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Date: 2015-11-22 02:25:26 Cryptography Schnorr signature Random oracle Optimal asymmetric encryption padding Cryptographic hash function Digital signature Oracle machine Hash function Oracle Database Padding		Microsoft PowerPoint - NPROM-zhang.pptx Add to Reading List Source URL: security-lab.jaist.ac.jp Download Document from Source Website File Size: 747,50 KB Share Document on Facebook

	Microsoft PowerPoint - NPROM-zhang.pptx DocID: 1pGwl - View Document
	Schnorr signature: Public parameters: g which is a generator of Gq, p which is a safe prime, and q. To sign, we have a function S = Sigx(m, r). x is the secret key. m is the message being signed. r is a random factor. Ke DocID: 1n44k - View Document
	THE RANDOM ORACLE MODEL: A TWENTY-YEAR RETROSPECTIVE NEAL KOBLITZ AND ALFRED J. MENEZES Abstract. It has been roughly two decades since the random oracle model for reductionist security arguments was introduced and one d DocID: 1gs9P - View Document
	Proceedings of Selected Areas in Cryptography ’98 (August 17–18, 1998, Kingston, Ontario, Canada) S. Tavares and H. Meijer Eds. Springer-Verlag, LNCS 1556, pages 72–80. Computational Alternatives to Random Number G DocID: 19Nay - View Document
	Hash Function Requirements for Schnorr Signatures Gregory Neven1,2 , Nigel P. Smart3 , and Bogdan Warinschi3 1 IBM Research – Zurich, Switzerland DocID: 19LBC - View Document