-----BEGIN PGP SIGNED MESSAGE----- Hash: SHA1 SHORT PACKAGE INFO Name: ntl-5.4-5 Summary:High-performance algorithms for vectors, matrices, and polynomials Group: System Environment/Libraries CHANGELOG (recent): * Mon Dec 18 2006 Rex Dieter 5.4-5 - - -devel -> -static * Mon Aug 28 2006 Rex Dieter 5.4-4 - - fc6 respin * Tue Jul 25 2006 Rex Dieter 5.4-3 - - fc6 respin * Tue Apr 11 2006 Rex Dieter 5.4-2 - - Capitalize %summary REQUIRES (short list): gmp-devel MD5SUM: 8eb8f05cd0238eb8203f53f14a45a2cf ntl-5.4-5.src.rpm FULL PACKAGE INFO: Name : ntl Relocations: (not relocatable) Version : 5.4 Vendor: The KDE-RedHat Project Release : 5 Build Date: Tue 02 Jan 2007 07:53:16 AM CST Install Date: (not installed) Build Host: math.unl.edu Group : System Environment/Libraries Source RPM: (none) Size : 685049 License: GPL Packager : kde-redhat Developers URL : http://shoup.net/ntl/ Summary : High-performance algorithms for vectors, matrices, and polynomials Description : NTL is a high-performance, portable C++ library providing data structures and algorithms for arbitrary length integers; for vectors, matrices, and polynomials over the integers and over finite fields; and for arbitrary precision floating point arithmetic. NTL provides high quality implementations of state-of-the-art algorithms for: * arbitrary length integer arithmetic and arbitrary precision floating point arithmetic; * polynomial arithmetic over the integers and finite fields including basic arithmetic, polynomial factorization, irreducibility testing, computation of minimal polynomials, traces, norms, and more; * lattice basis reduction, including very robust and fast implementations of Schnorr-Euchner, block Korkin-Zolotarev reduction, and the new Schnorr-Horner pruning heuristic for block Korkin-Zolotarev; * basic linear algebra over the integers, finite fields, and arbitrary precision floating point numbers. -----BEGIN PGP SIGNATURE----- Version: GnuPG v1.2.6 (GNU/Linux) iD8DBQFFmmPV7+R4DP9jgvoRAlyzAJ94XXpW2++3y9qAJWTARQjOOiYHlACfdLOy BWc8sik/IFdjsrqJYydKUpI= =rHdj -----END PGP SIGNATURE-----