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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 58</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">desirable for ease of implementation and analysis, as the state-space representation allows the use of vector and matrix techniques. State-space techniques relevant to both continuous- and discrete-time systems are discussed in Sec. 3.3.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">For analysis only, let the transfer function of Eqs. (3.7) be decomposed into two separate filtering operations:</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="382e0ec5efe7af50c13234e8ba6f2d19.gif" border="0" alt="0058-01.GIF" width="344" height="43" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="4e83990cd931ddeb30c27cb925995ac5.gif" border="0" alt="0058-02.GIF" width="344" height="24" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">as depicted in Fig. 3.1. For the <i>n</i>th-order differential equation corresponding to Eq. (3.11), define a state vector x such that x</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"> = (<i>v</i>, <i>v</i></font><font face="Times New Roman, Times, Serif" size="2"><sup>(1)</sup></font><font face="Times New Roman, Times, Serif" size="3">,聽.聽.聽.聽, <i>v</i></font><font face="Times New Roman, Times, Serif" size="2"><sup>(<i>n</i>-1)</sup></font><font face="Times New Roman, Times, Serif" size="3">). Then,</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="c8310c4505f3745321d4136f242bfb2b.gif" border="0" alt="0058-03.GIF" width="417" height="49" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">A state-space implementation of this system [i.e., Eq. (3.11)] is shown in the left half of Fig. 3.2. The system output is represented as</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3"><img src="32f405bd46627e04a4ee78f807080a08.gif" border="0" alt="0058-04.GIF" width="223" height="47" /></font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">The state-space implementation of this filter is represented in the right half of Fig. 3.2. Since the filter involves pure differentiators, it is unimplementable. However, all state variables required in the implementation in the right half of Fig. 3.2 [i.e., Eq. (3.12)] are already available in the state-space implementation shown in the left half of the figure. Therefore the state-space implementation of Fig. 3.3 implements the original filter.</font></td>
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  <td><font face="Times New Roman, Times, Serif" size="3">In matrix notation, the system can be described as</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="f9df938163ac60a550ea97a96bc842eb.gif" border="0" alt="0058-05.GIF" width="316" height="47" /></font></td>
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  <td align="center"><font face="Times New Roman, Times, Serif" size="3"><img src="208a35bded5127975264ec972d861ed6.gif" border="0" alt="0058-06.GIF" width="164" height="97" /></font></td>
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  <td align="center"><font face="Times New Roman, Times, Serif" size="2">Figure聽3.1<br />
Decomposition聽of聽transfer聽function.</font></td>
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聽




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