ME3025 COMPUTATIONAL FLUID DYNAMICS SYLLABUS | ANNA UNIVERSITY BE MATERIALS SCIENCE AND ENGINEERING 8TH SEMESTER SYLLABUS REGULATION 2008 2011 2012-2013 BELOW IS THE ANNA UNIVERSITY 8TH SEMESTER B.E MATERIALS SCIENCE ENGINEERING DEPARTMENT SYLLABUS, TEXTBOOKS, REFERENCE BOOKS,EXAM PORTIONS,QUESTION BANK,PREVIOUS YEAR QUESTION PAPERS,MODEL QUESTION PAPERS, CLASS NOTES, IMPORTANT 2 MARKS, 8 MARKS, 16 MARKS TOPICS. IT IS APPLICABLE FOR ALL STUDENTS ADMITTED IN THE YEAR 2011 2012-2013 (ANNA UNIVERSITY CHENNAI,TRICHY,MADURAI, TIRUNELVELI,COIMBATORE), 2008 REGULATION OF ANNA UNIVERSITY CHENNAI AND STUDENTS ADMITTED IN ANNA UNIVERSITY CHENNAI DURING 2009
ME3025 COMPUTATIONAL FLUID DYNAMICS L T P C
3 0 0 3
AIM
To impart the knowledge of numerical techniques to the solution of fluid dynamics and
heat transfer problems.
OBJECTIVES
To introduce Governing Equations of vicous fluid flows
To introduce numerical modeling and its role in the field of fluid flow and heat transfer
To enable the students to understand the various discretization methods, solution
procedures and turbulence modeling.
To create confidence to solve complex problems in the field of fluid flow and heat
transfer by using high speed computers.
83
PREREQUISITE:
Fundamental Knowledge of partial differential equations, Heat Transfer and Fluid
Mechanics
UNIT I GOVERNING EQUATIONS AND BOUNDARY CONDITIONS 8
Basics of computational fluid dynamics – Governing equations of fluid dynamics –
Continuity, Momemtum and Energy equations – Chemical species transport – Physical
boundary conditions – Time-averaged equations for Turbulent Flow – Turbulent–Kinetic
Energy Equations – Mathematical behaviour of PDEs on CFD - Elliptic, Parabolic and
Hyperbolic equations.
UNIT II FINITE DIFFERENCE METHOD 9
Derivation of finite difference equations – Simple Methods – General Methods for first
and second order accuracy – solution methods for finite difference equations – Elliptic
equations – Iterative solution Methods – Parabolic equations – Explicit and Implicit
schemes – Example problems on elliptic and parabolic equations.
UNIT III FINITE VOLUME METHOD (FVM) FOR DIFFUSION 9
Finite volume formulation for steady state One, Two and Three -dimensional diffusion
problems. One dimensional unsteady heat conduction through Explicit, Crank – Nicolson
and fully implicit schemes.
UNIT IV FINITE VOLUME METHOD FOR CONVECTION DIFFUSION 10
Steady one-dimensional convection and diffusion – Central, upwind differencing
schemes-properties of discretization schemes – Conservativeness, Boundedness,
Trasnportiveness, Hybrid, Power-law, QUICK Schemes.
UNIT V CALCULATION FLOW FIELD BY FVM 9
Representation of the pressure gradient term and continuity equation – Staggered grid –
Momentum equations – Pressure and Velocity corrections – Pressure Correction
equation, SIMPLE algorithm and its variants. Turbulence models, mixing length model,
Two equation (k-Є) models – High and low Reynolds number models.
TOTAL : 45 PERIODS
TEXT BOOKS:
1. T. J. Chung, Computational Fluid Dynamics, Cambridge University, Press, 2002.\
2. Versteeg, H. K., and Malalasekera, W., An Introduction to Computational Fluid
Dynamics: The finite volume Method, Longman, 1998.
3. Ghoshdastidar, P. S., Computer simulation of flow and heat transfer, Tata McGraw
Hill Publishing Company Ltd., 1998.
REFERENCES:
1. Patankar, S.V. Numerical Heat Transfer and Fluid Flow, Hemisphere Publishing
Corporation, 2004.
2. Muralidhar, K., and Sundararajan, T., computationsl Fluid Flow and Heat Transfer,
Narosa Publishing House, NewDelhi, 1995.
3. Ghoshdastidar P.S., Heat Transfer, Oxford Unversity Press, 2005.
4. Prodip Niyogi, Chakrabarty .S.K., Laha .M.K. Introduction to Computational Fluid
Dynamics, Pearson Education, 2005.
5. Introduction to Computational Fluid Dynamics Anil W. Date Cambridge University
Press, 2005.
ME3025 COMPUTATIONAL FLUID DYNAMICS L T P C
3 0 0 3
AIM
To impart the knowledge of numerical techniques to the solution of fluid dynamics and
heat transfer problems.
OBJECTIVES
To introduce Governing Equations of vicous fluid flows
To introduce numerical modeling and its role in the field of fluid flow and heat transfer
To enable the students to understand the various discretization methods, solution
procedures and turbulence modeling.
To create confidence to solve complex problems in the field of fluid flow and heat
transfer by using high speed computers.
83
PREREQUISITE:
Fundamental Knowledge of partial differential equations, Heat Transfer and Fluid
Mechanics
UNIT I GOVERNING EQUATIONS AND BOUNDARY CONDITIONS 8
Basics of computational fluid dynamics – Governing equations of fluid dynamics –
Continuity, Momemtum and Energy equations – Chemical species transport – Physical
boundary conditions – Time-averaged equations for Turbulent Flow – Turbulent–Kinetic
Energy Equations – Mathematical behaviour of PDEs on CFD - Elliptic, Parabolic and
Hyperbolic equations.
UNIT II FINITE DIFFERENCE METHOD 9
Derivation of finite difference equations – Simple Methods – General Methods for first
and second order accuracy – solution methods for finite difference equations – Elliptic
equations – Iterative solution Methods – Parabolic equations – Explicit and Implicit
schemes – Example problems on elliptic and parabolic equations.
UNIT III FINITE VOLUME METHOD (FVM) FOR DIFFUSION 9
Finite volume formulation for steady state One, Two and Three -dimensional diffusion
problems. One dimensional unsteady heat conduction through Explicit, Crank – Nicolson
and fully implicit schemes.
UNIT IV FINITE VOLUME METHOD FOR CONVECTION DIFFUSION 10
Steady one-dimensional convection and diffusion – Central, upwind differencing
schemes-properties of discretization schemes – Conservativeness, Boundedness,
Trasnportiveness, Hybrid, Power-law, QUICK Schemes.
UNIT V CALCULATION FLOW FIELD BY FVM 9
Representation of the pressure gradient term and continuity equation – Staggered grid –
Momentum equations – Pressure and Velocity corrections – Pressure Correction
equation, SIMPLE algorithm and its variants. Turbulence models, mixing length model,
Two equation (k-Є) models – High and low Reynolds number models.
TOTAL : 45 PERIODS
TEXT BOOKS:
1. T. J. Chung, Computational Fluid Dynamics, Cambridge University, Press, 2002.\
2. Versteeg, H. K., and Malalasekera, W., An Introduction to Computational Fluid
Dynamics: The finite volume Method, Longman, 1998.
3. Ghoshdastidar, P. S., Computer simulation of flow and heat transfer, Tata McGraw
Hill Publishing Company Ltd., 1998.
REFERENCES:
1. Patankar, S.V. Numerical Heat Transfer and Fluid Flow, Hemisphere Publishing
Corporation, 2004.
2. Muralidhar, K., and Sundararajan, T., computationsl Fluid Flow and Heat Transfer,
Narosa Publishing House, NewDelhi, 1995.
3. Ghoshdastidar P.S., Heat Transfer, Oxford Unversity Press, 2005.
4. Prodip Niyogi, Chakrabarty .S.K., Laha .M.K. Introduction to Computational Fluid
Dynamics, Pearson Education, 2005.
5. Introduction to Computational Fluid Dynamics Anil W. Date Cambridge University
Press, 2005.
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