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| tue || apr || 15 || kinematics - configurations, deformation || [http://biomechanics.stanford.edu/me338/me338_n05.pdf n05] || | | tue || apr || 15 || kinematics - configurations, deformation || [http://biomechanics.stanford.edu/me338/me338_n05.pdf n05] || | ||
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− | | thu || apr || 17 || kinematics - temporal derivatives || [http://biomechanics.stanford.edu/me338/ | + | | thu || apr || 17 || kinematics - temporal derivatives || [http://biomechanics.stanford.edu/me338/me338_n06.pdf n06] || [http://biomechanics.stanford.edu/me338/me338_h01solution.pdf h01 solution] |
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− | | tue || apr || 22 || kinematics - spatial derivatives || || [http://biomechanics.stanford.edu/me338/me338_h02.pdf h02] | + | | tue || apr || 22 || kinematics - spatial derivatives || [http://biomechanics.stanford.edu/me338/me338_n07.pdf n07] || [http://biomechanics.stanford.edu/me338/me338_h02.pdf h02] |
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− | | thu || apr || 24 || kinematics - strain measures || || | + | | thu || apr || 24 || kinematics - strain measures || [http://biomechanics.stanford.edu/me338/me338_n08.pdf n08] || |
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| tue || apr || 29 || kinematics - examples, midterm evaluation || [http://biomechanics.stanford.edu/me338/me338_n09.pdf n09] || [http://biomechanics.stanford.edu/me338/me338_e01.pdf evaluation] | | tue || apr || 29 || kinematics - examples, midterm evaluation || [http://biomechanics.stanford.edu/me338/me338_n09.pdf n09] || [http://biomechanics.stanford.edu/me338/me338_e01.pdf evaluation] |
Revision as of 14:16, 8 May 2008
Contents |
me338A - continuum mechanics
ellen kuhl,
serdar goktepe,
gilwoo choi spring 2008 |
goals
although the basic concepts of continuum mechanics have been established more than five decades ago, the 21 century faces many new and exciting potential applications of continuum mechanics that go way beyond the standard classical theory. when applying continuum mechanics to these challenging new phenomena, it is important to understand the main three ingredients of continuum mechanics: the kinematic equations, the balance equations and the constitutive equations. after a brief repetition of the relevant equations in tensor algebra and analysis, this class will introduce the basic concepts of finite deformation kinematics. within the framework of large deformations, we will then discuss the balance equations for mass, momentum, moment of momentum, energy and entropy. while all these equations are general and valid for any kind of material, the last set of equations, the constitutive equations, specifies particular subclasses of materials. in particular, we will focus on isotropic and anisotropic hyperelasticity and on viscoelasticity and elastodamage. finally, we will briefly address variational principles that characterize the governing equations.
grading
- 50 % homework - 3 homework assignments, 16.7% each
- 30 % midterm - open book, open notes
- 20 % final project - written evaluation of a manuscript and its discussion in class
syllabus
day | date | topic | notes | hw | |
---|---|---|---|---|---|
tue | apr | 01 | introduction - why potatos? | n01 | |
thu | apr | 03 | vectors & tensors - vector algebra | n02 | |
tue | apr | 08 | vectors & tensors - tensor algebra | n03 | h01 |
thu | apr | 10 | vectors & tensors - tensor analysis | n04 | |
tue | apr | 15 | kinematics - configurations, deformation | n05 | |
thu | apr | 17 | kinematics - temporal derivatives | n06 | h01 solution |
tue | apr | 22 | kinematics - spatial derivatives | n07 | h02 |
thu | apr | 24 | kinematics - strain measures | n08 | |
tue | apr | 29 | kinematics - examples, midterm evaluation | n09 | evaluation |
thu | may | 01 | balance equations - concept of stress | n10 | h02 due |
tue | may | 06 | balance equations - mass, momentum | n11 | h03 |
thu | may | 08 | balance equations - energy, entropy, master balance law | n12 | |
tue | may | 13 | constitutive equations - hyperelasticity, isotropic | ||
thu | may | 15 | constitutive equations - hyperelasticity, anisotropic | h03 due | |
tue | may | 20 | midterm | ||
thu | may | 22 | constitutive equations - viscoelasticity | ||
tue | may | 27 | constitutive equations - elastodamage | ||
thu | may | 29 | variational principles - virtual work | ||
tue | jun | 03 | journal club - final project discussion |
suggested reading
... this is the book we will use in class...
holzapfel ga: nonlinear solid mechanics, a continuum approach for engineering, john wiley & sons, 2000
... and here are some other cool books for additional reading...
murnaghan fd: finite deformation of an elastic solid, john wiley & sons, 1951
eringen ac: nonlinear theory of continuous media, mc graw-hill, 1962
truesdell c, noll, w: the non-linear field theories of mechanics, springer, 1965
eringen ac: mechanics of continua, john wiley & sons, 1967
malvern le: introduction to the mechanics of a continuous medium, prentice hall, 1969
oden jt: finite elements of nonlinear continua, dover reprint, 1972
chadwick p: continuum mechanics - concise theory and problems, dover reprint, 1976
ogden, rw: non-linear elastic deformations, dover reprint, 1984
maugin ga: the thermodynamics of plasticity and fracture, cambridge university press, 1992
spencer ajm: continuum mechanics, dover reprint, 1992
robers aj: one-dimensional introduction to continuum mechanics, world scientific, 1994
bonet j, wood rd: nonlinear continuum mechanics for fe analysis, cambridge university press, 1997
silhavy m: the mechanics and thermodynamics of continuous media, springer, 1997
haupt p: continuum mechanics and theory of materials, springer, 2000
podio-guidugli p: a primer in elasticity, kluwer academic press, 2000
liu is: continuum mechanics, springer, 2002
reddy jn: an introduction to continuum mechanics, cambridge university press, 2007