It's a recursive function over two variables. You can break it apart line-by-line to understand it:
sponge :: Int -> [a] -> [a]
Two arguments, one an
Int, one a list of some elements.
sponge 0 xs = xs
The base case. If the
Int argument is zero, just return the list argument unmodified.
sponge n  = 
Another base case, if the list is empty, immediately return the empty list.
sponge n (x:xs) = sponge (n-1) xs
Finally, the inductive step. If the list is non-empty (i.e. made up of at least one element and a tail, denoted by
x:xs), then the result is
sponge called on
n-1 and the tail of the list.
So what will this function do? It will return the tail of the list after dropping
n elements. It is the same as the
> drop 10 [1..20]
> sponge 10 [1..20]
In fact, we can ask QuickCheck to confirm:
> quickCheck $ \n xs -> sponge n xs == drop n xs
*** Failed! Falsifiable (after 7 tests and 5 shrinks):
Ah! They're different. When
n is negative! So we can modify the property relating the two functions:
> quickCheck $ \n xs -> n >= 0 ==> sponge n xs == drop n xs
+++ OK, passed 100 tests.
So your function behaves like drop, for cases when
n is positive.
Here's a trace of the intermediate values of
xs, obtained via the hood debugger: