I implemented Diffie–Hellman key exchange in Java with some large groups from RFC 3526. My output is a fairly large array of bytes. Is it safe to use the first 448 bits (56 bytes) of the output for a blowfish key? Should I transform the bytes in any way, or pick any specific bytes for the key?
From a theoretical point of view, no, it is not safe. Not that I could pinpoint an actual attack; but the output of a Diffie-Hellman key exchange is an element of a group consisting in q elements and offering sqrt(q) security at most. Truncating parts of the encoding of that element does not look like a good idea...
The "proper" way is to use a one-way key derivation function. In simple words, process the Diffie-Hellman output with a good hash function such as SHA-256 and use the hash result as key. Hashing time will be negligible with regards to the Diffie-Hellman step. Java already includes fine implementations of SHA-256 and SHA-512, and if you are after compatibility with very old Java implementations (e.g. the Microsoft JVM which was coming with Internet Explorer 5.5) then you can use an independent Java implementation of SHA-2 such as the one in sphlib. Or possibly reimplement it from the spec (that's not hard): FIPS 180-3 (a PDF file).
If you need more than 128 bits for your key then this means that you are a time-traveler from year 2050 or so; 128 bits are (much) more than enough to protect you for the time being, assuming that you use a proper symmetric encryption scheme.
Speaking of which: Blowfish is not really recommended anymore. It has 64-bit blocks, which implies trouble when the encrypted data length reaches a few gigabytes, a size which is not that big nowadays. You would be better off using a 128-bit block cipher such as the AES. Also, in any serious symmetric encryption system you will need a keyed integrity check. This can be done with a MAC (Message Authentication Code) such as HMAC, itself built over a hash function (then again, easy to implement, and there is a Java implementation in sphlib). Or, even better, use the AES in a combined encryption/MAC mode which will handle the tricky details for you (because using a block cipher properly is not easy); lookup CWC and GCM (both are patent-free; the latter has been approved by NIST).
The solution that you propose depends on whether the most significant bits of a Diffie-Hellman exchange are hard core. There are some small results known that show that the most significant bits are unpredictable, but I'm not aware of a paper that is strong enough to show that your approach is correct.
However, there are several proposals for a key derivation from Diffie-Hellman keys. E.g. a nice paper is NIST SP 800-135. So far this is only a draft and can be found here. However, it reviews some existing standards. Of course, using a standard is always preferable to develop it yourself.
While Thomas Pornin's proposal looks reasonable it is nonetheless an ad hoc solution. And to be on the safe side you should probably not use it. Rather I'd use something that has been analyzed (e.g. the key derivation scheme use in TLS version 1.2).