The OCaml compiler has a "-principal" option and the term "principal type" is sometimes mentioned in the mailing list. What exactly does it mean? The definition in Wikipedia is recursive, as it assumes the reader is already familiar with the notion.
The process of type inference is the fact of guessing, given an user-written program, what the type of this program is. In general, there may be several correct types for a given program. For example, the program
Given a program, a type for this program is principal if it is the most general type that can be given to this program, in the sense that all other psosible types are specialization (instances) of this type. With my
In some type systems, principal types do not always exist. You have a program
(To solve that example you could: (1) not overload arithmetic operators (2) make an arbitrary choice (that's what F# does iirc) (3) reject the program and ask for a type annotation to remove the ambiguity (4) have more expressive types such as Haskell's
The "simple" subset of the OCaml language, based on Hindley-Milner type inference, has principal types. This means that the inference engine always does the right thing (given the specification of the possible types). Some more advanced aspects of the type system (eg. polymorphic fields and methods) lose this property: in some cases the type-system can't find a most general type, or finding the most general type would require sensibly more complex computations from the type inference engine (which generally tries to be fast). The
I'm not very familiar with this flag (I prefer to avoid too advanced type-system features so my program are usually not concerned), so you would have to double-check this, but that is the rough idea. This flag is relatively unimportant in my opinion (you don't usually need to care), but the idea of principal types is indeed an important part of the theory of ML languages.
Two more technical details if you wish to go further:
In practice, a relatively large part of the designers of programming languages have lately given up on the idea of principality. They want to have more ambitious type systems (dependent types, etc.) where it's just too hard to seek principality, so they instead content themselves with non-principal inference: it's already good if the inference engine can find some type, let's not be difficult on the generality of the result. Jacques Garrigue, the main maintainer of the OCaml type system, still cares about it very much, and I think that's an interesting aspect of the OCaml programming language research.
To build a little bit upon gasche's explanation, here's an example, stolen from OCaml's own testsuite, where principality, or lack thereof, appears. Disclaimer: this uses objects.
When running this in a top-level session, you'll get:
These functions perform the exact same thing but get assigned different types!
If you invoke OCaml with the
The interesting thing is that if you replace
What the compiler wants to tell the programmer here is that there are two suitable types for