AbstractThe m-ary method for computing xE partitions the bits of the integer E into words of constant length, and then performs as many multiplications as there are nonzero words. Variable length partitioning strategies have been suggested to reduce the number of nonzero words, and thus, the total number of multiplications. Algorithms for exponentiation using such partitioning strategies are termed sliding window techniques. In this paper, we give algorithmic descriptions of two recently proposed sliding window techniques, and calculate the average number of multiplications by modeling the partitioning process as a Markov chain. We tabulate the optimal values of the partitioning parameters, and show that the sliding window algorithms requir...
Abstract. This paper extends results concerning efficient exponentiation in groups where inversion i...
The most common method for computing exponentiation of random elements in Abelian groups are slidin...
It is well known that constant-time implementations of modular exponentiation cannot use sliding win...
AbstractThe m-ary method for computing xE partitions the bits of the integer E into words of constan...
AbstractThe variable length nonzero window method is a way of computing exponentiation and modular e...
AbstractThe canonical bit recoding technique can be used to reduce the average number of multiplicat...
We present the 2k-ary and the sliding window algorithms for fast exponentiation. We give a precise f...
Cryptography via public key cryptosystems (PKC) has been widely used for providing services such as ...
The canonical re-coding and sliding window techniques are often used in computation of scalar multip...
Abstract. This paper describes methods of recoding exponents to allow for regular implementations of...
Multiplication is one of the basic operations that influence the performance of many computer applic...
The results of this paper are superceded by the paper at: http://arxiv.org/abs/1309.3690. We conside...
We consider the problem of minimizing the number of multiplications in computing f(x)=x n , where n ...
Abstract. We present improvements to algorithms for efficient expo-nentiation. The fractional window...
It is well known that constant-time implementations of modular exponentiation cannot use sliding win...
Abstract. This paper extends results concerning efficient exponentiation in groups where inversion i...
The most common method for computing exponentiation of random elements in Abelian groups are slidin...
It is well known that constant-time implementations of modular exponentiation cannot use sliding win...
AbstractThe m-ary method for computing xE partitions the bits of the integer E into words of constan...
AbstractThe variable length nonzero window method is a way of computing exponentiation and modular e...
AbstractThe canonical bit recoding technique can be used to reduce the average number of multiplicat...
We present the 2k-ary and the sliding window algorithms for fast exponentiation. We give a precise f...
Cryptography via public key cryptosystems (PKC) has been widely used for providing services such as ...
The canonical re-coding and sliding window techniques are often used in computation of scalar multip...
Abstract. This paper describes methods of recoding exponents to allow for regular implementations of...
Multiplication is one of the basic operations that influence the performance of many computer applic...
The results of this paper are superceded by the paper at: http://arxiv.org/abs/1309.3690. We conside...
We consider the problem of minimizing the number of multiplications in computing f(x)=x n , where n ...
Abstract. We present improvements to algorithms for efficient expo-nentiation. The fractional window...
It is well known that constant-time implementations of modular exponentiation cannot use sliding win...
Abstract. This paper extends results concerning efficient exponentiation in groups where inversion i...
The most common method for computing exponentiation of random elements in Abelian groups are slidin...
It is well known that constant-time implementations of modular exponentiation cannot use sliding win...