Here's a good method with no collision already implemented in plpgsql.
First step: consider the pseudo_encrypt function from the PG wiki.
This function takes a 32 bits integer as argument and returns a 32 bits integer that looks random to the human eye but uniquely corresponds to its argument (so that's encryption, not hashing). Inside the function, you may change the formula:
(((1366.0 * r1 + 150889) % 714025) / 714025.0) with another function known only by you that produces a result in the [0..1] range (just tweaking the constants will probably be good enough, see below my attempt at doing just that). Refer to the wikipedia article on the Feistel cypher for more theorical explanations.
Second step: encode the output number in the alphabet of your choice. Here's a function that does it in base 62 with all alphanumeric characters.
CREATE OR REPLACE FUNCTION stringify_bigint(n bigint) RETURNS text
LANGUAGE plpgsql IMMUTABLE STRICT AS $$
output := output || substr(alphabet, 1+(_n%base)::int, 1);
_n := _n / base;
EXIT WHEN _n=0;
Now here's what we'd get for the first 10 URLs corresponding to a monotonic sequence:
select stringify_bigint(pseudo_encrypt(i)) from generate_series(1,10) as i;
The results look random and are guaranteed to be unique in the entire output space (2^32 or about 4 billion values if you use the entire input space with negative integers as well).
If 4 billion values was not wide enough, you may carefully combine two 32 bits results to get to 64 bits while not loosing unicity in outputs. The tricky parts are dealing correctly with the sign bit and avoiding overflows.
About modifying the function to generate your own unique results: let's change the constant from 1366.0 to 1367.0 in the function body, and retry the test above. See how the results are completely different: