Final preparations (or afterwards?).

[algebraic-prog-equiv.git] / free-withTests-ndet.tex

\subsection{áËÓÉÏÍÙ ÁÌÇÅÂÒÙ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ}\label{sec:KAT-axioms}
\tNDNo{áÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ}\T ÜÔÏ \tD{ÁÌÇÅÂÒÁ ëÌÉÎÉ}{def:KA} ÓÏ
×ÓÔÒÏÅÎÎÏÊ ÂÕÌÅ×ÏÊ ÐÏÄÁÌÇÅÂÒÏÊ. æÏÒÍÁÌØÎÏ:
%
\begin{definition}[\cite{KAT-commutativity,KAT-complete-decidable,KA-modular-elimination}]
  \label{def:KAT}
  \tING{áÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ}\T ÜÔÏ ÓÔÒÕËÔÕÒÁ $\ka T = (K, B; +, \cdot, ^*,
  \nP, 0, 1)$,
  ÔÁËÁÑ, ÞÔÏ $\nP$\T ÕÎÁÒÎÙÊ ÏÐÅÒÁÔÏÒ, ÏÐÒÅÄÅÌ£ÎÎÙÊ ÔÏÌØËÏ ÎÁ $B$, É
  \begin{itemize}
  \item $\Stru{B; +, \cdot, 0, 1}$ Ñ×ÌÑÅÔÓÑ ÐÏÄÁÌÇÅÂÒÏÊ 
    $\Stru{K; +, \cdot, 0, 1}$,
  \item $\ka K = (K; +, \cdot, ^*, 0, 1)$ Ñ×ÌÑÅÔÓÑ \tD{ÁÌÇÅÂÒÏÊ
      ëÌÉÎÉ}{def:KA},
  \item Á $\ba B = (B; +, \cdot, \nP, 0, 1)$\T \tD{ÂÕÌÅ×ÏÊ ÁÌÇÅÂÒÏÊ}.
  \end{itemize}

  üÌÅÍÅÎÔÙ $B$ ÂÕÄÅÍ ÎÁÚÙ×ÁÔØ \tING{ÔÅÓÔÁÍÉ}; ÉÎÄÕÃÉÒÏ×ÁÎÎÕÀ ÂÕÌÅ×Õ
  ÁÌÇÅÂÒÕ $\ba B$ ÂÕÄÅÍ ÏÂÏÚÎÁÞÁÔØ
  $\baTests(\ka T)$.

  \KAT ÏÂÏÚÎÁÞÁÅÔ \tING{ËÁÔÅÇÏÒÉÀ ÁÌÇÅÂÒ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ É ÉÈ
    ÇÏÍÏÍÏÒÆÉÚÍÏ×},
  \KATc\T ÐÏÄËÁÔÅÇÏÒÉÀ \tING{*\dÎÅÐÒÅÒÙ×ÎÙÈ ÁÌÇÅÂÒ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ É ÉÈ
    ÇÏÍÏÍÏÒÆÉÚÍÏ×} (ïÐÒÅÄÅÌÅÎÉÅ~\ref{def:KA-cont} *\dÎÅÐÒÅÒÙ×ÎÏÓÔÉ
    ÐÒÉÍÅÎÉÍÏ Ë ÉÎÄÕÃÉÒÏ×ÁÎÎÏÊ ÁÌÇÅÂÒÏÊ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ $\ka T$
    ÁÌÇÅÂÒÅ ëÌÉÎÉ $\ka K$.) 
\end{definition}
(ðÒÉ ÞÔÅÎÉÉ ×ÙÒÁÖÅÎÉÊ 
$\nP$ ÉÍÅÅÔ ÓÁÍÙÊ ÂÏÌØÛÏÊ ÐÒÉÏÒÉÔÅÔ ÓÒÅÄÉ ÏÐÅÒÁÃÉÊ, × ÏÓÔÁÌØÎÏÍ
ÐÒÉÏÒÉÔÅÔ ÔÁËÏÊ ÖÅ, ËÁË ÄÌÑ ÁÌÇÅÂÒ ëÌÉÎÉ:
$\nP, ^*, \cdot, +$. 
úÎÁË <<\KAT>> ÍÙ ÉÎÏÇÄÁ ÂÕÄÅÍ
ÐÉÓÁÔØ ×ÍÅÓÔÏ ÓÌÏ× <<ÁÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ>>.)

ëÁË É ÁÌÇÅÂÒÙ ëÌÉÎÉ, 
ÍÎÏÇÉÅ ÅÓÔÅÓÔ×ÅÎÎÏ ×ÏÚÎÉËÁÀÝÉÅ ÁÌÇÅÂÒÙ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ *\dÎÅÐÒÅÒÙ×ÎÙ.

\begin{application}
\tNDNo{áÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ} \cite{KAT-commutativity}\T ÜÔÏ ÒÁÓÛÉÒÅÎÉÅ ÐÏÎÑÔÉÑ
\tDJust{ÁÌÇÅÂÒÙ ëÌÉÎÉ}, ÍÏÔÉ×ÉÒÏ×ÁÎÎÏÅ ÔÅÍ, ÞÔÏ ÐÒÏÇÒÁÍÍÙ ÓÏÓÔÏÑÔ ÉÚ
ÂÁÚÏ×ÙÈ ÜÌÅÍÅÎÔÏ× Ä×ÕÈ ÓÏÒÔÏ×\T ÏÐÅÒÁÔÏÒÏ×, ÐÒÏÉÚ×ÏÄÑÝÉÈ ÐÒÅÏÂÒÁÚÏ×ÁÎÉÑ,
É ÔÅÓÔÏ×, ÐÒÏ×ÅÒÑÀÝÉÈ, ×ÙÐÏÌÎÅÎÙ ÌÉ ËÁËÉÅ-ÔÏ ÕÓÌÏ×ÉÑ. ðÒÉ ÐÏÍÏÝÉ
ÁÌÇÅÂÒ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ ÍÙ ÍÏÖÅÍ ÌÕÞÛÅ ÏÔÒÁÚÉÔØ ÜÔÏ ÒÁÚÌÉÞÉÅ × ÎÁÛÉÈ
ÁÂÓÔÒÁËÔÎÙÈ ÍÏÄÅÌÑÈ.
\end{application}

\subsection{îÅËÏÔÏÒÙÅ ×ÁÖÎÙÅ ÁÌÇÅÂÒÙ ëÌÉÎÉ}\label{sec:KAT-models}
\todo{[ÒÁÚÏÂÒÁÔØÓÑ Ó ÕÐÏÔÒÅÂÌÅÎÉÅÍ ÓÌÏ× ÁÌÇÅÂÒÁ/ÍÏÄÅÌØ ÔÕÔ]}

úÄÅÓØ ÐÒÅÄÓÔÁ×ÌÅÎÙ ×ÁÖÎÙÅ ÄÌÑ ÎÁÓ ÍÏÄÅÌÉ \KAT. ïÎÉ ÒÏÄÓÔ×ÅÎÎÙ ÍÏÄÅÌÑÍ \KA,
ÏÐÉÓÁÎÎÙÍ × òÁÚÄÅÌÅ~\ref{sec:KA-models}. ÷ ÏÔÌÉÞÉÅ ÏÔ ÁÌÇÅÂÒ ëÌÉÎÉ, 
ÆÏÒÍÁÌØÎÏÑÚÙËÏ×ÁÑ ÍÏÄÅÌØ ÄÌÑ ËÏÔÏÒÙÈ (òÁÚÄÅÌ~\ref{sec:KA-langmodels})
×ÏÓÐÒÉÎÉÍÁÌÁÓØ ÏÞÅÎØ ÅÓÔÅÓÔ×ÅÎÎÏ
××ÉÄÕ Ó×ÏÅÊ ÎÅÐÏÓÒÅÄÓÔ×ÅÎÎÏÊ Ó×ÑÚÉ Ó ÐÒÉ×ÙÞÎÏÊ ôÅÏÒÉÅÊ ÒÅÇÕÌÑÒÎÙÈ
ÆÏÒÍÁÌØÎÙÈ ÑÚÙËÏ× É ËÏÎÅÞÎÙÈ Á×ÔÏÍÁÔÏ×, ÁÌÇÅÂÒÙ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ ÎÅ
ÏÂÌÁÄÁÀÔ ÓÔÏÌØ ÖÅ ÅÓÔÅÓÔ×ÅÎÎÏ ×ÏÚÎÉËÁÀÝÅÊ ÍÏÄÅÌØÀ ÎÁ ÆÏÒÍÁÌØÎÙÈ
ÑÚÙËÁÈ. úÁÔÏ ÒÅÌÑÃÉÏÎÎÙÅ É ÔÒÁÓÓÏ×ÙÅ ÍÏÄÅÌÉ \KAT\T ÚÎÁËÏÍÙÅ ÐÏÄÈÏÄÙ Ë
ÉÚÕÞÅÎÉÀ ÓÅÍÁÎÔÉË ÐÒÏÇÒÁÍÍ, É ÏÎÉ ×Ï ÍÎÏÇÏÍ É ÐÏÂÕÄÉÌÉ ××ÅÄÅÎÉÅ ÔÁËÏÇÏ
ÎÏ×ÏÇÏ ÏÂßÅËÔÁ ÉÚÕÞÅÎÉÑ ËÁË ÁÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ. ó ÎÉÈ ÍÙ É ÎÁÞΣÍ.

\subsubsection{òÅÌÑÃÉÏÎÎÙÅ ÍÏÄÅÌÉ}
\label{sec:KAT-relmodels}

áÎÁÌÏÇ õÔ×.~\ref{prop:rels-KA} É~\ref{prop:rels-cont}:
\begin{proposition}\cite{KA-proof-theory}\label{prop:rels-KAT}
  ðÕÓÔØ $K = \Rels(U)$, $B = \{ S \in K \mid S \subseteq \id_U \}$;
  ÏÐÒÅÄÅÌÉÍ ÄÌÑ $\bt S \in B$:
  $$
  \n{\bt S} \eqdef \id_U \setminus \bt S.
  $$
  ôÏÇÄÁ ÓÔÒÕËÔÕÒÁ~$(K, B; \cup, \circ, ^*, \nP, \emptyset, \id_U )$\T
  *\dÎÅÐÒÅÒÙ×ÎÁÑ ÁÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ.
\end{proposition}

\begin{definition}\label{def:relational-KA}
  áÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ~$\ka T$ \tING{ÒÅÌÑÃÉÏÎÎÁÑ}, ÅÓÌÉ ÏÎÁ Ñ×ÌÑÅÔÓÑ
  ÐÏÄÁÌÇÅÂÒÏÊ ÁÌÇÅÂÒÙ ÉÚ õÔ×.~\ref{prop:rels-KAT}
  ÄÌÑ ÎÅËÏÔÏÒÏÊ \tING{ÂÁÚÙ}~$U$.

  \RKAT ÏÂÏÚÎÁÞÁÅÔ \tING{ËÁÔÅÇÏÒÉÀ ÒÅÌÑÃÉÏÎÎÙÈ ÁÌÇÅÂÒ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ É ÉÈ ÇÏÍÏÍÏÒÆÉÚÍÏ×}.
\end{definition}

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\subsubsection{ôÒÁÓÓÏ×ÙÅ ÍÏÄÅÌÉ}\label{sec:KAT-tracemodels}

áÎÁÌÏÇ õÔ×.~\ref{prop:all-traces-KA}:
\begin{proposition}\label{prop:all-traces-KAT}
  ðÕÓÔØ $K = 2^{\Trs(\kf F)}$, $B = 2^{Q_{\kf F}}$ (\te ÍÎÏÖÅÓÔ×Á
  ÔÒÁÓÓ ÄÌÉÎÙ~0);   ÏÐÒÅÄÅÌÉÍ ÄÌÑ $\bt S \in B$:
  $$
  \n{\bt S} \eqdef  Q_{\kf F} \setminus \bt S.
  $$
  óÔÒÕËÔÕÒÁ~$(K, B; \cup, \trCo, {}^*, \nP, \emptyset, Q_{\kf F} )$\T
  *\dÎÅÐÒÅÒÙ×ÎÁÑ ÁÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ.
\end{proposition}

\begin{remark}
  çÏÍÏÍÏÒÆÉÚÍ ÁÌÇÅÂÒ ëÌÉÎÉ $\Ext\colon 2^{\Trs(\kf F)} \to
  \Rels(Q_{\kf F})$, ÏÐÒÅÄÅÌ£ÎÎÙÊ~\eqref{eq:Ext}:
  \begin{equation}
    \tag{\ref{eq:Ext}}
    \eqExt
  \end{equation}
  Ñ×ÌÑÅÔÓÑ É ÇÏÍÏÍÏÒÆÉÚÍÏÍ \KAT.
\end{remark}

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\subsubsection{æÏÒÍÁÌØÎÏÑÚÙËÏ×ÙÅ ÍÏÄÅÌÉ: ÎÁÓÙÝÅÎÎÙÅ ÓÔÒÏËÉ (<<guarded strings>>)}
\label{sec:KAT-langmodels}
ðÕÓÔØ $\Sigma$ É $T$ ËÏÎÅÞÎÙÅ ÁÌÆÁ×ÉÔÙ (ÂÁÚÏ×ÙÈ ÏÐÅÒÁÔÏÒÏ× É ÔÅÓÔÏ×).

ïÂÏÚÎÁÞÉÍ $\Atoms_T$ ÍÎÏÖÅÓÔ×Ï \tND{ÁÔÏÍÏ×}{?} (ÍÉÎÉÍÁÌØÎÙÈ ÎÅÎÕÌÅ×ÙÈ
ÜÌÅÍÅÎÔÏ×) Ó×ÏÂÏÄÎÏÊ ÂÕÌÅ×ÏÊ ÁÌÇÅÂÒÙ, ÐÏÒÏÖÄ£ÎÎÏÊ $T$. (\Te ËÁÖÄÙÊ ÁÔÏÍ
ÓÏÏÔÎÏÓÉÔÓÑ Ó ÎÅËÏÔÏÒÏÊ \tNDNo{ÜÌÅÍÅÎÔÁÒÎÏÊ ËÏÎßÀÎËÃÉÅÊ}, × ËÏÔÏÒÏÊ ÕÞÁÓÔ×ÕÀÔ
×ÓÅ ÓÉÍ×ÏÌÙ ÉÚ $T$; ÉÌÉ, ÐÏ-ÄÒÕÇÏÍÕ, Ó ÎÅËÏÔÏÒÙÍ ÏÔÏÂÒÁÖÅÎÉÅÍ $c\colon
T \to \{ 0, 1 \}$, ÏÚÎÁÞÉ×ÁÀÝÉÍ ×ÓÅ ÐÒÏÐÏÚÉÃÉÏÎÁÌØÎÙÅ ÐÅÒÅÍÅÎÎÙÅ
ÉÚ~$T$.)

\begin{definition}[\cite{KAT-complete-decidable,AGS,KAT-elimination}]\label{def:gs}
  \tING{îÁÓÙÝÅÎÎÏÊ ÓÔÒÏËÏÊ} (\tING{guarded string}\footnote{ðÅÒÅ×ÏÄ ÎÁ
    ÒÕÓÓËÉÊ ÎÅ ÄÏÓÌÏ×ÎÙÊ.}) ÎÁÄ~$\Sigma, T$ 
  ÎÁÚÙ×ÁÅÔÓÑ
  ËÏÎÅÞÎÁÑ ÐÏÓÌÅÄÏ×ÁÔÅÌØÎÏÓÔØ~$\sigma$ ×ÉÄÁ:
  \begin{equation}
    \label{eq:gs}
    \alpha_0 a_0 \alpha_1 \dotsm \alpha_{n-1} a_{n-1} \alpha_n,
  \end{equation}
  ÇÄÅ $n \in \bbN \cup \{ 0 \}$ É
  \begin{align*}
    \alpha_i &\in \Atoms_T,
    &
    a_i &\in \Sigma.
  \end{align*}

  \tING{íÎÏÖÅÓÔ×Ï ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË ÎÁÄ~$\Sigma, T$} ÏÂÏÚÎÁÞÉÍ $\GS(\Sigma,T)$.

  äÌÑ ÎÁÓÙÝÅÎÎÏÊ ÓÔÒÏËÉ~$\sigma$ ×ÉÄÁ~\eqref{eq:gs}
%  \tING{ÄÌÉÎÁ~$\Len{\sigma}$} ÒÁ×ÎÁ $n$, 
  \begin{align*}
    \First(\sigma) &\eqdef \alpha_0,
    &
    \Last(\sigma) &\eqdef \alpha_n.
  \end{align*}

\end{definition}
ïÐÒÅÄÅÌÉÍ ÞÁÓÔÉÞÎÏ ÏÐÒÅÄÅÌ£ÎÎÕÀ ÏÐÅÒÁÃÉÀ \tING{ÓÏÅÄÉÎÅÎÉÑ ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË}
(ÄÌÑ~$\sigma$ É~$\tau$, Õ ËÏÔÏÒÙÈ $\Last(\sigma) = \First(\tau)$):
\begin{definition}\label{def:gs-concat}
  äÌÑ ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË $\sigma, \tau \in \GS(\Sigma,T)$:
  \begin{align*}
    \sigma &= \alpha_0 a_0 \alpha_1 \dotsm  \alpha_n,
    &
    \tau &= \beta_0 b_0 \beta_1 \dotsm \beta_m,
  \end{align*}
ÏÐÒÅÄÅÌÉÍ:
  \begin{equation}
    \label{eq:gs-concat}
    \sigma \gsCo \tau \eqdef 
    \begin{cases}
      \alpha_0 a_0 \alpha_1 \dotsm  \alpha_n b_0 \beta_1 \dotsm  \beta_m
      & \text{ÅÓÌÉ } \alpha_n = \beta_0,\\
      \text{ÎÅÏÐÒÅÄÅÌÅÎÏ}
      & \text{ÉÎÁÞÅ.}
    \end{cases}
  \end{equation}
\end{definition}

ïÐÉÛÅÍ ÁÌÇÅÂÒÕ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ ÍÎÏÖÅÓÔ× ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË.

\begin{definition}
  äÌÑ $A, B \subseteq \GS(\Sigma,T), \bt C \subseteq \Atoms_T$
  \begin{align}
    \n{\bt C} &\eqdef \Atoms_T \setminus \bt C\\
    \label{eq:gs-set-concat}
    A \gsCo B &\eqdef \{ \sigma \gsCo \tau \mid 
    \sigma \in A,\, \tau \in B,\, \sigma \gsCo \tau \text{ ÓÕÝÅÓÔ×ÕÅÔ}\};\\
    \label{eq:gs-set-star}
    A^*  &\eqdef \bigcup_{n \in \bbN \cup \{ 0 \}} A^n, 
  \end{align}
  ÇÄÅ
  \begin{align*}
    A^0 &\eqdef \Atoms_T
    &
    A^{n+1} &\eqdef A \gsCo A^n.
  \end{align*}
\end{definition}

\begin{proposition}\label{prop:all-gs-KA}
  óÔÒÕËÔÕÒÁ~$(2^{\GS(\Sigma,T)}, 2^{\Atoms_{T}}; 
  \cup, \gsCo, {}^*, \nP, \emptyset, \Atoms_{T} )$\T
  *\dÎÅÐÒÅÒÙ×ÎÁÑ \KAT.
\end{proposition}
\begin{remark}\label{rem:gs-as-trace}
  îÁÓÙÝÅÎÎÁÑ ÓÔÒÏËÁ ÎÁÄ~$\Sigma,T$ ÐÏ ÓÕÔÉ Ñ×ÌÑÅÔÓÑ
  ÔÒÁÓÓÏÊ × ÛËÁÌÅ ëÒÉÐËÅ~$\kf G = (\Atoms_T, m_{\kf G})$,
  ÇÄÅ
  \begin{align*}
    m_{\kf G}(a) &\eqdef \Atoms_T \times \Atoms_T
    &
    & \text{ÄÌÑ } a \in \Sigma,\\
    m_{\kf G}(p) &\eqdef \{ \alpha \in \Atoms_T \mid \alpha \implic p \}
    &
    & \text{ÄÌÑ } p \in T.
  \end{align*}
  (íÙ ÔÏÌØËÏ ÄÌÑ ÎÁÇÌÑÄÎÏÓÔÉ ÏÐÒÅÄÅÌÅÎÉÊ ÎÅ ÏÐÒÅÄÅÌÉÌÉ ÓÒÁÚÕ \tDJust{ÎÁÓÙÝÅÎÎÕÀ ÓÔÒÏËÕ}
  ËÁË ÔÒÁÓÓÕ.)

  \KAT, ÔÏÌØËÏ ÞÔÏ ÐÏÓÔÒÏÅÎÎÁÑ ÎÁ ÏÓÎÏ×Å ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË, ÓÏ×ÐÁÄÁÅÔ Ó
  \KAT, ÐÏÌÕÞÁÅÍÏÊ × ÒÅÚÕÌØÔÁÔÅ ÏÂÝÅÊ ËÏÎÓÔÒÕËÃÉÉ ÄÌÑ ÔÒÁÓÓ
  ÉÚ òÁÚÄÅÌÁ~\ref{sec:KAT-tracemodels}.

  \begin{example}
    \todo{[ÞÔÏ ÎÁÐÉÓÁÔØ?]}
  \end{example}
\end{remark}


%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\subsection{ðÒÏÇÒÁÍÍÙ: òÅÇÕÌÑÒÎÙÅ ×ÙÒÁÖÅÎÉÑ (Ó ÔÅÓÔÁÍÉ)}\label{sec:KAT-regexp}
\begin{definition}[\cite{?,KA-modular-elimination,AGS}]\label{def:KAT-regexp}
ðÕÓÔØ $\Sigma$ É $T$ ËÏÎÅÞÎÙÅ ÎÁÂÏÒÙ ÓÉÍ×ÏÌÏ×\DËÏÎÓÔÁÎÔ. 

\tING{âÕÌÅ×ÓËÉÍÉ ÔÅÒÍÁÍÉ} ÂÕÄÅÍ ÎÁÚÙ×ÁÔØ 
ÔÅÒÍÙ ÓÉÇÎÁÔÕÒÙ \tD{ÂÕÌÅ×ÏÊ ÁÌÇÅÂÒÙ}{def:bool-algebra} 
(\te $+, \cdot, \nP, 0, 1$),
ÄÏÐÏÌÎÅÎÎÏÊ ËÏÎÓÔÁÎÔÁÍÉ ÉÚ~$T$.

ôÅÒÍÙ ÓÉÇÎÁÔÕÒÙ \tD{\KAT{}}{def:KAT} (\te $+, \cdot, ^*, \nP, 0, 1$),
ÄÏÐÏÌÎÅÎÎÏÊ ËÏÎÓÔÁÎÔÁÍÉ ÉÚ~$\Sigma$ É $T$, 
× ËÏÔÏÒÙÈ ÏÔÒÉÃÁÎÉÅ $\nP$ ÒÁÚÒÅÛÁÅÔÓÑ ÐÒÉÍÅÎÑÔØ ÔÏÌØËÏ Ë
\tING{ÂÕÌÅ×ÓËÉÍ ÔÅÒÍÁÍ},
ÎÁÚÙ×ÁÀÔÓÑ \tING{ÒÅÇÕÌÑÒÎÙÍÉ ×ÙÒÁÖÅÎÉÑÍÉ ÎÁÄ~$\Sigma, T$}, ÉÌÉ
\tING{ÒÅÇÕÌÑÒÎÙÍÉ ×ÙÒÁÖÅÎÉÑÍÉ Ó ÔÅÓÔÁÍÉ}.
íÎÏÖÅÓÔ×Ï ÒÅÇÕÌÑÒÎÙÈ ×ÙÒÁÖÅÎÉÊ ÎÁÄ~$\Sigma, T$
ÏÂÏÚÎÁÞÁÅÔÓÑ $\RExp_{\Sigma,T}$.
üÌÅÍÅÎÔÙ~$\Sigma$ ÂÕÄÅÍ ÎÁÚÙ×ÁÔØ
\tING{ÂÁÚÏ×ÙÍÉ ÏÐÅÒÁÔÏÒÁÍÉ},
$T$\T \tING{ÂÁÚÏ×ÙÍÉ ÔÅÓÔÁÍÉ}.
\end{definition}
\begin{table}[hbtp]
  \centering
$$
\begin{array}{lll}
\text{ÂÕÌÅ×ÓËÉÅ ÔÅÒÍÙ} 
& \bt s, \bt t  \dotsc
& \bt s ::= \langle\text{{\small ÂÁÚÏ×ÙÅ ÔÅÓÔÙ}}\rangle
\ |\ 0\ |\ 1\ |\ \bt s + \bt t\ |\ \bt s \bt t\ |\ \n{\bt s} \\
\text{ÔÅÒÍÙ} 
& s, t  \dotsc
& s ::= \langle\text{{\small ÂÁÚÏ×ÙÅ ÏÐÅÒÁÔÏÒÙ}}\rangle
\ |\ \bt s\ | \ s+t\ |\ st\ |\ s^*
\end{array}
$$
  \caption{ôÅÒÍÙ × ÏÐÒÅÄÅÌÅÎÉÉ ÒÅÇÕÌÑÒÎÙÈ ×ÙÒÁÖÅÎÉÊ ÎÁÄ~$\Sigma, T$}
  \label{tab:KAT-regexp-bnf}
\end{table}

\begin{remark}
  $\RExp_{\Sigma,T}$ 
  ÔÏÖÅ ÍÏÖÎÏ ÒÁÓÓÍÁÔÒÉ×ÁÔØ ËÁË ÁÌÇÅÂÒÕ Ó ÓÉÇÎÁÔÕÒÏÊ
  ÁÌÇÅÂÒÙ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ. ïÐÅÒÁÃÉÉ
  <<ÄÅÊÓÔ×ÕÀÔ>> ÓÉÎÔÁËÓÉÞÅÓËÉ: ÐÒÉÍÅΣÎÎÙÅ Ë ÔÅÒÍÁÍ, ÏÎÉ ÓÏÓÔÁ×ÌÑÀÔ
  ÂÏÌÅÅ ÓÌÏÖÎÙÅ ÔÅÒÍÙ.

  éÍÅÅÔ ÓÍÙÓÌ ÇÏ×ÏÒÉÔØ Ï ÇÏÍÏÍÏÒÆÎÙÈ ÏÔÏÂÒÁÖÅÎÉÑÈ $\RExp_{\Sigma,T}$
  × ÄÒÕÇÉÅ ÁÌÇÅÂÒÙ ÜÔÏÊ ÓÉÇÎÁÔÕÒÙ.
\end{remark}

\begin{definition}
 
ïÔÏÂÒÁÖÅÎÉÅ $I\colon \Sigma \to \ka T, T \to \baTests(\ka K)$, 
ÇÄÅ $\ka T$\T ÁÌÇÅÂÒÁ ëÌÉÎÉ Ó ÔÅÓÔÁÍÉ, $\baTests(\ka K)$\T ÂÕÌÅ×Á
ÐÏÄÁÌÇÅÂÒÁ~$\ka T$,
ÂÕÄÅÍ ÎÁÚÙ×ÁÔØ \tING{ÉÎÔÅÒÐÒÅÔÁÃÉÅÊ ÂÁÚÏ×ÙÈ ÓÉÍ×ÏÌÏ× (ÏÐÅÒÁÔÏÒÏ× É ÔÅÓÔÏ×)}.

$I$ ÏÄÎÏÚÎÁÞÎÏ ÐÒÏÄÏÌÖÁÅÔÓÑ ÄÏ ÇÏÍÏÍÏÒÆÉÚÍÁ ÎÁ ×Ó£
$\RExp_{\Sigma,T}$, ÐÒÉ ÜÔÏÍ ÏÎ 
ÏÔÏÂÒÁÖÁÅÔ ÂÕÌÅ×ÓËÉÅ ÔÅÒÍÙ ÉÚ $\RExp_{\Sigma,T}$ ×~$\baTests(\ka T)$.
%ÔÁË ÐÏÌÕÞÁÀÝÅÅÓÑ ÏÔÏÂÒÁÖÅÎÉÅ ÍÙ ÔÏÖÅ ÂÕÄÅÍ ÏÂÏÚÎÁÞÁÔØ $I$
åÇÏ ÚÎÁÞÅÎÉÅ ÎÁ $s \in \RExp_{\Sigma,T}$ ÍÙ ÂÕÄÅÍ ÏÂÏÚÎÁÞÁÔØ 
ÐÒÏÓÔÏ $I(s)$ É ÎÁÚÙ×ÁÔØ ÅÇÏ ÚÎÁÞÅÎÉÅÍ
ÒÅÇÕÌÑÒÎÏÇÏ ×ÙÒÁÖÅÎÉÑ Ó ÔÅÓÔÁÍÉ~$s$ ÐÒÉ ÉÎÔÅÒÐÒÅÔÁÃÉÉ~$I$, ÉÌÉ,
\tING{ÉÎÔÅÒÐÒÅÔÁÃÉÅÊ ÒÅÇÕÌÑÒÎÏÇÏ ×ÙÒÁÖÅÎÉÑ Ó ÔÅÓÔÁÍÉ}~$s$.
\end{definition}

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\subsubsection{(ëÁÎÏÎÉÞÅÓËÉÅ) ÉÎÔÅÒÐÒÅÔÁÃÉÉ $\RExp_{\Sigma,T}$}
\label{sec:KAT-regexp-interp}
\todo{[ËÁÎÏÎÉÞ/ÓÔÁÎÄ -- ?]}

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\paragraph{ôÒÁÓÓÏ×ÁÑ.}

\begin{definition}[\cite{KAT-elimination}]\label{def:interp-traces}
  ðÕÓÔØ $\kf F$ ÛËÁÌÁ ëÒÉÐËÅ ÎÁÄ~$\Sigma, T$.
  \tING{ëÁÎÏÎÉÞÅÓËÁÑ ÉÎÔÅÒÐÒÅÔÁÃÉÑ $\trI{\place}_{\kf F}\colon \RExp_{\Sigma,T} \to
  2^{\Trs(\kf F)}$ ÒÅÇÕÌÑÒÎÙÈ ×ÙÒÁÖÅÎÉÊ ÎÁÄ~$\Sigma,T$}. ðÏÌÏÖÉÍ
\begin{align*}
  \trI{a}_{\kf F} &\eqdef \{ u a v \mid (u,v) \in m_{\kf F}(a) \} 
  \text{ ÄÌÑ } a \in \Sigma\\
  \trI{p}_{\kf F} &\eqdef m_{\kf F}(p) 
  \text{ ÄÌÑ } p \in T
\end{align*}
  É ÇÏÍÏÍÏÒÆÎÏ ÐÒÏÄÌÉÍ $\trI{\place}_{\kf F}$ ÎÁ ×Ó£~$\RExp_{\Sigma,T}$.
\end{definition}
\begin{definition}[\cite{KAT-elimination}]
  íÎÏÖÅÓÔ×Ï ÔÒÁÓÓ $A \subseteq \Trs(\kf F)$ ÎÁÚÙ×ÁÅÔÓÑ
  \tING{ÒÅÇÕÌÑÒÎÙÍ}, ÅÓÌÉ $A = \trI{ s }_{\kf F}$ ÄÌÑ ÎÅËÏÔÏÒÏÇÏ
  ÒÅÇÕÌÑÒÎÏÇÏ ×ÙÒÁÖÅÎÉÑ $s \in \RExp_{\Sigma,T}$, ÇÄÅ $\kf F$\T ÛËÁÌÁ
  ëÒÉÐËÅ ÎÁÄ~$\Sigma,T$.

  \tING{óÅÍÅÊÓÔ×Ï ÒÅÇÕÌÑÒÎÙÈ ÍÎÏÖÅÓÔ× ÔÒÁÓÓ ×~$\kf F$} ÏÂÏÚÎÁÞÁÅÔÓÑ
  $\trReg_{\kf F}$. 
  (<<$\trReg_{\kf F} \models \phi$>> ÚÎÁÞÉÔ 
  <<$\trReg_{\kf F}, \trI{\place} \models \phi$>>. \todo{[ÐÏÌÕÞÛÅ ÂÙ ÎÁÐÉÓÁÔØ]})
\end{definition}
äÌÑ ÒÅÇÕÌÑÒÎÙÈ ×ÙÒÁÖÅÎÉÊ É ÛËÁÌ ëÒÉÐËÅ ÎÁÄ Ä×ÕÍÑ ÁÌÆÁ×ÉÔÁÍÉ\T ÂÁÚÏ×ÙÈ
ÏÐÅÒÁÔÏÒÏ× É ÔÅÓÔÏ×:
\begin{definition}[\cite{KAT-elimination}]
  ëÌÁÓÓ ËÁÎÏÎÉÞÅÓËÉÈ ÔÒÁÓÓÏ×ÙÈ ÉÎÔÅÒÐÒÅÔÁÃÉÊ:
  $$
  \TRACE \eqdef \{ (\trReg_{\kf F}, \trI{\place}_{\kf F}) 
  \mid \kf F \text{\T ÛËÁÌÁ ëÒÉÐËÅ} \}
  $$
\end{definition}

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\paragraph{òÅÌÑÃÉÏÎÎÁÑ.}

\begin{definition}[\cite{KAT-elimination}]\label{def:interp-traces}
  ðÕÓÔØ $\kf F$ ÛËÁÌÁ ëÒÉÐËÅ ÎÁÄ~$\Sigma, T$.
  \tING{ëÁÎÏÎÉÞÅÓËÁÑ ÉÎÔÅÒÐÒÅÔÁÃÉÑ $\relI{\place}_{\kf F}\colon \RExp_{\Sigma,T} \to
  \Rels(\kf F)$ ÒÅÇÕÌÑÒÎÙÈ ×ÙÒÁÖÅÎÉÊ ÎÁÄ~$\Sigma,T$}. ðÏÌÏÖÉÍ
\begin{align*}
  \relI{a}_{\kf F} &\eqdef  m_{\kf F}(a) 
  \text{ ÄÌÑ } a \in \Sigma
  &
  \relI{p}_{\kf F} &\eqdef  \{ (u,u) \mid u \in m_{\kf F}(p) \}
  \text{ ÄÌÑ } p \in T
\end{align*}
  É ÇÏÍÏÍÏÒÆÎÏ ÐÒÏÄÌÉÍ $\relI{\place}_{\kf F}$ ÎÁ ×Ó£~$\RExp_{\Sigma,T}$.
\end{definition}
\begin{definition}[\cite{KAT-elimination}]
  ïÔÎÏÛÅÎÉÅ $S \in \Rels(\kf F)$ ÎÁÚÙ×ÁÅÔÓÑ
  \tING{ÒÅÇÕÌÑÒÎÙÍ}, ÅÓÌÉ $S = \relI{ s }_{\kf F}$ ÄÌÑ ÎÅËÏÔÏÒÏÇÏ
  ÒÅÇÕÌÑÒÎÏÇÏ ×ÙÒÁÖÅÎÉÑ $s \in \RExp_{\Sigma,T}$, ÇÄÅ $\kf F$\T ÛËÁÌÁ
  ëÒÉÐËÅ ÎÁÄ~$\Sigma,T$.

  \tING{óÅÍÅÊÓÔ×Ï ÒÅÇÕÌÑÒÎÙÈ ÏÔÎÏÛÅÎÉÊ ÎÁ~$\kf F$} ÏÂÏÚÎÁÞÁÅÔÓÑ
  $\relReg_{\kf F}$.
  (<<$\relReg_{\kf F} \models \phi$>> ÚÎÁÞÉÔ 
  <<$\relReg_{\kf F}, \relI{\place}_{\kf F} \models \phi$>>. 
  \todo{[ÐÏÌÕÞÛÅ ÂÙ ÎÁÐÉÓÁÔØ, ÓÒÁ×ÎÉÔØ Ó $\Reg_{\Sigma}$.]})
\end{definition}
\begin{remark}
  \begin{align*}
    \Ext(\trI{s})_{\kf F} &= \relI{s}_{\kf F}
    &
    &\text{ÄÌÑ ÌÀÂÏÇÏ $s \in \RExp_{\Sigma,T}$.}
  \end{align*}
\end{remark}
\todo{[\REL?]}

\paragraph{æÏÒÍÁÌØÎÏÑÚÙËÏ×ÁÑ.}
ðÒÅÄÌÏÖÅÎÎÁÑ ÆÏÒÍÁÌØÎÏÑÚÙËÏ×ÁÑ ÍÏÄÅÌØ \KAT (ÎÁ ÏÓÎÏ×Å ÎÁÓÙÝÅÎÎÙÈ
ÓÔÒÏË; ÓÍ.\ òÁÚÄÅÌ~\ref{sec:KAT-langmodels}) 
Ñ×ÌÑÅÔÓÑ ÞÁÓÔÎÙÍ ÓÌÕÞÁÅÍ ÔÒÁÓÓÏ×ÏÊ ÍÏÄÅÌÉ ÎÁ ÛËÁÌÅ ëÒÉÐËÅ~$\kf
G$ (úÁÍÅÞÁÎÉÅ~\ref{rem:gs-as-trace}), ÐÏÜÔÏÍÕ ÓÌÅÄÕÀÝÅÅ ÏÐÒÅÄÅÌÅÎÉÅ
ÄÁÎÏ ÎÁ ÏÓÎÏ×Å~$\trIP$:
\begin{definition}\label{def:KAT-interp-gs}
  \tING{ëÁÎÏÎÉÞÅÓËÁÑ ÉÎÔÅÒÐÒÅÔÁÃÉÑ $G_{\Sigma,T}\colon \RExp_{\Sigma,T} \to
  2^{\GS(\Sigma,T)}$ ÒÅÇÕÌÑÒÎÙÈ ×ÙÒÁÖÅÎÉÊ ÎÁÄ~$\Sigma$}:
  $$
  G_{\Sigma,T}(s) \eqdef \trI{s}_{\kf G} \text{ ÄÌÑ } s \in \RExp_{\Sigma,T}.
  $$
\end{definition}
ðÒÏÓÌÅÖÉ×ÁÑ ÓÄÅÌÁÎÎÙÅ ÏÐÒÅÄÅÌÅÎÉÑ ÐÏÌÕÞÁÅÍ, ÞÔÏ ÐÏ ÓÕÔÉ $G$ ÅÓÔØ
ÇÏÍÏÍÏÒÆÎÏÅ ÐÒÏÄÏÌÖÅÎÉÅ ÎÁ ×Ó£~$\RExp_{\Sigma,T}$
ÔÁËÉÈ ÚÁÄÁÎÉÊ ÚÎÁÞÅÎÉÊ ÎÁ ÂÁÚÏ×ÙÈ $\Sigma$ É $T$:
\begin{align*}
  G_{\Sigma,T}(a) &\eqdef \{ \alpha a \beta \mid \alpha, \beta \in \Atoms_T  \} 
  \text{ ÄÌÑ } a \in \Sigma\\
  G_{\Sigma,T}(p) &\eqdef \{ \alpha \in \Atoms_T \mid \alpha \implic p \}
  \text{ ÄÌÑ } p \in T.
\end{align*}
\begin{example}
  $\Sigma = \{ a, b \},\; T = \{ p, q \}$.
  ôÏÇÄÁ, ÎÁÐÒÉÍÅÒ,
  \begin{align*}
    \begin{aligned}[t]
      G(p) = \{ 
      &(p\n{q}),\\
      &(pq)
      \},
    \end{aligned}
    &&
    \begin{aligned}[t]
      G(\n{p}q a p b) = \{ 
      &(\n{p}q) a (p\n{q}) b (\n{p}\n{q}),\\
      &(\n{p}q) a (p\n{q}) b (\n{p}  {q}),\\
      &(\n{p}q) a (p\n{q}) b (  {p}\n{q}),\\
      &(\n{p}q) a (p\n{q}) b (  {p}  {q}),\\
                                %
      &(\n{p}q) a (p  {q}) b (\n{p}\n{q}),\\
      &(\n{p}q) a (p  {q}) b (\n{p}  {q}),\\
      &(\n{p}q) a (p  {q}) b (  {p}\n{q}),\\
      &(\n{p}q) a (p  {q}) b (  {p}  {q})
      \},
    \end{aligned}
    &&
    \begin{aligned}[t]
      G(p^*) = G(1) = \{ 
      & (\n{p}\n{q}),\\
      & (\n{p}  {q}),\\
      & (  {p}\n{q}),\\
      & (  {p}  {q})
      \}.
    \end{aligned}
  \end{align*}
  þÔÏ ËÁÓÁÅÔÓÑ ÐÏÓÌÅÄÎÅÇÏ ÒÁ×ÅÎÓÔ×Á, ÔÏ  ÜÔÏ ÎÅ ÓÐÅÃÉÆÉËÁ ËÏÎËÒÅÔÎÏÊ
  ÉÎÔÅÒÐÒÅÔÁÃÉÉ; ×ÏÏÂÝÅ: $\KAT \models \bt s^* = 1$, ÇÄÅ 
  $\bt s$ ÂÕÌÅ×ÓËÉÊ ÔÅÒÍ (ÉÎÔÅÒÐÒÅÔÉÒÕÅÔÓÑ ËÁË ÔÅÓÔ).
\end{example}

ðÏ ÁÎÁÌÏÇÉÉ Ó $\Reg_{\Sigma}$ ÄÌÑ \KA:
\begin{definition}
  íÎÏÖÅÓÔ×Ï ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË $A \subseteq \GS(\Sigma,T)$ ÎÁÚÙ×ÁÅÔÓÑ
  \tING{ÒÅÇÕÌÑÒÎÙÍ}, ÅÓÌÉ $A = G_{\Sigma,T}(s)$ ÄÌÑ ÎÅËÏÔÏÒÏÇÏ
  ÒÅÇÕÌÑÒÎÏÇÏ ×ÙÒÁÖÅÎÉÑ $s \in \RExp_{\Sigma,T}$.

  \tING{óÅÍÅÊÓÔ×Ï ÒÅÇÕÌÑÒÎÙÈ ÍÎÏÖÅÓÔ× ÎÁÓÙÝÅÎÎÙÈ ÓÔÒÏË ÎÁÄ~$\Sigma,T$} 
  ÏÂÏÚÎÁÞÁÅÔÓÑ
  $\Reg_{\Sigma,T}$. 
  (<<$\Reg_{\Sigma,T} \models \phi$>> ÚÎÁÞÉÔ 
  <<$\Reg_{\Sigma,T}, G \models \phi$>>. \todo{[ÐÏÌÕÞÛÅ ÂÙ ÎÁÐÉÓÁÔØ]})
\end{definition}

%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\subsubsection{÷ÏÐÒÏÓÙ ÍÅÔÁÔÅÏÒÉÉ \KAT É $\RExp_{\Sigma,T}$}
\todo{[ÔÅ ÖÅ]}


%  ÎÅÄÅÔÅÒÍÉÎÉÒÏ×ÁÎÎÙÅ 
\subsection{ðÒÏÇÒÁÍÍÙ: ÐÒÏÐÏÚÉÃÉÏÎÁÌØÎÙÅ ÓÈÅÍÙ}
\label{sec:nps}
(îÅÄÅÔ. ÓÈÅÍÙ ñÎÏ×Á.)

\begin{definition}
  ä×Å ÓÈÅÍÙ, ÓÏÏÔ×ÅÔÓÔ×ÕÀÝÉÅ 
  Á×ÔÏÍÁÔÎÙÍ ×ÙÒÁÖÅÎÉÑÍ $s', s'' \in \AExp_{\Sigma,T}$
  \tING{\todo{[ÒÅÌÑÃÉÏÎÎÏ?]} ÜË×É×ÁÌÅÎÔÎÙ}, ÅÓÌÉ:
  \begin{equation}
    \label{eq:sch-equiv}
    \REL_{\Sigma,T} \models 
    s' = s''.
  \end{equation}
\end{definition}

\paragraph{ïÂÙÞÎÏÅ ÏÐÒÅÄÅÌÅÎÉÅ ÓÅÍÁÎÔÉËÉ.}
\begin{definition}
  ðÕÓÔØ Ä×ÕÍ ÓÈÅÍÁÍ ÎÁÄ~$\Sigma, T$ ÓÏÏÔ×ÅÔÓÔ×ÕÀÔ Á×ÔÏÍÁÔÎÙÅ ×ÙÒÁÖÅÎÉÑ
  $s', s'' \in \AExp_{\Sigma,T}$.
  üÔÉ Ä×Å ÓÈÅÍÙ \tING{ÜË×É×ÁÌÅÎÔÎÙ ÎÁ ÛËÁÌÅ ëÒÉÐËÅ}~$\kf F$ ÎÁÄ~$\Sigma, T$, ÅÓÌÉ:
\begin{equation}
  \label{eq:sch-equiv-on-kf}
  \relReg_{\kf F}' \models 
  \Start \cdot s' = \Start \cdot s''.
\end{equation}
\end{definition}
\todo{[$\relReg_{\kf F}'$\T ÓÏ $\Start$ × ÎÁÞÁÌÅ.]}
üË×É×ÁÌÅÎÔÎÏÓÔØ ×ÏÏÂÝÅ\T ÜË×É×ÁÌÅÎÔÎÏÓÔØ ÎÁ ÌÀÂÏÊ ÛËÁÌÅ ëÒÉÐËÅ:
\begin{definition}
  ä×Å ÓÈÅÍÙ, ÓÏÏÔ×ÅÔÓÔ×ÕÀÝÉÅ 
  Á×ÔÏÍÁÔÎÙÍ ×ÙÒÁÖÅÎÉÑÍ $s', s'' \in \AExp_{\Sigma,T}$
  \tING{ÜË×É×ÁÌÅÎÔÎÙ × ÔÒÁÄÉÃÉÏÎÎÏÍ ÓÍÙÓÌÅ}, ÅÓÌÉ:
  \begin{equation}
    \label{eq:sch-equiv-trad}
    \RELT' \models 
    \Start \cdot s' = \Start \cdot s''.
  \end{equation}
\end{definition}
\todo{[$\REL'$\T ÓÏ $\Start$ × ÎÁÞÁÌÅ.]}
éÎÏÇÄÁ ÄÌÑ ÏÐÒÅÄÅÌÅÎÉÑ ÜË×É×ÁÌÅÎÔÎÏÓÔÉ ÓÈÅÍ ÐÒÉ×ÌÅËÁÀÔ ÌÉÛØ <<ÍÏÄÅÌÉ,
ÏÓÎÏ×ÁÎÎÙÅ  ÎÁ Ó×ÏÂÏÄÎÙÈ ÍÏÎÏÉÄÁÈ>>, ÎÏ ÏÔ ÜÔÏÇÏ ÏÐÒÅÄÅÌÅÎÉÅ ÎÅ ÍÅÎÑÅÔÓÑ:
\begin{proposition}
$$
\eqref{eq:sch-equiv-trad} \iff
\SIMPLE_{\Sigma,T} \models \Start \cdot s' = \Start \cdot s''.
$$
\end{proposition}
\begin{proof}
  óÌÅÄÕÅÔ ÉÚ \todo{[???]}.
\end{proof}
\begin{proposition}
  $$
  \RELT' \models \Start \cdot s = \Start \cdot t
  \iff 
  \RELT \models s = t.
  $$
\end{proposition}
ôÁË ÞÔÏ ÐÏËÁÚÁÎÁ ÜË×É×ÁÌÅÎÔÎÏÓÔØ <<ÔÒÁÄÉÃÉÏÎÎÏÇÏ>>
ÏÐÒÅÄÅÌÅÎÉÑ ÜË×É×ÁÌÅÎÔÎÏÓÔÉ~\eqref{eq:sch-equiv-trad} ÏÓÎÏ×ÎÏÍÕ~\eqref{eq:sch-equiv}.

\subsubsection{÷ÏÐÒÏÓÙ}
\label{sec:free-withTests-ndet-rexpr-Qs}

÷ÏÐÒÏÓÙ ÔÅ ÖÅ, ÞÔÏ É × òÁÚÄÅÌÅ~\ref{sec:free-plain-ndet-rexpr-Qs}.

\begin{enumerate}
\item 
ïÔÌÉÞÁÀÔÓÑ ÌÉ ××ÅÄ£ÎÎÙÅ ÐÏÄËÌÁÓÓÙ \KAT (Ó ÔÏÞÎÏÓÔØÀ ÄÏ
ÉÚÏÍÏÒÆÉÚÍÏ× ÁÌÇÅÂÒ)? ëÁË ÏÎÉ Ó×ÑÚÁÎÙ Ó ÁÎÁÌÏÇÁÍÉ ÂÅÚ ÔÅÓÔÏ×?

äÌÑ ËÌÁÓÓÏ× ÏÞÅ×ÉÄÎÙ ÔÁËÉÅ ×ÌÏÖÅÎÉÑ:
\begin{gather}
  \label{eq:KA-classes-inclu-simple}
  \RELT \subseteq \RKAT \subseteq \KATc \subseteq \KAT\\
  \TRACET \subseteq \KAc\\
  \Reg_{\Sigma} \in \KAc
\end{gather}
\todo{[çÄÅ $\trReg_{\kf F}$, $\relReg_{\kf F}$?]}
\begin{align}
  \label{eq:KAT-KA-inclu-simple}
  \KAT &\subseteq \KA,
  \\
  \KATc &\subseteq \KAc,
  \\
  \RKAT &\subseteq \RKA.
\end{align}

õÞÅÓÔØ ÓÐÅÃÉÆÉÞÅÓËÉÅ ËÌÁÓÓÙ ÍÏÄÅÌÅÊ, ÓÏÏÔ×ÅÔÓÔ×ÕÀÝÉÅ ÏÐÒÅÄÅÌÅÎÉÑÍ
ÓÅÍÁÎÔÉËÉ ÐÒÏÇÒÁÍÍ, ÜË×É×ÁÌÅÎÔÎÏÓÔÉ ÐÒÏÇÒÁÍÍ, ÎÁÐÒÉÍÅÒ, \todo{[??]}.

\item 
ïÔÌÉÞÁÀÔÓÑ ÌÉ ÔÅÏÒÉÉ \todo{[× ÑÚÙËÅ 1\dÇÏ ÐÏÒÑÄËÁ]} ××ÅÄ£ÎÎÙÈ
ÐÏÄËÌÁÓÓÏ× \KAT? 
ëÁË ÏÎÉ Ó×ÑÚÁÎÙ Ó ÔÅÏÒÉÑÍÉ ÐÏÄËÌÁÓÓÏ× \KA?

\item 
ïÔÌÉÞÁÀÔÓÑ ÌÉ ÜË×ÁÃÉÏÎÁÌØÎÙÅ ÔÅÏÒÉÉ ××ÅÄ£ÎÎÙÈ ÐÏÄËÌÁÓÓÏ× \KAT?

\item óÕÝÅÓÔ×ÕÀÔ ÌÉ \todo{Ó×ÏÂÏÄÎÙÅ ÍÏÄÅÌÉ [ÔÁË?]} ÄÌÑ ÜÔÉÈ ËÌÁÓÓÏ×?


\item òÁÚÒÅÛÉÍÙ ÌÉ ÜË×ÁÃÉÏÎÁÌØÎÙÅ ÔÅÏÒÉÉ ÜÔÉÈ ËÌÁÓÓÏ×?

é Ó ËÁËÉÍÉ ÄÒÕÇÉÍÉ ÐÒÏÂÌÅÍÁÍÉ Ó×ÑÚÁÎÁ ÐÒÏÂÌÅÍÁ ÜË×É×ÁÌÅÎÔÎÏÓÔÉ?
\todo{[ÄÒÕÇÉÅ ÐÒÏÂÌÅÍÙ]}


\item íÅÓÔÏ ÐÒÏÂÌÅÍÙ ÜË×É×ÁÌÅÎÔÎÏÓÔÉ × ÓÌÏÖÎÏÓÔÎÏÊ ÉÅÒÁÒÈÉÉ.


\item ëÁËÉÅ ÍÏÖÎÏ ÎÁÚ×ÁÔØ ÉÎÔÅÒÅÓÎÙÅ ÏÓÏÂÙÅ ÐÏÄÓÌÕÞÁÉ? 

\end{enumerate}


\subsection{ïÔ×ÅÔÙ}
\label{sec:free-withTests-Theory}

\paragraph{÷ËÌÀÞÅÎÉÑ ÐÏÄËÌÁÓÓÏ× \KAT É \KA.}

\subparagraph{ó×ÑÚÉ ÍÅÖÄÕ \KAT É \KA.}
\begin{remark}\label{rem:KA-primitve-KAT}
ìÀÂÁÑ \KAT Ñ×ÌÑÅÔÓÑ É \KA ÐÏ ÏÐÒÅÄÅÌÅÎÉÀ, *\dÎÅÐÒÅÒÙ×ÎÁÑ \KAT\T
*\dÎÅÐÒÅÒÙ×ÎÏÊ \KA ÐÏ ÏÐÒÅÄÅÌÅÎÉÀ, É ÒÅÌÑÃÉÏÎÎÁÑ \KAT\T
ÒÅÌÑÃÉÏÎÎÏÊ \KA (ÏÐÒÅÄÅÌÅÎÉÅ ÒÅÌÑÃÉÏÎÎÏÊ \KAT ÐÏ ÓÒÁ×ÎÅÎÉÀ Ó
ÏÐÒÅÄÅÌÅÎÉÅÍ ÒÅÌÑÃÉÏÎÎÏÊ \KA ÎÁËÌÁÄÙ×ÁÅÔ ÄÏÐÏÌÎÉÔÅÌØÎÙÅ ÏÇÒÁÎÉÞÅÎÉÑ ÎÁ
ÏÔÎÏÛÅÎÉÑ, É ÜÔÏ ÎÅ ÍÅÛÁÅÔ ÅÊ ÂÙÔØ ÒÅÌÑÃÉÏÎÎÏÊ \KA).

<<Ñ×ÌÑÅÔÓÑ>> 
ÚÎÁÞÉÔ <<\KAT $\ka T = \Stru{K, B; +, \cdot, ^*, \nP, 0,  1}$
ÉÎÄÕÃÉÒÕÅÔ \KA $\ka K = \Stru{K; +, \cdot, ^*,  0,  1}$ Ó ÕËÁÚÁÎÎÙÍÉ
Ó×ÏÊÓÔ×ÁÍÉ.

ïÂÒÁÔÎÏ. ìÀÂÁÑ \KA $\ka K = \Stru{K; +, \cdot, ^*,  0,  1}$ ÉÎÄÕÃÉÒÕÅÔ 
\KAT $\ka T = \Stru{K, B; +, \cdot, ^*, \nP, 0,  1}$ Ó ÐÒÏÓÔÅÊÛÅÊ
ÂÕÌÅ×ÏÊ ÐÏÄÁÌÇÅÂÒÏÊ ÔÅÓÔÏ× ÎÁ $B = \{ 0, 1 \}$. *\dÎÅÐÒÅÒÙ×ÎÏÓÔØ É
ÒÅÌÑÃÉÏÎÎÏÓÔØ ÐÒÉ ÜÔÏÍ ÓÏÈÒÁÎÑÀÔÓÑ.
\end{remark}

\begin{remark}[\cite{KAT-commutativity}]
÷ ÔÏ ÖÅ ×ÒÅÍÑ ÐÏÐÙÔËÁ ÐÏÓÔÒÏÉÔØ ÐÏ $\ka K$ ÂÏÌÅÅ ÓÌÏÖÎÕÀ \KAT ÄÒÕÇÉÍ
ÅÓÔÅÓÔ×ÅÎÎÙÍ ÓÐÏÓÏÂÏÍ ÎÅ ×ÓÅÇÄÁ ÐÒÉ×ÅÄ£Ô Ë ÕÓÐÅÈÕ:
ÐÏÌÏÖÉÍ $B = \{ x \in K \mid x \leq 1 \}$. 
åÓÌÉ $\ka K$ ÒÅÌÑÃÉÏÎÎÁÑ,
ÔÏ ÂÕÄÅÔ ÓÕÝÅÓÔ×Ï×ÁÔØ ÒÅÌÑÃÉÏÎÎÁÑ \KAT $\ka T$,
ÓÏÄÅÒÖÁÝÁÑ $\Stru{K, B; +, \cdot, ^*, \nP, 0,  1}$. äÌÑ $(\min,
+)$\DÁÌÇÅÂÒÙ ëÌÉÎÉ ÔÁË ÎÅ ÐÏÌÕÞÉÔÓÑ.
\end{remark}

\paragraph{ôÅÏÒÉÉ ÐÏÄËÌÁÓÓÏ× \KAT É \KA.}

\subparagraph{ó×ÑÚÉ ÍÅÖÄÕ \KAT É \KA.}
åÓÌÉ $\phi$\T ÆÏÒÍÕÌÁ × ÑÚÙËÅ \KA 1\dÇÏ ÐÏÒÑÄËÁ, ÔÏ 
\begin{align}
  \label{eq:KAT-KA-theories}
  \KA \models \phi &\iff \KAT \models \phi
  &
  \KAc \models \phi &\iff \KATc \models \phi
  &
  \RKA \models \phi &\iff \RKAT \models \phi.
\end{align}
üÔÏ ÓÌÅÄÕÅÔ ÉÚ úÁÍÅÞÁÎÉÑ~\ref{rem:KA-primitve-KAT}.

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