X <: Y means type parameter
X must be a subtype of type
X >: Y means the opposite,
X must be a super type of
Y (in both cases,
X = Y is ok). This notation can be contrary intuition, one may think a dog is more than an animal (more precise of in programming terms, more services), but for the very reason it is more precise, there are less dogs than there are animals, the type
Animal contains more values than the type
Dog, it contains all dogs, and all ostriches too. So
As for the reason why
push has this signature, I'm not sure I can explain it better than the page the example comes from, but let me try.
It starts with variance. The
class Stack[+A] means that
covariant in A. if
X is a subtype of
Stack[X] will be a subtype of
Stack[Y]. A stack of dogs is also a stack of animals. For the mathematically inclined, if one sees Stack as a function from type to type (X is a type, if you pass it to Stack, you get Stack[X], which is another type), being covariant means that it is an increasing function (with <:, the subtyping relation being the orders on types).
This seems right, but this is not such an easy question. It would not be so, with a push routine that modifies it, adding a new element, that is
def push(a: A): Unit
(the example is different, push returns a new stack, leaving
this unchanged). Of course, a Stack[Dog] should only accept dogs to be pushed into it. Otherwise, it would no longer be a stack of dogs. But if we accept it to be treated as a stack of animals, we could do
val dogs : Stack[Dog] = new Stack[Dog]
val animals : Stack[Animal] = dogs // if we say stack is covariant
animals.push(ostrich) // allowed, we can push anything in a stack of any.
val topDog: Dog = dogs.top // ostrich!
Clearly, treating this stack as covariant is unsound. When the stack is seen as a
Stack[Animal], an operation is allowed that would not be on
Stack[Dog]. What was done here with push can be done with any routine that takes A as its argument. If a generic class is marked as covariant, with C[+A], then A cannot be the type of any argument of any (public) routine of C, and the compiler will enforce that.
But the stack in the exemple is different. We would have a
def push(a: A): Stack[A]. If one calls
push, one gets a new stack, and the original stack is left unchanged, it is still a proper Stack[Dog], whatever may have been pushed. If we do
val newStack = dogs.push(ostrich)
dogs is still the same and still a
newStack is not. Nor is it a
Stack[Ostrich], because it also contains the dogs that were (and still are) in the original stack. But it would be a proper
Stack[Animal]. If one pushes a cat, it would be more precise to say it is a
Stack[Mammal] (while being a stack of animals too). If one pushes
12, it will be only a
Stack[Any], the only common supertype of
Integer. The problem is that the compiler has no way to know that this call is safe, and will not allow the
a: A argument in
def push(a: A): Stack[A] if
Stack is marked covariant. If it stopped there, a covariant stack would be useless because there would be no way to put values in it.
The signature solves the problem:
def push[B >: A](elem: B): Stack[B]
B is an ancestor of
A, when adding a
B, one gets a
Stack[B]. So adding a
Mammal to a
Stack[Dog] gives a
Stack[Mammal], adding an animal gives a
Stack[Animal], which is fine. Adding a Dog is ok too, A >: A is true.
This is good, but seems too restrictive. What if the added item's type is not an ancestor of
A? For instance, what if it is a descendant e.g
dogs.push(goldenRetriever). One cannnot take
B = GoldenRetriever, one has not
GoldenRetriever >: Dog, but the opposite. Yet, one can take B = Dog all right. It the parameter elem is expected to be of type Dog, we can pass of course pass a GoldenRetriever. One gets a stack of B, still a stack of dogs. And it is right that
B = GoldenRetriever was not allowed. The result would have been typed as
Stack[GoldenRetriever], which would be wrong because the stack may have contained irish setters too.
What about ostrishes? Well
Ostrich is neither an supertype, nor a subtype of
Dog. But just as one can add a goldenRetriever because it is a dog, and it is possible to add a dog, an ostrich is an animal, and it is possible to add an animal. So taking B = Animal >: Dog works, and so a when pushing an ostrich, one gets a
Making the stack covariant force this signature, more complex than the naïve
push(a: A) : Stack[A]. But we gain a routine that is completely flexible, anything can be added, not just an
A, and yet, types the result as precisely as can be. And the actual implementation, except for the types declarations, is the same it would have been with