Z function

Results: 213



#Item
31Efficiency and Pseudo-Randomness of a Variant of Z´emor-Tillich Hash Function (Invited Paper) Christophe Petit Nicolas Veyrat-Charvillon

Efficiency and Pseudo-Randomness of a Variant of Z´emor-Tillich Hash Function (Invited Paper) Christophe Petit Nicolas Veyrat-Charvillon

Add to Reading List

Source URL: www.uclouvain.be

Language: English - Date: 2011-12-14 05:30:34
    32Hard and easy Components of Collision Search in the Z´ emor-Tillich Hash Function: new Attacks and Reduced Variants with Equivalent Security Christophe Petit1? , Jean-Jacques Quisquater1 ,

    Hard and easy Components of Collision Search in the Z´ emor-Tillich Hash Function: new Attacks and Reduced Variants with Equivalent Security Christophe Petit1? , Jean-Jacques Quisquater1 ,

    Add to Reading List

    Source URL: www.uclouvain.be

    Language: English - Date: 2011-12-14 05:30:43
      33Hardware Implementations of a Variant of the Z´ emor-Tillich Hash Function: Can a Provably Secure Hash Function be very efficient ? Giacomo de Meulenaer Christophe Petit and Jean-Jacques Quisquater

      Hardware Implementations of a Variant of the Z´ emor-Tillich Hash Function: Can a Provably Secure Hash Function be very efficient ? Giacomo de Meulenaer Christophe Petit and Jean-Jacques Quisquater

      Add to Reading List

      Source URL: www.uclouvain.be

      Language: English - Date: 2011-12-14 05:30:37
        34A Note on Gaifman’s Condition The purpose of this note is to give a proof of the theorem below related to Gaifman’s Condition (P3) in the definition of a probability function in the context of [1]. Theorem 1 Let z :

        A Note on Gaifman’s Condition The purpose of this note is to give a proof of the theorem below related to Gaifman’s Condition (P3) in the definition of a probability function in the context of [1]. Theorem 1 Let z :

        Add to Reading List

        Source URL: www.maths.manchester.ac.uk

        Language: English - Date: 2013-01-16 11:03:08
          35Functional Method We solve Problem 9.2 in Peskin–Schroeder. (a) We would like to evaluate the partition function Z = tr[e−βH ]

          Functional Method We solve Problem 9.2 in Peskin–Schroeder. (a) We would like to evaluate the partition function Z = tr[e−βH ]

          Add to Reading List

          Source URL: hitoshi.berkeley.edu

          Language: English - Date: 2014-01-31 18:27:02
            36LF100XF Function Decoder 1 The LF100XF is a four-function ultra-thin decoder suitable for all scales from Z-Large Scale. Multiple LF100XFs can be combined

            LF100XF Function Decoder 1 The LF100XF is a four-function ultra-thin decoder suitable for all scales from Z-Large Scale. Multiple LF100XFs can be combined

            Add to Reading List

            Source URL: www.lenzusa.com

            Language: English - Date: 2011-06-24 11:48:27
              37Math 416 Complex variables Solutions to Problem Set 9 1. You can show that the given function is entire by finding the Laurent series of f (z) at z = ±π/2. You can also argue as follows: First we show that the function

              Math 416 Complex variables Solutions to Problem Set 9 1. You can show that the given function is entire by finding the Laurent series of f (z) at z = ±π/2. You can also argue as follows: First we show that the function

              Add to Reading List

              Source URL: www.math.wustl.edu

              Language: English
                38The 69th William Lowell Putnam Mathematical Competition Saturday, December 6, 2008 A–1 Let f : R2 → R be a function such that f (x, y)+ f (y, z)+ f (z, x) = 0 for all real numbers x, y, and z. Prove that there exists

                The 69th William Lowell Putnam Mathematical Competition Saturday, December 6, 2008 A–1 Let f : R2 → R be a function such that f (x, y)+ f (y, z)+ f (z, x) = 0 for all real numbers x, y, and z. Prove that there exists

                Add to Reading List

                Source URL: kskedlaya.org

                Language: English - Date: 2014-01-16 17:23:35
                  39SpringMath 463 Section Complex Variables for Scientists and Engineers Homework #9 - Not due 1. Determine the zeros and their order for the given function (a) f (z) = sin2 z

                  SpringMath 463 Section Complex Variables for Scientists and Engineers Homework #9 - Not due 1. Determine the zeros and their order for the given function (a) f (z) = sin2 z

                  Add to Reading List

                  Source URL: www.cscamm.umd.edu

                  - Date: 2011-04-14 13:19:54
                    40Jordan Journal of Mathematics and Statistics (JJMS) 7(2), 2014, ppMONOTONIC ANALYSIS: SOME RESULTS OF INCREASING AND POSITIVELY HOMOGENEOUS FUNCTIONS H.MAZAHERI(1) AND Z. GOLINEJAD

                    Jordan Journal of Mathematics and Statistics (JJMS) 7(2), 2014, ppMONOTONIC ANALYSIS: SOME RESULTS OF INCREASING AND POSITIVELY HOMOGENEOUS FUNCTIONS H.MAZAHERI(1) AND Z. GOLINEJAD

                    Add to Reading List

                    Source URL: journals.yu.edu.jo

                    Language: English - Date: 2014-08-14 04:29:40