AbstractAn efficient algorithm is presented for reconstructing a rational number from its residue modulo a given integer. The algorithm is based on a double-digit version of Lehmer's multiprecision extended Euclidean algorithm. While asymptotic complexity remains quadratic in the length of the input, experiments with an implementation show that for small inputs the new algorithm is more than 3 times faster than the algorithm in common use, and is more than 7 times faster for inputs that are 100 words long
AbstractIn residue number systems many arithmetic operations, like addition and multiplication, can ...
AbstractThis paper presents an algorithm for evaluating an arithmetic expression over "big" rational...
Four problems are considered: 1) from an n-precision integer compute its residues modulo n single pr...
AbstractAn efficient algorithm is presented for reconstructing a rational number from its residue mo...
Abstract. We accelerate the known algorithms for computing a selected entry of the extended Euclidea...
Let n/d ∈ Q, m be a positive integer and let u = n/d mod m. Thus u is the image of a rational number...
In this paper we present two efficient methods for reconstructing a rational number from several res...
ABSTRACT The final step of some algebraic algorithms is to reconstruct the common denominator d of a...
Abstract The final step of some algebraic algorithms is to reconstruct the common denominator d of a...
Let F be a field, f, g E F[z] with rn = deg f > deg g > 0. Our problem is to find a rational f...
Despite recent advances in speeding up many arithmetic and algebraic algorithms plus an increased co...
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
AbstractThe mixed-radix representation of a residue number with respect to n moduli can be computed ...
Abs t rac t In this paper, we investigate residue number system (RNS) to deci-lnnl number system con...
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
AbstractIn residue number systems many arithmetic operations, like addition and multiplication, can ...
AbstractThis paper presents an algorithm for evaluating an arithmetic expression over "big" rational...
Four problems are considered: 1) from an n-precision integer compute its residues modulo n single pr...
AbstractAn efficient algorithm is presented for reconstructing a rational number from its residue mo...
Abstract. We accelerate the known algorithms for computing a selected entry of the extended Euclidea...
Let n/d ∈ Q, m be a positive integer and let u = n/d mod m. Thus u is the image of a rational number...
In this paper we present two efficient methods for reconstructing a rational number from several res...
ABSTRACT The final step of some algebraic algorithms is to reconstruct the common denominator d of a...
Abstract The final step of some algebraic algorithms is to reconstruct the common denominator d of a...
Let F be a field, f, g E F[z] with rn = deg f > deg g > 0. Our problem is to find a rational f...
Despite recent advances in speeding up many arithmetic and algebraic algorithms plus an increased co...
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
AbstractThe mixed-radix representation of a residue number with respect to n moduli can be computed ...
Abs t rac t In this paper, we investigate residue number system (RNS) to deci-lnnl number system con...
[[abstract]]To solve the conversion problem in Residue Number System (RNS) with a general moduli set...
AbstractIn residue number systems many arithmetic operations, like addition and multiplication, can ...
AbstractThis paper presents an algorithm for evaluating an arithmetic expression over "big" rational...
Four problems are considered: 1) from an n-precision integer compute its residues modulo n single pr...