CONTINUUM MECHANICS for ENGINEERS

The simple, two-term Mooney-Rivlin model represents material response
well for small to moderate stretch values, but for large stretch higher order
terms are needed. Some of these different forms for the strain energy function
are associated with specific names. For instance, an Ogden material (Ogden,
1972) assumes a strain energy in the form
n n n n
W = ∑ + + −
µ α α α
λ λ λ
α
(8.3-9)
This form reduces to the Mooney-Rivlin material if n takes on values of 1
and 2 with α 1 = 2, α 2 = –2, µ 1 = 2C 1, and µ 2 = –2C 2.
8.4 Exact Solution for an Incompressible,
Neo-Hookean Material
n
n
[ 1 2 3 3]
Exact solutions for nonlinear elasticity problems come from using the equations
of motion, Eq 5.4-4, or for equilibrium, Eq 5.4-5, along with appropriate
boundary conditions. A neo-Hookean material is one whose uniaxial stress
response is proportional to the combination of stretch λ –1/λ 2 as was stated
in Sec. 8.1. The proportionality constant is the shear modulus, G. The strain
energy function in the neo-Hookean case is proportional to I 1 – 3 where I 1
is the first invariant of the left deformation tensor. A strain energy of this
form leads to stress components given by
σ =− pδ + GB
ij ij ij
(8.4-1)
where p is the indeterminate pressure term, G is the shear modulus, and B ij
is the left deformation tensor.
The stress components must satisfy the equilibrium equations which, in
the absence of body forces, are given as
σ ij, j = 0
(8.4-2)
Substitution of Eqs 4.6-16 and 8.4-1 into Eq 8.4-2 gives a differential equation
governing equilibrium
∂
∂x
σ ij
=− ∂p
+
∂x
j i
⎛ ∂ ∂ ⎞ ∂ ⎛ ∂ ∂ ⎞
⎜
⎟ + ⎜
⎟
⎝ ∂ ∂ ∂ ⎠ ∂ ⎝ ∂ ∂ ∂ ⎠
∂
⎡
⎤
⎢
⎥
∂
⎣
⎢
⎦
⎥ =
2
2
xi
X x
B j xj
XB
xi
G
0
XA XB
xj
XA
XA XB
xj
XA
(8.4-3)