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this book can help you to get a better performance in the gps development

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<p></p><table border="0" cellspacing="0" cellpadding="0" width="100%"><tr><td align="right"><font face="Times New Roman, Times, Serif" size="2" color="#FF0000">Page 200</font></td></tr></table><table border="0" cellspacing="0" cellpadding="0"><tr><td rowspan="5"></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">For the tangent-plane implementation, the three components of the nominal error state are defined to be</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="4a2c7d5e312c175661f0e46626530320.gif" border="0" alt="0200-01.GIF" width="303" height="19" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="4ecd5c5ee09b7f4e592712377beaab11.gif" border="0" alt="0200-02.GIF" width="307" height="19" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="56b70f9bd476d77974e5968ef34e625a.gif" border="0" alt="0200-03.GIF" width="308" height="20" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">6.4.1.1<br />
Rotation Matrix Error Dynamics</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">Because of misalignment, measurement, computation, and initialization errors, the platform-to-navigation-frame transformation will be in error. For error analysis, the transformation error can be represented by a multiplicative small-angle transformation:</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="165a0e51223fb387f660ee8d1f9a035c.gif" border="0" alt="0200-04.GIF" width="299" height="22" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">where (I - P) represents a small-angle transformation from the actual navigation frame to the computed navigation frame. Since both the actual and the computed navigation frames are orthogonal, P is a skew-symmetric matrix:</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="e6f51eb16240e2928d566928fdafd96f.gif" border="0" alt="0200-05.GIF" width="339" height="61" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">where </font><font face="Symbol" size="3">r</font><font face="Times New Roman, Times, Serif" size="3"> = [</font><font face="Symbol" size="3">e</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>N</i></sub></font><font face="Times New Roman, Times, Serif" size="3">, </font><font face="Symbol" size="3">e</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>E</i></sub></font><font face="Times New Roman, Times, Serif" size="3">, </font><font face="Symbol" size="3">e</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>D</i></sub></font><font face="Times New Roman, Times, Serif" size="3">] are the positively defined small-angle rotations about the navigation-frame axis to align the navigation frame with the computed navigation frame. For the components of </font><font face="Symbol" size="3">r</font><font face="Times New Roman, Times, Serif" size="3">, </font><font face="Symbol" size="3">e</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>N</i></sub></font><font face="Times New Roman, Times, Serif" size="3">, and </font><font face="Symbol" size="3">e</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>E</i></sub></font><font face="Times New Roman, Times, Serif" size="3"> are referred to as tilt errors and </font><font face="Symbol" size="3">e</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>D</i></sub></font><font face="Times New Roman, Times, Serif" size="3"> is referred to as the heading, yaw, or azimuth error.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">The following relations will be useful in the subsequent analysis:</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="b6bf07ae09d35495df255bf4585aef3a.gif" border="0" alt="0200-06.GIF" width="301" height="21" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="7682564b37f5987d5eaa629d3ef70d04.gif" border="0" alt="0200-07.GIF" width="301" height="21" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="c522a5b889548034a06fcc14dfce0331.gif" border="0" alt="0200-08.GIF" width="301" height="21" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">These relations are accurate to first order and are straightforward to verify, considering that (I - P)</font><font face="Times New Roman, Times, Serif" size="2"><sup>-1</sup></font><font face="Times New Roman, Times, Serif" size="3"> = (I + P) to first order and P</font><font face="Times New Roman, Times, Serif" size="2"><sup><i>T</i></sup></font><font face="Times New Roman, Times, Serif" size="3"> = -P.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">For the tangent-plane navigation, the navigation system must maintain the rotation matrix R</font><font face="Times New Roman, Times, Serif" size="1"><sub><i>p</i>2<i>n</i></sub></font><font face="Times New Roman, Times, Serif" size="3">. From Sec. 2.5, the linear differential equation describing the dynamics of this transformation is</font><font face="Times New Roman, Times, Serif" size="2"><sup>**</sup></font><font face="Times New Roman, Times, Serif" size="3" color="#FFFF00"></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="fe35e6ecebad4c2978d63cd23041185d.gif" border="0" alt="0200-09.GIF" width="289" height="22" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="2"><sup>** </sup>Three mechanization approaches are presented in the cited section. Since all are equivalent in terms of the resulting transformation, the presented error analysis is valid no matter which mechanization approach is selected.</font></td>
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