Non-serious answer: Map everything to 0
Property 1: check. Property 2: check. Property 3: check.
But I figure you want dissimilar strings to get different values, too. The question then is, what is similar and what is not.
Essentially, you are looking for a hash function.
There are a lot of hash functions designed with different objectives. Crypographic hashes for examples are pretty expensive to compute, because you want to make it really hard to go backwards or even predict how a change to the input affects the output. So they try really hard to violate your condition 2. There are also simpler hash functions that mostly try to spread the data. They mostly try to ensure that close input values are not close to each other afterwards (but it is okay if it is predictable).
You may want to read up on Wikipedia:
(Yes, it has a section on "Finding similar substrings" via Hashing)
Wikipedia also has a list of hash functions:
There is a couple of related stuff for you. For example minhash could be used. Here is a minhash-inspired approach for you: Define a few random lists of all letters in your alphabet. Say I have the letters "abcde" only for this example. I'll only use two lists for this example. Then my lists are:
p1 = "abcde"
p2 = "edcba"
f1(str) be the index in p1 of the first letter in my test word,
f2(str) the first letter in p2. So the word "bababa" would map to 0,3. The word "ababab" also. The word "dada" would make to 0,1, while "ce" maps to 2,0. Note that this map is invariant to word permutations (because it treats them as sets) and for long texts it will converge to "0,0". Yet with some fine tuning it can give you a pretty fast chance of finding candidates for closer inspection.