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Revision as of 19:24, 15 September 2013
, 19:24, 15 September 2013restore original appendices ... with a slight permutation ...
==Appendices==
==Appendices==
===Appendix A===
===Appendix 1. Propositional Forms and Differential Expansions===
====Table A1. Propositional Forms on Two Variables====
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\end{matrix}</math>
\end{matrix}</math>
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====Table A2. Propositional Forms on Two Variables====
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| <math>1\!</math>
| <math>1\!</math>
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====Table A3. E''f'' Expanded Over Differential Features====
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| style="border-top:1px solid black; border-left:1px solid black" | <math>16\!</math>
| style="border-top:1px solid black; border-left:1px solid black" | <math>16\!</math>
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====Table A4. D''f'' Expanded Over Differential Features====
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| style="border-top:1px solid black; border-left:1px solid black" | <math>0\!</math>
| style="border-top:1px solid black; border-left:1px solid black" | <math>0\!</math>
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====Table A5. E''f'' Expanded Over Ordinary Features====
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| style="border-top:1px solid black; border-left:1px solid black" | <math>1\!</math>
| style="border-top:1px solid black; border-left:1px solid black" | <math>1\!</math>
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====Table A6. D''f'' Expanded Over Ordinary Features====
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===Appendix B===
====Table A12. Detail of Calculation for the Difference Map====
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{| align="center" cellpadding="6" cellspacing="0" style="border-bottom:4px double black; border-left:4px double black; border-right:4px double black; border-top:4px double black; text-align:center; width:80%"
{| align="center" cellpadding="6" cellspacing="0" style="border-bottom:4px double black; border-left:4px double black; border-right:4px double black; border-top:4px double black; text-align:center; width:80%"
|+ style="height:30px" | <math>\text{Table B1.} ~~ \text{Detail of Calculation for}~ \mathrm{E}f + f = \mathrm{D}f\!</math>
|+ style="height:30px" | <math>\text{Table A12.} ~~ \text{Detail of Calculation for}~ {\mathrm{E}f + f = \mathrm{D}f}\!</math>
|- style="background:ghostwhite"
|- style="background:ghostwhite"
| style="width:6%" |
| style="width:6%" |
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===Appendix C===
===Appendix 2. Computational Details===
====Operator Maps for the Logical Disjunction ''f''(u, v)====
=====Computation of “εf”=====
=====Computation of “Ef”=====
=====Computation of “Df” (1)=====
=====Computation of “Df” (2)=====
=====Computation of “df”=====
=====Computation of “rf”=====
=====Computation Summary for Disjunction=====
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{| align="center" border="1" cellpadding="20" cellspacing="0" style="text-align:left; width:90%"
|+ style="height:30px" | <math>\text{Table 66-i.} ~~ \text{Computation Summary for}~ f(u, v) = \texttt{((} u \texttt{)(} v \texttt{))}\!</math>
|
<math>\begin{array}{c*{8}{l}}
\boldsymbol\varepsilon f
& = & u \!\cdot\! v \cdot 1
& + & u \texttt{(} v \texttt{)} \cdot 1
& + & \texttt{(} u \texttt{)} v \cdot 1
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot 0
\\[6pt]
\mathrm{E}f
& = & u \!\cdot\! v \cdot \texttt{(} \mathrm{d}u \cdot \mathrm{d}v \texttt{)}
& + & u \texttt{(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{(} \mathrm{d}v \texttt{))}
& + & \texttt{(} u \texttt{)} v \cdot \texttt{((} \mathrm{d}u \texttt{)} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \texttt{((} \mathrm{d}u \texttt{)(} \mathrm{d}v \texttt{))}
\\[6pt]
\mathrm{D}f
& = & u \!\cdot\! v \cdot \mathrm{d}u \cdot \mathrm{d}v
& + & u \texttt{(} v \texttt{)} \cdot \mathrm{d}u \texttt{(} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)} v \cdot \texttt{(} \mathrm{d}u \texttt{)} \mathrm{d}v
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \texttt{((} \mathrm{d}u \texttt{)(} \mathrm{d}v \texttt{))}
\\[6pt]
\mathrm{d}f
& = & u \!\cdot\! v \cdot 0
& + & u \texttt{(} v \texttt{)} \cdot \mathrm{d}u
& + & \texttt{(} u \texttt{)} v \cdot \mathrm{d}v
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
\\[6pt]
\mathrm{r}f
& = & u \!\cdot\! v \cdot \mathrm{d}u \cdot \mathrm{d}v
& + & u \texttt{(} v \texttt{)} \cdot \mathrm{d}u \cdot \mathrm{d}v
& + & \texttt{(} u \texttt{)} v \cdot \mathrm{d}u \cdot \mathrm{d}v
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \mathrm{d}u \cdot \mathrm{d}v
\end{array}</math>
|}
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====Operator Maps for the Logical Equality ''g''(u, v)====
======Computation of “εg”======
=====Computation of “Eg”=====
=====Computation of “Dg” (1)=====
=====Computation of “Dg” (2)=====
=====Computation of “dg”=====
=====Computation of “rg”=====
=====Computation Summary for Equality=====
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{| align="center" border="1" cellpadding="20" cellspacing="0" style="text-align:left; width:90%"
|+ style="height:30px" | <math>\text{Table 66-ii.} ~~ \text{Computation Summary for}~ g(u, v) = \texttt{((} u \texttt{,} v \texttt{))}\!</math>
|
<math>\begin{array}{c*{8}{l}}
\boldsymbol\varepsilon g
& = & u \!\cdot\! v \cdot 1
& + & u \texttt{(} v \texttt{)} \cdot 0
& + & \texttt{(} u \texttt{)} v \cdot 0
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot 1
\\[6pt]
\mathrm{E}g
& = & u \!\cdot\! v \cdot \texttt{((} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{))}
& + & u \texttt{(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)} v \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \texttt{((} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{))}
\\[6pt]
\mathrm{D}g
& = & u \!\cdot\! v \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & u \texttt{(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)} v \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
\\[6pt]
\mathrm{d}g
& = & u \!\cdot\! v \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & u \texttt{(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)} v \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot \texttt{(} \mathrm{d}u \texttt{,} \mathrm{d}v \texttt{)}
\\[6pt]
\mathrm{r}g
& = & u \!\cdot\! v \cdot 0
& + & u \texttt{(} v \texttt{)} \cdot 0
& + & \texttt{(} u \texttt{)} v \cdot 0
& + & \texttt{(} u \texttt{)(} v \texttt{)} \cdot 0
\end{array}</math>
|}
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===Appendix 3. Source Materials===
===Appendix D===
===Appendix 4. Various Definitions of the Tangent Vector===
==References==
==References==
