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sav08:normal_forms_for_first-order_logic [2009/05/14 15:43] vkuncak |
sav08:normal_forms_for_first-order_logic [2009/05/14 15:59] vkuncak |
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| \end{array} | \end{array} | ||
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| \[ | \[ | ||
| \begin{array}{l@{}l} | \begin{array}{l@{}l} | ||
| - | & (\forall x_1. R(x_1,f_{y_1}(x_1)))\ \land \\ | + | & (\forall x. R(x,g(x)))\ \land \\ |
| - | & (\forall z.\ \neg R(x_2,y_2) \lor R(a,f(b,z)))\ \land \\ | + | & (\forall x.\forall y. \forall z.\ \neg R(x,y) \lor R(x,f(y,z)))\ \land \\ |
| - | & (\forall x_3.\ P(x_3) \lor P(f(x_3,a)))\ \land \\ | + | & (\forall x.\ P(x) \lor P(f(x,a)))\ \land \\ |
| - | & (\forall y_4.\ \neg R(f_4,y_4) \vee \neg P(y_4)) | + | & (\forall y.\ \neg R(c,y) \vee \neg P(y)) |
| \end{array} | \end{array} | ||
| \] | \] | ||
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| === Clauses for Example === | === Clauses for Example === | ||
| - | *$C_1=R(x_1,f_{y_1}(x_1))$ | + | *$C_1=R(x,g(x))$ |
| - | *$C_2=\neg R(x_2,y_2) \lor R(x_2,f(y_2,z)))$ | + | *$C_2=\neg R(x,y) \lor R(x,f(y,z)))$ |
| - | *$C_3=P(x_3) \lor P(f(x_3,a))$ | + | *$C_3=P(x) \lor P(f(x,a))$ |
| - | *$C_4=\neg R(f_4,y_4) \vee \neg P(y_4)$ | + | *$C_4=\neg R(c,x) \vee \neg P(x)$ |
| === Another Example: Irreflexive Dense Linear Orders === | === Another Example: Irreflexive Dense Linear Orders === | ||
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| \end{array} | \end{array} | ||
| \] | \] | ||
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