X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=helm%2FDEVEL%2Fmathml_editor%2Fdoc%2Fspec.tex;h=a9ccdc2637a59eefd9bc8c2f311e9073670eb86a;hb=4167cea65ca58897d1a3dbb81ff95de5074700cc;hp=7849651d98a32d3693d23b1ccb831ef2b6e02dc1;hpb=dbc6a4fb0236cfc7752c70e2e16f511b9e51b29c;p=helm.git diff --git a/helm/DEVEL/mathml_editor/doc/spec.tex b/helm/DEVEL/mathml_editor/doc/spec.tex index 7849651d9..a9ccdc263 100644 --- a/helm/DEVEL/mathml_editor/doc/spec.tex +++ b/helm/DEVEL/mathml_editor/doc/spec.tex @@ -852,10 +852,13 @@ cursor with \ONODE{}, append $\tadvance$ after the \ONODE{} node \newcommand{\TSEMUP}[2]{\mathcal{T}^\uparrow\llbracket#1\rrbracket#2} \newcommand{\TSEMDOWN}[2]{\mathcal{T}_\downarrow\llbracket#1\rrbracket#2} \newcommand{\NSEM}[2]{\mathcal{N}\llbracket#1\rrbracket#2} -\newcommand{\PSEM}[2]{\mathcal{P}\llbracket#1\rrbracket#2} -\newcommand{\PPSEM}[2]{\mathcal{P'}\llbracket#1\rrbracket(#2)} +\newcommand{\PSEM}[1]{\mathcal{P}\llbracket#1\rrbracket} +\newcommand{\LSEM}[2]{\mathcal{L}\llbracket#1\rrbracket#2} +\newcommand{\RSEM}[2]{\mathcal{R}\llbracket#1\rrbracket#2} +\newcommand{\FSEM}[2]{\mathcal{F}\llbracket#1\rrbracket(#2)} \newcommand{\PARENT}[1]{\mathit{parent}(#1)} \newcommand{\CHILDREN}[1]{\mathit{children}(#1)} +\newcommand{\CHILD}[1]{\mathit{child}(#1)} \newcommand{\ANCESTORS}[1]{\mathit{ancestors}(#1)} \newcommand{\DESCENDANTS}[1]{\mathit{descendants}(#1)} \newcommand{\HASATTRIBUTE}[2]{\mathit{hasAttribute}(#1,#2)} @@ -865,45 +868,106 @@ cursor with \ONODE{}, append $\tadvance$ after the \ONODE{} node \newcommand{\NAME}[1]{\mathit{name}(#1)} \newcommand{\PREV}[1]{\mathit{prev}(#1)} \newcommand{\NEXT}[1]{\mathit{next}(#1)} +\newcommand{\PREDICATE}[1]{\mathit{predicate}(#1)} +\newcommand{\IFV}[3]{\begin{array}[t]{@{}l}\mathbf{if}~#1~\mathbf{then}\\\quad#2\\\mathbf{else}\\\quad#3\end{array}} +\newcommand{\IFH}[3]{\mathbf{if}~#1~\mathbf{then}~#2~\mathbf{else}~#3} +\newcommand{\TRUE}{\mathbf{true}} +\newcommand{\FALSE}{\mathbf{false}} +\newcommand{\FUN}[2]{\lambda#1.#2} +\newcommand{\LET}[3]{\mathbf{let}~#1=#2~\mathbf{in}~#3} +\newcommand{\REC}[2]{\mathbf{rec}~#1=#2} +\newcommand{\APPLY}[2]{(#1\;#2)} +\newcommand{\APPLYX}[3]{(#1\;#2\;#3)} +\newcommand{\AND}{\wedge} +\newcommand{\OR}{\vee} +\newcommand{\AAND}{\,\vec{\AND}\,} +\newcommand{\AOR}{\,\vec{\OR}\,} +\newcommand{\MATCH}[4]{\begin{array}[t]{@{}c@{~\to~}l@{}l@{}}\multicolumn{2}{@{}l@{}}{\mathbf{match}~#1~\mathbf{with}}\\\phantom{|}\quad\{#2\}\\|\quad\emptyset\end{array}} \[ \begin{array}{rcl} - \CSEM{.}{x} &=& \{x\}\\ + \CSEM{q}{x} &=& \{x_1\mid x_1\in\{x\} \wedge \QSEM{q}{x_1}\}\\ \CSEM{..}{x} &=& \PARENT{x}\\ \CSEM{/}{x} &=& \CHILDREN{x}\\ - \CSEM{q}{x} &=& \{x_1\mid x_1\in\{x\} \wedge \QSEM{q}{x_1}\}\\ + \CSEM{c_1\;c_2}{x} &=& \CSEM{c_2}{\CSEM{c_1}{x}}\\ \CSEM{(c)}{x} &=& \CSEM{c}{x}\\ \CSEM{\{c:\alpha\}}{x} &=& \alpha(x,\CSEM{c}{x})\\ \CSEM{c_1\&c_2}{x} &=& \CSEM{c_1}{x} \cap \CSEM{c_2}{x}\\ \CSEM{c_1\mid c_2}{x} &=& \CSEM{c_1}{x} \cup \CSEM{c_2}{x}\\ \CSEM{c+}{x} &=& \CSEM{c}{x} \cup \CSEM{c+}{\CSEM{c}{x}}\\ - \CSEM{c?}{x} &=& \CSEM{.\mid c}{x}\\ - \CSEM{c*}{x} &=& \CSEM{{c+}?}{x}\\ - \CSEM{c_1\;c_2}{x} &=& \CSEM{c_2}{\CSEM{c_1}{x}}\\ - \CSEM{!c}{x} &=& \{x_1\mid x_1\in\{x\} \wedge \CSEM{c}{x}=\emptyset\}\\[3ex] - \QSEM{\langle*\rangle}{x} &=& \ISELEMENT{x}\\ - \QSEM{\langle!*\rangle}{x} &=& \neg\QSEM{\langle*\rangle}{x}\\ - \QSEM{\langle n_1\mid\cdots\mid n_k\rangle}{x} &=& \exists i\in\{1,\dots,k\}:\NAME{x}=n_i\\ - \QSEM{\langle !n_1\mid\cdots\mid n_k\rangle}{x} &=& \neg\QSEM{\langle n_1\mid\cdots\mid n_k\rangle}{x}\\ - \QSEM{q[@n]}{x} &=& \QSEM{q}{x} \wedge \HASATTRIBUTE{x}{n}\\ - \QSEM{q[!@n]}{x} &=& \QSEM{q}{x} \wedge \HASNOATTRIBUTE{x}{n}\\ - \QSEM{q[@n=v]}{x} &=& \QSEM{q}{x} \wedge \ATTRIBUTE{x}{n}= v\\ - \QSEM{q[!@n=v]}{x} &=& \QSEM{q}{x} \wedge \ATTRIBUTE{x}{n}\ne v\\ - \QSEM{q[p]}{x} &=& \QSEM{q}{x} \wedge \PSEM{p}{x}\\ - \QSEM{q[!p]}{x} &=& \QSEM{q}{x} \wedge \neg\PSEM{p}{x}\\[3ex] - \PSEM{p_1\#p_2}{x} &=& \PPSEM{p_1}{*,\PREV{x}}\wedge\PPSEM{p_2}{\NEXT{x},*}\\ - \PSEM{\cent p_1\#p_2}{x} &=& \PPSEM{p_1}{\cent,\PREV{x}}\wedge\PPSEM{p_2}{\NEXT{x},*}\\ - \PSEM{p_1\#p_2\$}{x} &=& \PPSEM{p_1}{*,\PREV{x}}\wedge\PPSEM{p_2}{\NEXT{x},\$}\\ - \PSEM{\cent p_1\#p_2\$}{x} &=& \PPSEM{p_1}{\cent,\PREV{x}}\wedge\PPSEM{p_2}{\NEXT{x},\$}\\[3ex] - \PPSEM{}{*,\alpha} &=& \mathit{true}\\ - \PPSEM{}{\cent,\alpha} &=& \alpha=\emptyset\\ - \PPSEM{p\;c}{\alpha,\emptyset} &=& \mathit{false}\\ - \PPSEM{p\;c}{\alpha,\{x\}} &=& \CSEM{c}{x}\ne\emptyset\wedge\PPSEM{p}{\alpha,\PREV{x}}\\ - \PPSEM{}{\alpha,*} &=& \mathit{true}\\ - \PPSEM{}{\alpha,\$} &=& \alpha=\emptyset\\ - \PPSEM{c\;p}{\emptyset,\alpha} &=& \mathit{false}\\ - \PPSEM{c\;p}{\{x\},\alpha} &=& \CSEM{c}{x}\ne\emptyset\wedge\PPSEM{p}{\NEXT{x},\alpha}\\ + \CSEM{c?}{x} &=& \{x\}\cup\CSEM{c}{x}\\ + \CSEM{c*}{x} &=& \CSEM{{c+}?}{x}\\[3ex] + \QSEM{c}{x} &=& \CSEM{c}{x}\ne\emptyset\\ + \QSEM{!c}{x} &=& \CSEM{c}{x}=\emptyset\\ + \QSEM{\langle*\rangle}{x} &=& \TRUE\\ + \QSEM{\langle n\rangle}{x} &=& \NAME{x}=n\\ + \QSEM{@n}{x} &=& \HASATTRIBUTE{x}{n}\\ + \QSEM{@n=v}{x} &=& \ATTRIBUTE{x}{n}=v\\ + \QSEM{[p_1\#p_2]}{x} &=& \LSEM{p_1}{\PREV{x}}\wedge\RSEM{p_2}{\NEXT{x}}\\[3ex] + \LSEM{}{\alpha} &=& \TRUE\\ + \LSEM{\cent}{\alpha} &=& \alpha=\emptyset\\ + \LSEM{p\;q}{\emptyset} &=& \FALSE\\ + \LSEM{p\;q}{\{x\}} &=& \QSEM{q}{x}\wedge\LSEM{p}{\PREV{x}}\\[3ex] + \RSEM{}{\alpha} &=& \TRUE\\ + \RSEM{\$}{\alpha} &=& \alpha=\emptyset\\ + \RSEM{q\;p}{\emptyset} &=& \FALSE\\ + \RSEM{q\;p}{\{x\}} &=& \QSEM{q}{x}\wedge\RSEM{p}{\NEXT{x}}\\[3ex] + \PREDICATE{q} &=& \TRUE\\ + \PREDICATE{..} &=& \FALSE\\ + \PREDICATE{/} &=& \FALSE\\ + \PREDICATE{c_1\;c_2} &=& \PREDICATE{c_1}\wedge\PREDICATE{c_2}\\ + \PREDICATE{(c)} &=& \PREDICATE{c}\\ + \PREDICATE{c_1\&c_2} &=& \PREDICATE{c_1}\wedge\PREDICATE{c_2}\\ + \PREDICATE{c_1\mid c_2} &=& \PREDICATE{c_1}\wedge\PREDICATE{c_2}\\ + \PREDICATE{c+} &=& \PREDICATE{c}\\ + \PREDICATE{c?} &=& \PREDICATE{c}\\ + \PREDICATE{c*} &=& \PREDICATE{c} \end{array} \] +\[ +\begin{array}{rcl} + \PSEM{q} &=& \FUN{x}{\APPLY{\QSEM{q}{}}{x}} \\ + \PSEM{..} &=& \FUN{x}{\neg\APPLY{\mathit{null}}{\PARENT{x}}}\\ + \PSEM{/} &=& \FUN{x}{\neg\APPLY{\mathit{null}}{\CHILD{x}}}\\ + \PSEM{(c)} &=& \PSEM{c}\\ + \PSEM{\{c:\alpha\}} &=& \FUN{x}{\APPLY{\PSEM{c}}{x}\AAND\APPLY{\alpha}{x}}\\ + \PSEM{c_1\;c_2} &=& \IFV{\PREDICATE{c_1}}{\FUN{x}{(\PSEM{c_1}\;x)\wedge(\PSEM{c_2}\;x)}}{\FSEM{c_1}{\PSEM{c_2},\FUN{\_}{\FALSE}}}\\ + \PSEM{c_1\&c_2} &=& \IFV{\PREDICATE{c_1}\wedge\PREDICATE{c_2}}{\FUN{x}{(\PSEM{c_1}\;x)\wedge(\PSEM{c_2}\;x)}}{\FSEM{c_1\&c_2}{\FUN{\_}{\TRUE},\FUN{\_}{\FALSE}}}\\ + \PSEM{c_1\mid c_2} &=& \FUN{x}{(\PSEM{c_1}\;x)\vee(\PSEM{c_2}\;x)}\\ + \PSEM{c+} &=& \PSEM{c}\\ + \PSEM{c?} &=& \FUN{\_}{\TRUE}\\ + \PSEM{c*} &=& \FUN{\_}{\TRUE}\\[3ex] + \FSEM{q}{t,f} &=& \FUN{x}{(\APPLY{\PSEM{q}}{x}\AAND\APPLY{t}{x})\AOR\APPLY{f}{x}}\\ + \FSEM{..}{t,f} &=& \FUN{x}{\MATCH{\PARENT{x}}{y}{\APPLY{t}{y}}{\APPLY{f}{x}}}\\ +% \FSEM{/}{t,f} &=& \FUN{x}{(\vee_{y\in\CHILDREN{x}} \APPLY{t}{y})\AOR\APPLY{f}{x}}\\ + \FSEM{/}{t,f} &=& \FUN{x}{\APPLYX{\mathit{exists}}{t}{\CHILD{x}}\AOR\APPLY{f}{x}}\\ + \FSEM{(c)}{t,f} &=& \FSEM{c}{t,f}\\ + \FSEM{\{c:\alpha\}}{t,f} &=& \FSEM{c}{\FUN{x}{\PSEM{c}\AAND\APPLY{\alpha}{x}\AAND\APPLY{t}{x},f}}\\ + \FSEM{c_1\;c_2}{t,f} &=& \FUN{x}{\APPLY{\FSEM{c_1}{\FSEM{c_2}{t,\FUN{\_}{\APPLY{f}{x}}},f}}{x}}\\ + \FSEM{c_1\&c_2}{t,f} &=& \FUN{x}{\APPLY{\FSEM{c_1}{\FUN{y}{\APPLY{\FSEM{c_2}{\FUN{z}{(y=z)\AAND\APPLY{t}{z}},\FUN{\_}{\APPLY{f}{x}}}}{x}},f}}{x}}\\ + \FSEM{c_1\mid c_2}{t,f} &=& \FSEM{c_1}{t,\FSEM{c_2}{t,f}}\\ + \FSEM{c+}{t,f} &=& \FSEM{c}{\FSEM{c+}{t,t},f}\\ + \FSEM{c?}{t,f} &=& \FSEM{c}{t,t}\\ + \FSEM{c*}{t,f} &=& \FSEM{{c+}?}{t,f}\\[3ex] + \QSEM{c}{} &=& \PSEM{c}\\ + \QSEM{!c}{} &=& \FUN{x}{\neg\APPLY{\PSEM{c}}{x}}\\ + \QSEM{\langle*\rangle}{} &=& \FUN{\_}{\TRUE}\\ + \QSEM{\langle n\rangle}{} &=& \FUN{x}{\NAME{x}=n}\\ + \QSEM{@n}{} &=& \FUN{x}{\HASATTRIBUTE{x}{n}}\\ + \QSEM{@n=v}{} &=& \FUN{x}{\ATTRIBUTE{x}{n}=v}\\ + \QSEM{[p_1\#p_2]}{} &=& \FUN{x}{\APPLY{\LSEM{p_1}{}}{\PREV{x}}\wedge\APPLY{\RSEM{p_2}{}}{\NEXT{x}}}\\[3ex] + \LSEM{}{} &=& \FUN{\_}{\TRUE}\\ + \LSEM{\cent}{} &=& \mathit{null}\\ + \LSEM{p\;q}{} &=& \FUN{x}{\MATCH{x}{y}{\QSEM{q}{y}\AAND\APPLY{\LSEM{p}}{\PREV{y}}}{\FALSE}}\\ + \RSEM{}{} &=& \FUN{\_}{\TRUE}\\ + \RSEM{\$}{} &=& \mathit{null}\\ + \RSEM{p\;q}{} &=& \FUN{x}{\MATCH{x}{y}{\QSEM{q}{y}\AAND\APPLY{\RSEM{p}}{\NEXT{y}}}{\FALSE}}\\ + \mathit{null} &=& \FUN{x}{\MATCH{x}{\_}{\FALSE}{\TRUE}}\\ + \mathit{exists} &=& \FUN{t}{\REC{a}{\FUN{x}{\MATCH{x}{y}{\APPLY{t}{y}\AOR\APPLY{a}{\NEXT{x}}}{\FALSE}}}} +\end{array} +\] + + + \end{document}