Add to ORKGThree different algorithms are described for the conversion of Hensel codes to Farey rationals. The first algorithm is based on the trial and error factorization of the weight of a Hensel code, inversion and range test. The second algorithm is deterministic and uses a pair of different p-adic systems for simultaneous computation; from the resulting weights of the two different Hensel codes of the same rational, two equivalence classes of rationals are generated using the respective primitive roots. The intersection of these two equivalence classes uniquely identifies the rational. Both the above algorithms are exponential (in time and/or space).\u
Despite recent advances in speeding up many arithmetic and algebraic algorithms plus an increased co...
In most homomorphic encryption schemes based on RLWE, native plaintexts are represented as polynomia...
AbstractWe present an approach to computing the Darboux polynomials required in the Prelle–Singer al...
Three different algorithms are described for the conversion of Hensel codes to Farey rationals. The ...
Three different algorithms are described for the conversion of Hensel codes to Farey rationals. The ...
AbstractIn a finite segment p-adic number system one of the difficult problems is concerned with con...
The order-N Farey fractions, where N is the largest integer satisfying N<= ˆ(p-1)/2, can be mapp...
A unique code (called Hensel's code) is derived for a rational number by truncating its infinite p-a...
A fractional weighted number system, based on Hensel's p-adic number system, is proposed for constru...
A fast iterative scheme based on the Newton method is described for finding the reciprocal of a fini...
An error-free carry-free (parallel) rational arithmetic system based on residue and p-adic represent...
this paper a detailed analysis of this degree setting is given. It turns out that the situation for ...
International audienceThis paper presents an algorithmic improvement to Sudan's list-decoding algori...
The research group CCSG (Combinatorics, Coding and Security Group) is one of the research groups in ...
180 pagesNew numerical methods using rational functions are presented for applications in linear alg...
Despite recent advances in speeding up many arithmetic and algebraic algorithms plus an increased co...
In most homomorphic encryption schemes based on RLWE, native plaintexts are represented as polynomia...
AbstractWe present an approach to computing the Darboux polynomials required in the Prelle–Singer al...
Three different algorithms are described for the conversion of Hensel codes to Farey rationals. The ...
Three different algorithms are described for the conversion of Hensel codes to Farey rationals. The ...
AbstractIn a finite segment p-adic number system one of the difficult problems is concerned with con...
The order-N Farey fractions, where N is the largest integer satisfying N<= ˆ(p-1)/2, can be mapp...
A unique code (called Hensel's code) is derived for a rational number by truncating its infinite p-a...
A fractional weighted number system, based on Hensel's p-adic number system, is proposed for constru...
A fast iterative scheme based on the Newton method is described for finding the reciprocal of a fini...
An error-free carry-free (parallel) rational arithmetic system based on residue and p-adic represent...
this paper a detailed analysis of this degree setting is given. It turns out that the situation for ...
International audienceThis paper presents an algorithmic improvement to Sudan's list-decoding algori...
The research group CCSG (Combinatorics, Coding and Security Group) is one of the research groups in ...
180 pagesNew numerical methods using rational functions are presented for applications in linear alg...
Despite recent advances in speeding up many arithmetic and algebraic algorithms plus an increased co...
In most homomorphic encryption schemes based on RLWE, native plaintexts are represented as polynomia...
AbstractWe present an approach to computing the Darboux polynomials required in the Prelle–Singer al...