I'd start by splitting the single large file into 65536 smaller files, so that if the hash begins with
0000 it's in the file
00/00data.txt, if the hash begins with
0001 it's in the file
00/01data.txt, etc. If the full file was 12 GiB then each of the smaller files would be (on average) 208 KiB.
Next, separate the hash from the string; such that you've got 65536 "hash files" and 65536 "string files". Each hash file would contain the remainder of the hash (the last 12 digits only, because the first 4 digits aren't needed anymore) and the offset of the string in the corresponding string file. This would mean that (instead of 65536 files at an average of 208 KiB each) you'd have 65536 hash files at maybe 120 KiB each and 65536 string files at maybe 100 KiB each.
Next, the hash files should be in a binary format. 12 hexadecimal digits costs 48 bits (not 12*8=96-bits). This alone would halve the size of the hash files. If the strings are aligned on a 4 byte boundary in the strings file then a 16-bit "offset of the string / 4" would be fine (as long as the string file is less than 256 KiB). Entries in the hash file should be sorted in order, and the corresponding strings file should be in the same order.
After all these changes; you'd use the highest 16-bits of the hash to find the right hash file, load the hash file and do a binary search. Then (if found) you'd get the offset for the start of the string (in the strings file) from entry in the hash file, plus get the offset for the next string from next entry in the hash file. Then you'd load data from the strings file, starting at the start of the correct string and ending at the start of the next string.
Finally, you'd implement a "hash file cache" in memory. If your application can allocate 1.5 GiB of RAM, then that'd be enough to cache half of the hash files. In this case (half the hash files cached) you'd expect that half the time the only thing you'd need to load from disk is the string itself (e.g. probably less than 20 bytes) and the other half the time you'd need to load the hash file into the cache first (e.g. 60 KiB); so on average for each lookup you'd be loading about 30 KiB from disk. Of course more memory is better (and less is worse); and if you can allocate more than about 3 GiB of RAM you can cache all of the hash files and start thinking about caching some of the strings.
A faster way would be to have a reversible encoding, so that you can convert a string into an integer and then convert the integer back into the original string without doing any sort of lookup at all. For an example; if all your strings use lower case ASCII letters and are a max. of 13 characters long, then they could all be converted into a 64-bit integer and back (as 26^13 < 2^63). This could lead to a different approach - e.g. use a reversible encoding (with bit 64 of the integer/hash clear) where possible; and only use some sort of lookup (with bit 64 of the integer/hash set) for strings that can't be encoded in a reversible way. With a little knowledge (e.g. carefully selecting the best reversible encoding for your strings) this could slash the size of your 13 GiB file down to "small enough to fit in RAM easily" and be many orders of magnitude faster.