RSA and Discrete Logs Crumble A Bit More!
A while back a number of RSA challenges were created, such as for RSA-240 (and which has 240 decimal digits — 795 bits) [here]:
But this week it was broken with:
RSA-240 = 12462036678171878406583504460810659043482037465167880575481878888328 966680118821085503603957027250874750986476843845862105486553797025393057189121 768431828636284694840530161441643046806687569941524699318570418303051254959437 1372159029236099 = 509435952285839914555051023580843714132648382024111473186660296521821206469746 700620316443478873837606252372049619334517 times 244624208838318150567813139024002896653802092578931401452041221336558477095178 155258218897735030590669041302045908071447
This means that anything encrypted with anything less than 1,024 bits in RSA is in danger of being cracked. The new crack advances the state-of-the-art from 768 bits (cracked in December 2009) to 795 bits. The great advancement with his crack is that the researchers also broken a 795-bit discrete log problem, too. This is the first time that both the integer factorization of RSA and the discrete log problem (DLP) has been cracked together, and using the same hardware and software (CADO-NFS software…