Mathematical logic

Definition. A first-order language ${\displaystyle {\mathfrak {L}}\,}$ is a collection of distinct typographical symbols classified as follows:

1. The equality symbol ${\displaystyle =\,}$; the connectives ${\displaystyle \lor \,}$, ${\displaystyle \lnot \,}$; the universal quantifier ${\displaystyle \forall \,}$ and the parentheses ${\displaystyle (\,}$, ${\displaystyle )\,}$.
2. A countable set of variable symbols ${\displaystyle \{v_{i}\}_{i=0}^{\infty }\,}$.
3. A set of constant symbols ${\displaystyle \{c_{\alpha }\}_{\alpha \in \mathrm {A} }\,}$.
4. A set of function symbols ${\displaystyle \{f_{\beta }\}_{\beta \in \mathrm {B} }\,}$.
5. A set of relation symbols ${\displaystyle \{R_{\gamma }\}_{\gamma \in \Gamma }\,}$.

Definition. An ${\displaystyle {\mathfrak {L}}\,}$-structure over the language ${\displaystyle {\mathfrak {L}}\,}$, is a bundle consisting of a nonempty set ${\displaystyle A\,}$, the universe of the structure, together with:

1. For each constant symbol ${\displaystyle c\,}$ from ${\displaystyle {\mathfrak {L}}\,}$, an element ${\displaystyle c^{\mathfrak {A}}\in A\,}$.
2. For each ${\displaystyle n\,}$-ary function symbol ${\displaystyle f\,}$ from ${\displaystyle {\mathfrak {L}}\,}$, an ${\displaystyle n\,}$-ary function ${\displaystyle f^{\mathfrak {A}}:A^{n}\longrightarrow A\,}$.
3. For each ${\displaystyle n\,}$-ary relation symbol ${\displaystyle R\,}$ from ${\displaystyle {\mathfrak {L}}\,}$, an ${\displaystyle n\,}$-ary relation on ${\displaystyle A\,}$, that is, a subset ${\displaystyle R^{\mathfrak {A}}\subseteq A^{n}\,}$.

Definition. An ${\displaystyle {\mathfrak {L}}\,}$-term is a nonempty finite string ${\displaystyle t\,}$ of symbols from ${\displaystyle {\mathfrak {L}}\,}$ such that either

• ${\displaystyle t\,}$ is a variable symbol.
• ${\displaystyle t\,}$ is a constant symbol.
• ${\displaystyle t\,}$ is a string of the form ${\displaystyle ft_{1}...t_{n}\,}$ where ${\displaystyle f\,}$ is an ${\displaystyle n\,}$-ary function symbol and ${\displaystyle t_{1}\,}$, ..., ${\displaystyle t_{n}\,}$ are terms of ${\displaystyle {\mathfrak {L}}\,}$.

Definition. An ${\displaystyle {\mathfrak {L}}\,}$-formula is a nonempty finite string ${\displaystyle \phi \,}$ of symbols from ${\displaystyle {\mathfrak {L}}\,}$ such that either

• ${\displaystyle \phi \,}$ is a string of the form ${\displaystyle t_{1}=t_{2}\,}$ where ${\displaystyle t_{1}\,}$ and ${\displaystyle t_{2}\,}$ are terms of ${\displaystyle {\mathfrak {L}}\,}$.
• ${\displaystyle \phi \,}$ is a string of the form ${\displaystyle Rt_{1}...t_{n}\,}$ where ${\displaystyle R\,}$ is an ${\displaystyle n\,}$-ary relation symbol and ${\displaystyle t_{1}\,}$, ..., ${\displaystyle t_{n}\,}$ are terms of ${\displaystyle {\mathfrak {L}}\,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle \lnot (\alpha )\,}$ where ${\displaystyle \alpha \,}$ is an ${\displaystyle {\mathfrak {L}}\,}$-formula.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\alpha \lor \beta )\,}$ where both ${\displaystyle \alpha \,}$ and ${\displaystyle \beta \,}$ are ${\displaystyle {\mathfrak {L}}\,}$-formulas.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\forall y)(\alpha )\,}$ where ${\displaystyle y\,}$ is a variable symbol from ${\displaystyle {\mathfrak {L}}\,}$ and ${\displaystyle \alpha \,}$ is an ${\displaystyle {\mathfrak {L}}\,}$-formula.

Definition. An ${\displaystyle {\mathfrak {L}}\,}$-formula that is characterized by either the first or the second clause is called an atomic.

Definition. Let ${\displaystyle \phi \,}$ be an ${\displaystyle {\mathfrak {L}}\,}$-formula. A variable symbol ${\displaystyle x\,}$ from ${\displaystyle {\mathfrak {L}}\,}$ is said to be free in ${\displaystyle \phi \,}$ if either

• ${\displaystyle \phi \,}$ is atomic and ${\displaystyle x\,}$ occurs in ${\displaystyle \phi \,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle \lnot (\alpha )\,}$ and ${\displaystyle x\,}$ is free in ${\displaystyle \alpha \,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\alpha \lor \beta )\,}$ and ${\displaystyle x\,}$ is free in ${\displaystyle \alpha \,}$ or ${\displaystyle \beta \,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\forall y)(\alpha )\,}$ where ${\displaystyle x\,}$ and ${\displaystyle y\,}$ are not the same variable symbols and ${\displaystyle x\,}$ is free in ${\displaystyle \alpha \,}$.

Definition. A sentence is a formula with no free variables.

Definition. A variable assignment function (v.a.f.) into ${\displaystyle {\mathfrak {A}}\,}$ is a function from the set of variables of ${\displaystyle {\mathfrak {L}}\,}$ into ${\displaystyle A\,}$.

Definition. Let ${\displaystyle s\,}$ be a v.a.f. into ${\displaystyle {\mathfrak {A}}\,}$. We define the term assignment function (t.a.f.) ${\displaystyle {\overline {s}}\,}$, from the set of ${\displaystyle {\mathfrak {L}}\,}$-terms into ${\displaystyle A\,}$, as follows:

• If ${\displaystyle t\,}$ is the variable symbol ${\displaystyle x\,}$, then ${\displaystyle {\overline {s}}(t)=s(x)\,}$.
• If ${\displaystyle t\,}$ is the constant symbol ${\displaystyle c\,}$, then ${\displaystyle {\overline {s}}(t)=c^{\mathfrak {A}}\,}$.
• If ${\displaystyle t\,}$ is of the form ${\displaystyle ft_{1}...t_{n}\,}$, then ${\displaystyle {\overline {s}}(t)=f^{\mathfrak {A}}({\overline {s}}(t_{1}),...,{\overline {s}}(t_{n}))\,}$.

Definition. Let ${\displaystyle s\,}$ be a v.a.f. into ${\displaystyle {\mathfrak {A}}\,}$ and suppose that ${\displaystyle x\,}$ is a variable and that ${\displaystyle a\in A\,}$. We define the v.a.f. ${\displaystyle s[x|a]\,}$, referred to as an ${\displaystyle x\,}$-modification of the assignment function ${\displaystyle s\,}$, by

Definition. Let ${\displaystyle \phi \,}$ be formula and suppose ${\displaystyle s\,}$ is a v.a.f. into ${\displaystyle {\mathfrak {A}}\,}$. We say that ${\displaystyle {\mathfrak {A}}\,}$ satisfies ${\displaystyle \phi \,}$ with assignment ${\displaystyle s\,}$, and write ${\displaystyle {\mathfrak {A}}\models \phi [s]\,}$, if either:

• ${\displaystyle \phi \,}$ is of the form ${\displaystyle t_{1}=t_{2}\,}$ and ${\displaystyle {\overline {s}}(t_{1})={\overline {s}}(t_{2})\,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle Rt_{1}...t_{n}\,}$ and ${\displaystyle ({\overline {s}}(t_{1}),...,{\overline {s}}(t_{n}))\in R^{\mathfrak {A}}\,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle \lnot (\alpha )\,}$ and ${\displaystyle {\mathfrak {A}}{\mbox{ }}\not \models {\mbox{ }}\alpha [s]\,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\alpha \lor \beta )\,}$ and ${\displaystyle {\mathfrak {A}}\models \alpha [s]\,}$ or ${\displaystyle {\mathfrak {A}}\models \beta [s]\,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\forall y)(\alpha )\,}$ and for each element ${\displaystyle a\in A\,}$, ${\displaystyle {\mathfrak {A}}\models \alpha [s[y|a]]\,}$.

Definition. Let ${\displaystyle \phi \,}$ be formula and suppose that ${\displaystyle {\mathfrak {A}}\models \phi [s]\,}$ for every v.a.f. ${\displaystyle s\,}$ into ${\displaystyle {\mathfrak {A}}\,}$. Then we say that ${\displaystyle {\mathfrak {A}}\,}$ models ${\displaystyle \phi \,}$, and write ${\displaystyle {\mathfrak {A}}\models \phi \,}$.

Definition. Let ${\displaystyle \Phi \,}$ be a set of formulas and suppose that ${\displaystyle {\mathfrak {A}}\models \phi \,}$ for every formula ${\displaystyle \phi \in \Phi \,}$ then we say that ${\displaystyle {\mathfrak {A}}\,}$ models ${\displaystyle \Phi \,}$, and write ${\displaystyle {\mathfrak {A}}\models \Phi \,}$.

Definition. Let ${\displaystyle \phi \,}$ be a sentence and suppose that ${\displaystyle {\mathfrak {A}}\models \phi \,}$. Then we say that ${\displaystyle \phi \,}$ is true in ${\displaystyle {\mathfrak {A}}\,}$.

Definition. Let ${\displaystyle \Psi \,}$ and ${\displaystyle \Phi \,}$ be sets of formulas. We say that ${\displaystyle \Psi \,}$ logically implies ${\displaystyle \Phi \,}$, and write ${\displaystyle \Psi \models \Phi \,}$, if for every structure ${\displaystyle {\mathfrak {A}}\,}$, ${\displaystyle {\mathfrak {A}}\models \Psi \,}$ implies ${\displaystyle {\mathfrak {A}}\models \Phi \,}$.

Definition. Let ${\displaystyle \phi \,}$ be a formula and suppose that ${\displaystyle \varnothing \models \phi \,}$. Then we say that ${\displaystyle \phi \,}$ is universally valid, or simply valid, and in this case we simply write ${\displaystyle \models \phi \,}$.

Definition. Let ${\displaystyle \phi \,}$ be a sentence and suppose that ${\displaystyle \models \phi \,}$. Then we say that ${\displaystyle \phi \,}$ is true.

Definition. Let ${\displaystyle u\,}$ be a term and suppose ${\displaystyle x\,}$ is a variable and ${\displaystyle t\,}$ is another term. We define the term ${\displaystyle u_{t}^{x}\,}$, read ${\displaystyle u\,}$ with ${\displaystyle x\,}$ replaced by ${\displaystyle t\,}$, as follows:

• If ${\displaystyle u\,}$ is the variable symbol ${\displaystyle x\,}$, then ${\displaystyle u_{t}^{x}\,}$ is defined to be the term ${\displaystyle t\,}$.
• If ${\displaystyle u\,}$ is a variable symbol other than ${\displaystyle x\,}$, then ${\displaystyle u_{t}^{x}\,}$ is defined to be the term ${\displaystyle u\,}$.
• If ${\displaystyle u\,}$ is a constant symbol, then ${\displaystyle u_{t}^{x}\,}$ is defined to be the term ${\displaystyle u\,}$.
• If ${\displaystyle u\,}$ is of the form ${\displaystyle ft_{1}...t_{n}\,}$, then ${\displaystyle u_{t}^{x}\,}$ is defined to be the term ${\displaystyle f{t_{1}}_{t}^{x}...{t_{n}}_{t}^{x}\,}$.

Definition. Let ${\displaystyle \phi \,}$ be a formula and suppose ${\displaystyle x\,}$ is a variable and ${\displaystyle t\,}$ is a term. We define the formula ${\displaystyle \phi _{t}^{x}\,}$, read ${\displaystyle \phi \,}$ with ${\displaystyle x\,}$ replaced by ${\displaystyle t\,}$, as follows:

• If ${\displaystyle \phi \,}$ is of the form ${\displaystyle t_{1}=t_{2}\,}$, then ${\displaystyle \phi _{t}^{x}\,}$ is defined to be the formula ${\displaystyle {t_{1}}_{t}^{x}={t_{2}}_{t}^{x}\,}$.
• If ${\displaystyle \phi \,}$ is of the form ${\displaystyle Rt_{1}...t_{n}\,}$, then ${\displaystyle \phi _{t}^{x}\,}$ is defined to be the formula ${\displaystyle R{t_{1}}_{t}^{x},...,{t_{n}}_{t}^{x}\,}$.
• If ${\displaystyle \phi \,}$ is of the form ${\displaystyle \lnot (\alpha )\,}$, then ${\displaystyle \phi _{t}^{x}\,}$ is defined to be the formula ${\displaystyle \lnot (\alpha _{t}^{x})\,}$.
• If ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\alpha \lor \beta )\,}$, then ${\displaystyle \phi _{t}^{x}\,}$ is defined to be the formula ${\displaystyle (\alpha _{t}^{x}\lor \beta _{t}^{x})\,}$.
• If ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\forall y)(\alpha )\,}$, then
  • if ${\displaystyle x\,}$ and ${\displaystyle y\,}$ are the same variable symbol, ${\displaystyle \phi _{t}^{x}\,}$ is defined to be the formula ${\displaystyle \phi \,}$.
  • else, ${\displaystyle \phi _{t}^{x}\,}$ is defined to be the formula ${\displaystyle (\forall y)(\alpha _{t}^{x})\,}$.

Definition. Let ${\displaystyle \phi \,}$ be a formula and suppose ${\displaystyle x\,}$ is a variable and ${\displaystyle t\,}$ is a term. We say that ${\displaystyle t\,}$ is substitutable for ${\displaystyle x\,}$ in ${\displaystyle \phi \,}$, if either:

• ${\displaystyle \phi \,}$ is atomic.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle \lnot (\alpha )\,}$ and ${\displaystyle t\,}$ is substitutable for ${\displaystyle x\,}$ in ${\displaystyle \alpha \,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\alpha \lor \beta )\,}$ and ${\displaystyle t\,}$ is substitutable for ${\displaystyle x\,}$ in both ${\displaystyle \alpha \,}$ and ${\displaystyle \beta \,}$.
• ${\displaystyle \phi \,}$ is of the form ${\displaystyle (\forall y)(\alpha )\,}$ and either
  • ${\displaystyle x\,}$ is not a free variable in ${\displaystyle \phi \,}$.
  • ${\displaystyle y\,}$ does not occur in ${\displaystyle t\,}$ and ${\displaystyle t\,}$ is substitutable for ${\displaystyle x\,}$ in ${\displaystyle \alpha \,}$.