I present a new algorithm for computing binomial coefficients modulo . The proposed method has an preprocessing time, after which a binomial coefficient with can be computed modulo in time. denotes the time complexity of multiplying two -bit numbers, which can range from to or better. Thus, the overall time complexity for evaluating binomial coefficients modulo with is . After preprocessing, we can actually compute binomial coefficients modulo any with . For larger values of and , variations of Lucas’ theorem must be used first in order to reduce the computation to the evaluation of multiple binomial coefficients (or restricted types of factorials ) modulo with
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
In this thesis, Pascal\u27s Triangle modulo n will be explored for n prime and n a prime power. Usin...
International audienceWe present an algorithm that computes the product of two n-bit integers in O(n...
This paper presents algorithmic technique for computing the summation of binomial expansions and geo...
AbstractIf p is a prime and l ≥ 1 then in Theorem 1 it is shown that the multinomial coefficient (m...
AbstractLetnbinary numbers of lengthnbe given. The Boolean function “Multiple Product”MPnasks for (s...
AbstractThe approximate evaluation with a given precision of matrix and polynomial products is perfo...
We present a new algorithm for residue multiplication modulo the Mersenne prime p = 2(521) - 1 based...
This paper presents computing technique for the summation of binomial expansions and geometric serie...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
We analyze the performance of the unary arithmetical algorithm which computes a Möbius transformatio...
An efficient algorithm is presented for computing the k-error linear complexity of a binary sequence...
A new Las Vegas algorithm is presented for the composition of two polynomials modulo a third one, ov...
Fix pairwise coprime positive integers . We propose representing integers modulo , where is any posi...
AbstractA new algorithm to find recurrence relations of binomial sums and a complexity analysis are ...
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
In this thesis, Pascal\u27s Triangle modulo n will be explored for n prime and n a prime power. Usin...
International audienceWe present an algorithm that computes the product of two n-bit integers in O(n...
This paper presents algorithmic technique for computing the summation of binomial expansions and geo...
AbstractIf p is a prime and l ≥ 1 then in Theorem 1 it is shown that the multinomial coefficient (m...
AbstractLetnbinary numbers of lengthnbe given. The Boolean function “Multiple Product”MPnasks for (s...
AbstractThe approximate evaluation with a given precision of matrix and polynomial products is perfo...
We present a new algorithm for residue multiplication modulo the Mersenne prime p = 2(521) - 1 based...
This paper presents computing technique for the summation of binomial expansions and geometric serie...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
We analyze the performance of the unary arithmetical algorithm which computes a Möbius transformatio...
An efficient algorithm is presented for computing the k-error linear complexity of a binary sequence...
A new Las Vegas algorithm is presented for the composition of two polynomials modulo a third one, ov...
Fix pairwise coprime positive integers . We propose representing integers modulo , where is any posi...
AbstractA new algorithm to find recurrence relations of binomial sums and a complexity analysis are ...
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
In this thesis, Pascal\u27s Triangle modulo n will be explored for n prime and n a prime power. Usin...
International audienceWe present an algorithm that computes the product of two n-bit integers in O(n...