A complicatedsounding term with no good explanations from a simple google search... are there any more academicallyoriented folk who could explain this one?
Both answers are mostly right. I would say that parametricity is a possible property of polymorphism. And polymorphism is parametric if polymorphic terms behave the same under all instantiations. To "behave the same" is a vague, intuitive term. Relational parametricity was introduced by John Reynolds as a mathematical formalization of this. It states that polymorphic terms preserve all relations, which intuitively forces it to behave the same: Consider f: a list > a list. If we have the relation a~1, b~2, c~3, ..., then we can lift it to lists and hav e.g. [a, d, b, c] ~ [1, 4, 2, 3] Now, if f([a, d, b, c]) = [c, b, d, a] and f preserves relations, then f([1, 4, 2, 3]) = [3, 2, 4, 1]. In other words, if f reverses list of strings, it also reverses lists of numbers. So relationally parametric polymorphic functions cannot "inspect the type argument", in that they cannot alter their behaviour based on the type. 


Relational parametricity seems to be the property that a function abstracted over types (like a generic in Java) can have. If it has this property, it means it never inspects its type argument or deconstructs it / uses it in some special way. For example, the function "id or inc" here is not relationally parametric:
The output is:



Okay, just going to hazard a COMPLETE guess here, based on this http://ieeexplore.ieee.org/xpl/freeabs_all.jsp?arnumber=4276578 I'd say it's a mathematical representation of parametric polymorphism (generics). 

