I have a problem that I am looking for some guidance to solve the most efficient way. I have 200 million strings of data ranging in size from 3 characters to 70 characters. The strings consist of letters numbers and several special characters such as dashes and underscores. I need to be able to quickly search for the entire string or any substring within a string (minimum substring size is 3). Quickly is defined here as less than 1 second.
As my first cut at this I did the following:
Created 38 index files. An index contains all the substrings that start with a particular letter. The first 4mb contains 1 million hash buckets (start of the hash chains). The rest of the index contains the linked list chains from the hash buckets. My hashing is very evenly distributed. The 1 million hash buckets are kept in RAM and mirrored to disk.
When a string is added to the index it is broken down into its non-duplicate (within itself) 3-n character substrings (when n is the length of the string-1). So, for example, "apples" is stored in the "A" index as pples,pple,ppl,pp (substrings are also stored in the "L" and "P" indexes).
The search/add server runs as a daemon (in C++) and works like a champ. Typical search times are less than 1/2 second.
The problem is on the front end of the process. I typically add 30,000 keys at a time. This part of the process takes forever. By way of benchmark, the load time into an empty index of 180,000 variable length keys is approximately 3 1/2 hours.
This scheme works except for the very long load times.
Before I go nuts optimizing (or trying to) I'm wondering is whether or not there is a better way to solve this problem. Front and back wildcard searches (ie: string like '%ppl%' in a DBMS are amazingly slow (on the order of hours in MySQL for example) for datasets this large. So it would seem that DBMS solutions are out of the question. I can't use full-text searches because we are not dealing with normal words, but strings that may or may not be composed of real words.