many-sorted logic

Many-sorted logic can reflect formally our intention not to handle the universe as a homogeneous collection of objects, but to partition it in a way that is similar to types in typeful programming. Both functional and assertive " parts of speech" in the language of the logic reflect this typeful partitioning of the universe, even on the syntax level: substitution and argument passing can be done only accordingly, respecting the "sorts".

There are various ways to formalize the intention mentioned above; a ''many-sorted logic'' is any package of information which fulfils it. In most cases, the following are given:
* a set of sorts, ''S''
* an appropriate generalization of the notion of ''signature'' to be able to handle the additional information that comes with the sorts.
The domain of discourse of any structure of that signature is then fragmented into disjoint subsets, one for every sort.

Example

When reasoning about biological organisms, it is useful to distinguish two sorts: $\mathrm$ and $\mathrm$. While a function $\mathrm\colon \mathrm \to \mathrm$ makes sense, a similar function $\mathrm\colon \mathrm \to \mathrm$ usually does not. Many-sorted logic allows one to have terms like $\mathrm(\mathrm)$, but to discard terms like $\mathrm(\mathrm)$ as syntactically ill-formed.

Algebraization

The algebraization of many-sorted logic is explained in an article by Caleiro and Gonçalves, which generalizes abstract algebraic logic to the many-sorted case, but can also be used as introductory material.

Order-sorted logic

While ''many-sorted'' logic requires two distinct sorts to have disjoint universe sets, ''order-sorted'' logic allows one sort $s_1$ to be declared a subsort of another sort $s_2$, usually by writing $s_1 \subseteq s_2$ or similar syntax. In the above biology example, it is desirable to declare
:$\text \subseteq \text$,
:$\text \subseteq \text$,
:$\text \subseteq \text$,
:$\text \subseteq \text$,
:$\text \subseteq \text$,
:$\text \subseteq \text$,
and so on; cf. picture.

Wherever a term of some sort $s$ is required, a term of any subsort of $s$ may be supplied instead ('' Liskov substitution principle''). For example, assuming a function declaration $\text: \text \longrightarrow \text$, and a constant declaration $\text: \text$, the term $\text(\text)$ is perfectly valid and has the sort $\text$. In order to supply the information that the mother of a dog is a dog in turn, another declaration $\text: \text \longrightarrow \text$ may be issued; this is called ''function overloading'', similar to overloading in programming languages.

Order-sorted logic can be translated into unsorted logic, using a unary predicate $p_i(x)$ for each sort $s_i$, and an axiom $\forall x (p_i(x) \rightarrow p_j(x))$ for each subsort declaration $s_i \subseteq s_j$. The reverse approach was successful in automated theorem proving: in 1985, Christoph Walther could solve a then benchmark problem by translating it into order-sorted logic, thereby boiling it down an order of magnitude, as many unary predicates turned into sorts.

In order to incorporate order-sorted logic into a clause-based automated theorem prover, a corresponding '' order-sorted unification'' algorithm is necessary, which requires for any two declared sorts $s_1, s_2$ their intersection $s_1 \cap s_2$ to be declared, too: if $x_1$ and $x_2$ are variables of sort $s_1$ and $s_2$, respectively, the equation $x_1 \stackrel\,x_2$ has the solution $\$, where $x: s_1 \cap s_2$.

Smolka generalized order-sorted logic to allow for parametric polymorphism.
In his framework, subsort declarations are propagated to complex type expressions.
As a programming example, a parametric sort $\text(X)$ may be declared (with $X$ being a type parameter as in a C++ template), and from a subsort declaration $\text \subseteq \text$ the relation $\text(\text) \subseteq \text(\text)$ is automatically inferred, meaning that each list of integers is also a list of floats.

Schmidt-Schauß generalized order-sorted logic to allow for term declarations.
As an example, assuming subsort declarations $\text \subseteq \text$ and $\text \subseteq \text$, a term declaration like $\forall i:\text. \; (i+i):\text$ allows to declare a property of integer addition that could not be expressed by ordinary overloading.

See also

* Categorical logic
*

References

Early papers on many-sorted logic include:
* , collected in the author's ''Computation, Logic, Philosophy. A Collection of Essays'', Beijing: Science Press; Dordrecht: Kluwer Academic, 1990.
*
*
* {{cite journal, author=F. Jeffry Pelletier, title=Sortal Quantification and Restricted Quantification, journal=Philosophical Studies, year=1972, volume=23, issue=6, pages=400–404, url=https://www.sfu.ca/~jeffpell/papers/SortalRestrQuant.pdf, doi=10.1007/bf00355532, s2cid=170303654

External links

*"Many-sorted Logic", the first chapter i
''Lecture Notes on Decision Procedures''
b
Calogero G. Zarba

Systems of formal logic