PSI - Issue 26
Merdaci Slimane et al. / Procedia Structural Integrity 26 (2020) 35–45 Slimane et al. / Structural Integrity Procedia 00 (2020) 000 – 000
39
5
where (σ x , σ y , τ xy , τ yz , τ yx ) and (ε x , ε y , Ɣ xy , Ɣ yz , Ɣ zx ) are the stress and strain components, respectively. Using the material properties defined in Eq. (6), the stiffness coefficients, Q ij , can be expressed as
ν E z
E z
( )
( )
( )
E z 1 ν −
(7)
,
,
,
11 Q Q
Q
Q Q Q
= =
=
= = =
(
)
22
12
44
55
66
2
2
2 1 ν +
1 ν −
5. Governing equations The Hamilton’s principle is used herein to derive the equations of motion. The principle can be stated in analytical from as Reddy (2002).
T
(8)
0 δU δK dt 0 ( ) − =
Where δ U: variation of strain energy; δ K: variation of kinetic energy. The variation of strain energy of the plate is calculated by
h 2 /
(9a)
δU
σ δ ε σ δ ε τ δ γ τ δ γ τ δ γ dA dz + + + +
=
x x y y xy xy yz yz xz xz A h 2 / −
0 A δU N δ ε N δ ε N δ ε M δ k M δ k M δ k M δ k M δ k M δ k S δ γ S δ γ dA = + + + + + + + + + + (9b) Where “ A ” is the top surface, and stress resultants N, M, and S are defined by 0 0 b b x x b b y y b b xy xy s s s s s s s s s s x x y y xy xy x x y y xy xy yz yz xz xz
x N N N M M M M M M , , , , , , y b x b y s s
1 f z ( )
xy
h 2 /
h 2 /
(
)
(
)
(
)
(10)
b
s
s
σ σ τ
z dz S S , ,
xz yz τ τ g z dz , ( ) .
x y xy , ,
=
=
xy
xz yz
h 2 /
h 2 /
−
−
s
x
y
xy
The variation of kinetic energy of the plate can be written as
h 2 /
(11)
δK
ρ z u δu vδv w δw dAdz ( )( ) + +
=
A
h 2 /
−
Where dot-superscript convention indicates the differentiation with respect to the time variable t; and (I 1 , I 2 , I 3 , I 4 , I 5 , I 6 ) are mass inertias defined as
h 2 /
(12)
(
)
(
)
− =
2
2
1 z z f z zf z f z , , , ( ), ( ), ( ) ( ) ρ z dz
1 2 3 4 5 6 I I I I I I , , , , ,
h 2 /
By substituting Eq. (4) into Eq. (6) and integrating through the thickness of the plate, the stress resultants are given as
s ε M A D D k S A γ M B D H k , = = b s b s s s s s s N A B B
(13)
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