interest as fundamental ones (in the present case displacement, stress, temperature) are more reliable and more convenient for real engineering application for several reasons.
These reasons are: Better overall accuracy in the numerical results. Independent control of all field variables Reliability. Avoiding a post-processing recovery methods and techniques for calculations of dual variables which entails a lost of accuracy. In addition, modeling a stress as a independent fundamental variable permits to avoid spurious stress modes.
References D. Mijuca (2002) A New Reliable 3D Finite Element in Elasticity, Proceedings of the Fifth World Congress on Computational Mechanics (WCCM V), Editors: Mang, H.A.; Rammerstorfer, F.G.; Eberhardsteiner, J., Publisher: Vienna University of Technology, Austria A.A. Cannarozzi, F. Ubertini (2001) A mixed variational method for linear coupled thermoelastic analysis, International Journal of Solids and Structures 38, 717-739 S. Miranda, F. Ubertini (2001) On the consistency of finite element models, Comput. Methods Appl. Mech. Engrg., 190, 2411-2422 D. N. Arnold (1990) Mixed finite element methods for elliptic problems, Computer Methods in Applied Mechanics and Engineering, No. 82, 281‑300. J. Jaric, (1988) Mehanika kontinuuma, Gradjevinsa knjiga, Beograd
The initial-boundary value problem We recall that First Low of Motion of Cauchy’s and energy balance equation are given respectively by: Further boundary conditions per traction, displacement, temperature, thermal flux and convective heat transfer at the surface, are respectively given by: , .
The initial-boundary value problem Hence, constitutive equations in linear elasticity and constitutive equation of vector of heat flux, respectively are given by: Compatibility equations are given by . Initial temperature condition
Primal-mixed Formulation in Elasticity
A finite element implementation
System of FE Equations
The primal-mixed finite element method In the present contribution, the hexahedral finite elements HC8/27 of Taylor-Hood type in elasticity, as well as its coarser restriction HC8/9, in primal-mixed finite element approach based on Hellinger-Reissner’s principle, is considered:
Basic features of FE HC8/27 Reliable finite element in the full three-dimensional elasticity, with no case dependent numerical tune-ups. The analysis of bodies of arbitrary geometry, where both stresses and displacements are fundamental variables from continuous finite element sub-spaces Simultaneous calculations of all components of displacement and stresses
Thermal field In addition, for the present purpose we will assume that temperature field: is prescribed in Recall that initial strain due to temperature is given by:
Thermal stresses So, known temperature are simply introduced as prescribed temperature deformation.
The Mathematical Convergence Requirements The convergence requirements for shape functions of isoparametric finite element can be grouped into three categories: completeness, compatibility and stability.
Consistency The finite elements HC8/9 and HC8/27 are consistent, which means that they satisfy both consistency criteria: Completeness: the finite element polinomial functions contain all terms up to k=3 Compatibility: displacement finite element approximation functions are continuous (H1) over the interelement boundaries
First Stability Condition Conclusion: For the primal-mixed procedure the first Brezzi condition is always satisfied.
Discrete LBB (Second Brezzi Condition) Inf-sup Test
Numerical Inf-sup Test The inf-sup test is passed if the inf-sup values mh, for chosen sequence of finite element meshes, do not show decrease toward zero. On diagrams: Inf-sup test passed: Inf-sup test failed:
Unit Brick Model Problem. Side a=1. Young Modulus 1.
Full Cylinder With Clamped Ends. Thickness 1/100. Poisson’s ratio 0.3
Solid Cylinder / Taper / Sphere - Temperature LOADING: Linear temperature gradient in the radial and axial direction T °C=(x2 + y2)1/2 + z BOUNDARY CONDITIONS Symmetry on xz-plane, yz-plane, Face on xy-plane: zero z-displacement, Face HIH'I': zero z-displacement MATERIAL PROPERTIES: Isotropic, E=210E3MPa, n=0.3, a=2.3E-4 /C ELEMENT TYPES: Solid hexahedra OUTPUT: Direct stress (szz) at point A, TARGET -105 MPa
Solid Cylinder / Taper / Sphere – Temperature MAXIMAL STRESS RESULTS -99.36MPa
Solid Cylinder / Taper / Sphere – Temperature UNDEFORMED AND DEFORMED CONFIGURATION
LIME KILN UPGRADE - RECUPERATION
Lime Kiln Upgrade PHYSICAL PROPERTIES
Rotary Lime Kiln – Recouperator COMPONENT OF MAXIMAL STRESSES
Clamped Plate Under Temperature Gradient LOADING: Linear temperature gradient in the z-direction Tz=0=400, Tz=0.005=300, Tz=0.01=200 BOUNDARY CONDITIONS Symmetry on xz-plane, yz-plane MATERIAL PROPERTIES: Isotropic, E=210E3MPa, n=0.29, a=11.7E-6 /C ELEMENT TYPES: Solid hexahedra OUTPUT: maximal deflection in z wmax= -1mm
Clamped plate under temperature gradient MAXIMAL DISPLACEMENTS
Main advantages Main advantages in the accordance to the similar approaches in the literature are: Solving of the thin solid bodies response by the full 3d theory by the aspect of the geometry and relevant physical low Full respect of the tensorial character of the physical variables of interest Treatment of primal and dual variables as fundamental ones
Conclusions The new finite element approach for solving of thermoelasticity problems, when temperature field is known, is proposed. Results of preliminary investigation encourage the future research in semi coupled thermoelastic analysis
Abstract The results of preliminary investigation of a new three-dimensional finite element scheme in the linear semi-coupled static thermoelastic analysis of solid bodies are given. The main goal of present contribution is the straightforward calculation of displacements and stresses of a body subjected to the external mechanical forces and prescribed temperature distribution. Therefore, coordinate independent primal-mixed finite element formulation in elasticity is used for calculating the solid body response. For difference to other known approaches, all components of displacements vector and all independent components of stress tensor, are treated as fundamental variables and simultaneously calculated, eliminating the need for dual variables recovery, which entails a lost of accuracy. Furthermore, obtained finite element scheme is reliable, thus free of locking in the limit of incompressibility and insensitive to the high distortion of finite elements in finite element mesh. Consequently, even very thin solid bodies are treated as three-dimensional bodies. In addition, displacements and stresses are approximated by continuous approximation functions. In such a manner, genuine characteristics of a real model are preserved as much as possible, at least for always considering full model problem geometry and not neglecting any of the stress components. The numerical examples given enlighten the reliability of the approach proposed.