Difference between revisions of "Linear Wave-Body Interaction"

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<u>Linear theory</u>
 
<u>Linear theory</u>
* Assume: <center><math> \left| \frac{\partial\zeta}{\partial x} \right| = O(\varepsilon) \ll 1 \,  
+
* Assume: <center><math> \left| \frac{\partial\zeta}{\partial x} \right| = O(\varepsilon) \ll 1 \, </math></center>
  
</math></center>
+
Small wave steepness. Very good assumption for gravity waves in most cases, except when waves are near breaking conditions.
 
 
Small wave steepness. Very good assumption for gravity waves in most cases, except when waves are  
 
 
 
near breaking conditions.
 
  
 
* Assume <center><math> \left| \frac{\xi_1}{A} \right| = O(\varepsilon) \ll 1 \, </math></center>
 
* Assume <center><math> \left| \frac{\xi_1}{A} \right| = O(\varepsilon) \ll 1 \, </math></center>
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<center><math> \left| \xi_4 \right| = O(\varepsilon) \ll 1 \, </math></center>
 
<center><math> \left| \xi_4 \right| = O(\varepsilon) \ll 1 \, </math></center>
  
These assumptions are valid in most cases and most bodies of practical interest, unless the vessel  
+
These assumptions are valid in most cases and most bodies of practical interest, unless the vessel response at resonance is highly tuned or lightly damped. This is often the case for roll when a small amplitude wave interacts with a vessel weakly damped in roll.
 
 
response at resonance is highly tuned or lightly damped. This is often the case for roll when a  
 
 
 
small amplitude wave interacts with a vessel weakly damped in roll.
 
  
 
* The vessel dynamic responses in waves may be modelled according to linear system theory:
 
* The vessel dynamic responses in waves may be modelled according to linear system theory:
  
By virtue of linearity, a random seastate may be represented as the linear super position of plane  
+
By virtue of linearity, a random seastate may be represented as the linear super position of plane progressive waves;
 
 
progressive waves;
 
  
<center><math> \zeta(x,t) = \sum_j A_j \cos ( K_j x - \omega_j t + \epsilon_j ) </math></center>
+
<center><math> \zeta(x,t) = \sum_j A_j \cos ( K_j x - \omega_j t + \epsilon_j ) \,</math></center>
  
 
where in deep water: <math> K_j = \frac{\omega_j^2}{g} \,</math>.
 
where in deep water: <math> K_j = \frac{\omega_j^2}{g} \,</math>.
  
According to the theory of St. Denis and Pierson, the phases <math> \epsilon\, </math>, are random  
+
According to the theory of St. Denis and Pierson, the phases <math> \epsilon\, </math>, are random and uniformly distributed between <math> ( - \pi, \pi ] \, </math>. For now we assume them known constants:
 
 
and uniformly distributed between <math> ( - \pi, \pi ] \, </math>. For now we assume them known  
 
 
 
constants:
 
  
 
At <math> X=0\,</math>:
 
At <math> X=0\,</math>:
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systems.
 
systems.
  
* The equations of motion for <math> \xi_K(t)\,</math> follow from Newton's law applied to each  
+
* The equations of motion for <math> \xi_K(t)\,</math> follow from Newton's law applied to each mode in two dimensions.
 
 
mode in two dimensions.
 
  
 
* The same principles apply with very minor changes in three dimensions
 
* The same principles apply with very minor changes in three dimensions
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<u>Surge</u>:
 
<u>Surge</u>:
  
<center><math> \mathbf{M} \frac{d^2\xi_1}{dt^2} = F_{1\omega} ( \xi_1, \dot\xi_1, \ddot\xi_1, t)  
+
<center><math> \mathbf{M} \frac{d^2\xi_1}{dt^2} = F_{1\omega} ( \xi_1, \dot\xi_1, \ddot\xi_1, t) </math></center>
 
 
</math></center>
 
 
 
where <math> \frac{d\xi_1}{dt} = \dot\xi_1 \, </math> and <math> F_{1\omega} \, </math> is the
 
 
 
force on the body due to the fluid pressures, by virtue of linearity, <math> F_{1\omega} \,</math>
 
 
 
will be assumed to be a linear functional of <math> \xi_1, \dot\xi_1, \ddot\xi_1 \, </math>.
 
 
 
* Memory effects exist when surface waves are generated on the free surface, so <math> F_{1\omega}
 
 
 
\,</math> depends in principle on the entire history of the vessel displacement.
 
  
* We will adopt here the frequency domain formulation where the vessel motion has been going on  
+
where <math> \frac{d\xi_1}{dt} = \dot\xi_1 \, </math> and <math> F_{1\omega} \, </math> is the force on the body due to the fluid pressures, by virtue of linearity, <math> F_{1\omega} \,</math> will be assumed to be a linear functional of <math> \xi_1, \dot\xi_1, \ddot\xi_1 \, </math>.
  
over an infinite time interval, <math> (-\infty, t)\,</math> with <math> e^{i\omega t}\,</math>  
+
* Memory effects exist when surface waves are generated on the free surface, so <math> F_{1\omega} \,</math> depends in principle on the entire history of the vessel displacement.
  
dependence.
+
* We will adopt here the frequency domain formulation where the vessel motion has been going on over an infinite time interval, <math> (-\infty, t)\,</math> with <math> e^{i\omega t}\,</math> dependence.
  
 
We will therefore set:
 
We will therefore set:
  
<center><math> \xi_K(t) = \mathfrak{Re} \left\{ \Pi_K e^{i\omega t} \right\}, \qquad K=1,3,4  
+
<center><math> \xi_K(t) = \mathfrak{Re} \left\{ \Pi_K e^{i\omega t} \right\}, \qquad K=1,3,4 </math></center>
 
 
</math></center>
 
  
 
In this case we can linearize the water induced force on the body as follows:
 
In this case we can linearize the water induced force on the body as follows:
Line 107: Line 77:
 
<u>Surge</u>
 
<u>Surge</u>
  
<center><math> F_{1\omega}(t) = X_1(t) - A_{11} \ddot \xi_1 - A_{13} \ddot \xi_3 - A_{14} \ddot  
+
<center><math> F_{1\omega}(t) = X_1(t) - A_{11} \ddot \xi_1 - A_{13} \ddot \xi_3 - A_{14} \ddot \xi_4 </math><center>
 
 
\xi_4 </math><center>
 

Revision as of 23:28, 23 February 2007

Linear wave-body interactions

  • Consider a plane progressive regular wave interacting with a floating body in two dimensions.
  • The main concepts survive almost with no change in the more practical three-dimensional problem
[math]\displaystyle{ \zeta(t): \quad \mbox{ambient wave elevation. Regular or random with definitions to be given below}. \, }[/math]
[math]\displaystyle{ \xi_1(t): \quad \mbox{Body surge displacement} \, }[/math]
[math]\displaystyle{ \xi_3(t): \quad \mbox{Body heave displacement} \, }[/math]
[math]\displaystyle{ \xi_4(t): \quad \mbox{Body roll displacement} \, }[/math]

Linear theory

  • Assume:
    [math]\displaystyle{ \left| \frac{\partial\zeta}{\partial x} \right| = O(\varepsilon) \ll 1 \, }[/math]

Small wave steepness. Very good assumption for gravity waves in most cases, except when waves are near breaking conditions.

  • Assume
    [math]\displaystyle{ \left| \frac{\xi_1}{A} \right| = O(\varepsilon) \ll 1 \, }[/math]
[math]\displaystyle{ \left| \frac{\xi_3}{A} \right| = O(\varepsilon) \ll 1 \, }[/math]
[math]\displaystyle{ \left| \xi_4 \right| = O(\varepsilon) \ll 1 \, }[/math]

These assumptions are valid in most cases and most bodies of practical interest, unless the vessel response at resonance is highly tuned or lightly damped. This is often the case for roll when a small amplitude wave interacts with a vessel weakly damped in roll.

  • The vessel dynamic responses in waves may be modelled according to linear system theory:

By virtue of linearity, a random seastate may be represented as the linear super position of plane progressive waves;

[math]\displaystyle{ \zeta(x,t) = \sum_j A_j \cos ( K_j x - \omega_j t + \epsilon_j ) \, }[/math]

where in deep water: [math]\displaystyle{ K_j = \frac{\omega_j^2}{g} \, }[/math].

According to the theory of St. Denis and Pierson, the phases [math]\displaystyle{ \epsilon\, }[/math], are random and uniformly distributed between [math]\displaystyle{ ( - \pi, \pi ] \, }[/math]. For now we assume them known constants:

At [math]\displaystyle{ X=0\, }[/math]:

[math]\displaystyle{ \zeta(t) = \sum_j A_j \cos ( \omega_j t - \epsilon_j ) }[/math]
[math]\displaystyle{ = \mathfrak{Re} \sum_j A_j e^{i\omega_j t - i \epsilon_j} }[/math]

And the corresponding vessel responses follow from linearity in the form:

[math]\displaystyle{ \xi_K (t) = \mathfrak{Re} \sum_j \Pi_K (\omega_j) e^{i\omega_j t - i\epsilon_j}, \qquad K = 1, 3, 4 }[/math]

Where [math]\displaystyle{ \Pi_K (\omega) \, }[/math] is the complex Rao for mode [math]\displaystyle{ K\, }[/math]. It is the

object of linear seakeeping theory. In the frequency domain to derive equations for [math]\displaystyle{ \Pi (\omega)\, }[/math]. The treatment in the stochastic case is then a simple exercize in linear

systems.

  • The equations of motion for [math]\displaystyle{ \xi_K(t)\, }[/math] follow from Newton's law applied to each mode in two dimensions.
  • The same principles apply with very minor changes in three dimensions

Surge:

[math]\displaystyle{ \mathbf{M} \frac{d^2\xi_1}{dt^2} = F_{1\omega} ( \xi_1, \dot\xi_1, \ddot\xi_1, t) }[/math]

where [math]\displaystyle{ \frac{d\xi_1}{dt} = \dot\xi_1 \, }[/math] and [math]\displaystyle{ F_{1\omega} \, }[/math] is the force on the body due to the fluid pressures, by virtue of linearity, [math]\displaystyle{ F_{1\omega} \, }[/math] will be assumed to be a linear functional of [math]\displaystyle{ \xi_1, \dot\xi_1, \ddot\xi_1 \, }[/math].

  • Memory effects exist when surface waves are generated on the free surface, so [math]\displaystyle{ F_{1\omega} \, }[/math] depends in principle on the entire history of the vessel displacement.
  • We will adopt here the frequency domain formulation where the vessel motion has been going on over an infinite time interval, [math]\displaystyle{ (-\infty, t)\, }[/math] with [math]\displaystyle{ e^{i\omega t}\, }[/math] dependence.

We will therefore set:

[math]\displaystyle{ \xi_K(t) = \mathfrak{Re} \left\{ \Pi_K e^{i\omega t} \right\}, \qquad K=1,3,4 }[/math]

In this case we can linearize the water induced force on the body as follows:

Surge

[math]\displaystyle{ F_{1\omega}(t) = X_1(t) - A_{11} \ddot \xi_1 - A_{13} \ddot \xi_3 - A_{14} \ddot \xi_4 }[/math]
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