@electronic{www.graviton.de,
   title       = {Elliptische Kurven  und ihre  Anwendung in der  Verschlüsselung}, 
   url         = {http://www.graviton.de/ai/algoan/referate/elliptische%20kurven.pdf},
   biburl      = {https://puma.uni-kassel.de/url/ad8349bdcebad5a429308b9d7f3b620e/seboettg},
   keywords    = {elliptische_kurven krypto verschlüsselung},
   added-at    = {2013-07-15T18:54:44.000+0200},
   description = {},
   interhash   = {ad8349bdcebad5a429308b9d7f3b620e}, 
   intrahash   = {ad8349bdcebad5a429308b9d7f3b620e}
}

@electronic{www.cs.uni-potsdam.de,
   title       = {Elliptische Kurven in der Kryptographie}, 
   url         = {http://www.cs.uni-potsdam.de/ti/lehre/05-Kryptographie/slides/Elliptische_Kurven.pdf},
   biburl      = {https://puma.uni-kassel.de/url/4eb9d4a84dc6e72b2958f53260108623/seboettg},
   keywords    = {eliptische_kurven krypto mathe},
   added-at    = {2013-07-01T13:53:46.000+0200},
   description = {},
   interhash   = {4eb9d4a84dc6e72b2958f53260108623}, 
   intrahash   = {4eb9d4a84dc6e72b2958f53260108623}
}

@electronic{github.com,
   title       = {eduardolundgren/rsa-prime-factorization · GitHub}, 
   url         = {https://github.com/eduardolundgren/rsa-prime-factorization/tree/master/src},
   biburl      = {https://puma.uni-kassel.de/url/767d1bfcffec38575309e023d3eb9280/seboettg},
   keywords    = {fermat krypto prim rsa},
   added-at    = {2013-06-10T19:23:25.000+0200},
   description = {rsa-prime-factorization - Prime factorization is known as a way to crack the RSA cryptosystem code. Currently, most of the best modern factoring algorithms are based on the idea behind Fermat's method of factorization. This project explain how to use Fermat's method to find the prime factorization of a number.},
   interhash   = {767d1bfcffec38575309e023d3eb9280}, 
   intrahash   = {767d1bfcffec38575309e023d3eb9280}
}