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Table 3. Relational Composition
o---------o---------o---------o---------o
| # !1! | !1! | !1! |
o=========o=========o=========o=========o
| L # X | Y | |
o---------o---------o---------o---------o
| M # | Y | Z |
o---------o---------o---------o---------o
| L o M # X | | Z |
o---------o---------o---------o---------o
|
Table 3. Relational Composition
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\(\mathit{1}\!\)
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\(\mathit{1}\!\)
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\(\mathit{1}\!\)
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\(L\!\)
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\(X\!\)
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\(Y\!\)
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\(M\!\)
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\(Y\!\)
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\(Z\!\)
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\(L \circ M\)
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\(X\!\)
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\(Z\!\)
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Grammar Stuff
Table 13. Algorithmic Translation Rules
\(\text{Sentence in PARCE}\!\)
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\(\xrightarrow{\operatorname{Parse}}\)
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\(\text{Graph in PARC}\!\)
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\(\operatorname{Conc}^0\)
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\(\xrightarrow{\operatorname{Parse}}\)
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\(\operatorname{Node}^0\)
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\(\operatorname{Conc}_{j=1}^k s_j\)
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\(\xrightarrow{\operatorname{Parse}}\)
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\(\operatorname{Node}_{j=1}^k \operatorname{Parse} (s_j)\)
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\(\operatorname{Surc}^0\)
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\(\xrightarrow{\operatorname{Parse}}\)
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\(\operatorname{Lobe}^0\)
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\(\operatorname{Surc}_{j=1}^k s_j\)
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\(\xrightarrow{\operatorname{Parse}}\)
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\(\operatorname{Lobe}_{j=1}^k \operatorname{Parse} (s_j)\)
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Table 14.1 Semantic Translation : Functional Form
\(\operatorname{Sentence}\)
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\(\xrightarrow[\operatorname{~~~~~~~~~~}]{\operatorname{Parse}}\)
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\(\operatorname{Graph}\)
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\(\xrightarrow[\operatorname{~~~~~~~~~~}]{\operatorname{Denotation}}\)
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\(\operatorname{Proposition}\)
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\(s_j\!\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(C_j\!\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(q_j\!\)
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\(\operatorname{Conc}^0\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\operatorname{Node}^0\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\underline{1}\)
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\(\operatorname{Conc}^k_j s_j\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\operatorname{Node}^k_j C_j\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\operatorname{Conj}^k_j q_j\)
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\(\operatorname{Surc}^0\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\operatorname{Lobe}^0\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\underline{0}\)
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\(\operatorname{Surc}^k_j s_j\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\operatorname{Lobe}^k_j C_j\)
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\(\xrightarrow{\operatorname{~~~~~~~~~~}}\)
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\(\operatorname{Surj}^k_j q_j\)
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Table 14.2 Semantic Translation : Equational Form
\(\downharpoonleft \operatorname{Sentence} \downharpoonright\)
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\(\stackrel{\operatorname{Parse}}{=}\)
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\(\downharpoonleft \operatorname{Graph} \downharpoonright\)
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\(\stackrel{\operatorname{Denotation}}{=}\)
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\(\operatorname{Proposition}\)
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\(\downharpoonleft s_j \downharpoonright\)
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\(=\!\)
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\(\downharpoonleft C_j \downharpoonright\)
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\(=\!\)
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\(q_j\!\)
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\(\downharpoonleft \operatorname{Conc}^0 \downharpoonright\)
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\(=\!\)
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\(\downharpoonleft \operatorname{Node}^0 \downharpoonright\)
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\(=\!\)
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\(\underline{1}\)
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\(\downharpoonleft \operatorname{Conc}^k_j s_j \downharpoonright\)
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\(=\!\)
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\(\downharpoonleft \operatorname{Node}^k_j C_j \downharpoonright\)
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\(=\!\)
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\(\operatorname{Conj}^k_j q_j\)
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\(\downharpoonleft \operatorname{Surc}^0 \downharpoonright\)
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\(=\!\)
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\(\downharpoonleft \operatorname{Lobe}^0 \downharpoonright\)
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\(=\!\)
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\(\underline{0}\)
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\(\downharpoonleft \operatorname{Surc}^k_j s_j \downharpoonright\)
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\(=\!\)
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\(\downharpoonleft \operatorname{Lobe}^k_j C_j \downharpoonright\)
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\(=\!\)
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\(\operatorname{Surj}^k_j q_j\)
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Table Stuff
Table 15. Boolean Functions on Zero Variables
\(F\!\)
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\(F\!\)
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\(F()\!\)
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\(F\!\)
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\(\underline{0}\)
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\(F_0^{(0)}\!\)
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\(\underline{0}\)
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\((~)\)
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\(\underline{1}\)
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\(F_1^{(0)}\!\)
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\(\underline{1}\)
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\(((~))\)
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Table 16. Boolean Functions on One Variable
\(F\!\)
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\(F\!\)
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\(F(x)\!\)
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\(F\!\)
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\(F(\underline{1})\)
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\(F(\underline{0})\)
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\(F_0^{(1)}\!\)
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\(F_{00}^{(1)}\!\)
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\(\underline{0}\)
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\(\underline{0}\)
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\((~)\)
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\(F_1^{(1)}\!\)
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\(F_{01}^{(1)}\!\)
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\(\underline{0}\)
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\(\underline{1}\)
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\((x)\!\)
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\(F_2^{(1)}\!\)
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\(F_{10}^{(1)}\!\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(x\!\)
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\(F_3^{(1)}\!\)
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\(F_{11}^{(1)}\!\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(((~))\)
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Table 17. Boolean Functions on Two Variables
\(F\!\)
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\(F\!\)
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\(F(x, y)\!\)
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\(F\!\)
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\(F(\underline{1}, \underline{1})\)
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\(F(\underline{1}, \underline{0})\)
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\(F(\underline{0}, \underline{1})\)
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\(F(\underline{0}, \underline{0})\)
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\(F_{0}^{(2)}\!\)
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\(F_{0000}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\((~)\)
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\(F_{1}^{(2)}\!\)
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\(F_{0001}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\((x)(y)\!\)
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\(F_{2}^{(2)}\!\)
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\(F_{0010}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\((x) y\!\)
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\(F_{3}^{(2)}\!\)
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\(F_{0011}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\((x)\!\)
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\(F_{4}^{(2)}\!\)
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\(F_{0100}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(x (y)\!\)
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\(F_{5}^{(2)}\!\)
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\(F_{0101}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\((y)\!\)
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\(F_{6}^{(2)}\!\)
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\(F_{0110}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\((x, y)\!\)
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\(F_{7}^{(2)}\!\)
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\(F_{0111}^{(2)}\!\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\((x y)\!\)
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\(F_{8}^{(2)}\!\)
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\(F_{1000}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(x y\!\)
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\(F_{9}^{(2)}\!\)
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\(F_{1001}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(((x, y))\!\)
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\(F_{10}^{(2)}\!\)
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\(F_{1010}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(y\!\)
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\(F_{11}^{(2)}\!\)
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\(F_{1011}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\((x (y))\!\)
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\(F_{12}^{(2)}\!\)
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\(F_{1100}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{0}\)
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\(x\!\)
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\(F_{13}^{(2)}\!\)
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\(F_{1101}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(\underline{1}\)
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\(((x)y)\!\)
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\(F_{14}^{(2)}\!\)
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\(F_{1110}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{0}\)
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\(((x)(y))\!\)
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\(F_{15}^{(2)}\!\)
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\(F_{1111}^{(2)}\!\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(\underline{1}\)
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\(((~))\)
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