<--- Back to Details
First PageDocument Content
Mathematics / Algebra / Abstract algebra / Multiplication / Polynomials / ToomCook multiplication / NTRUEncrypt / Multiplication algorithm / Karatsuba algorithm / Division algorithm / Resultant / XTR
Date: 2018-10-22 05:36:47
Mathematics
Algebra
Abstract algebra
Multiplication
Polynomials
ToomCook multiplication
NTRUEncrypt
Multiplication algorithm
Karatsuba algorithm
Division algorithm
Resultant
XTR

Faster multiplication in Z2m[x] on Cortex-M4 to speed up NIST PQC candidates

Add to Reading List

Source URL: cryptojedi.org

Download Document from Source Website

File Size: 725,43 KB

Share Document on Facebook

Similar Documents

Faster multiplication in Z2m[x] on Cortex-M4 to speed up NIST PQC candidates

Faster multiplication in Z2m[x] on Cortex-M4 to speed up NIST PQC candidates

DocID: 1xVVg - View Document

Faster multiplication in Z2m[x] on Cortex-M4 to speed up NIST PQC candidates

Faster multiplication in Z2m[x] on Cortex-M4 to speed up NIST PQC candidates

DocID: 1xVgU - View Document

COSC 544 Probabilistic Proof SystemsAn Optimal Interactive Proof for Matrix Multiplication Lecturer: Justin Thaler

COSC 544 Probabilistic Proof SystemsAn Optimal Interactive Proof for Matrix Multiplication Lecturer: Justin Thaler

DocID: 1xUI5 - View Document

Optimization Techniques for Small Matrix Multiplication ´ Charles-Eric Drevet ´

Optimization Techniques for Small Matrix Multiplication ´ Charles-Eric Drevet ´

DocID: 1vrNt - View Document

Contemporary Mathematics The geometry of efficient arithmetic on elliptic curves David Kohel Abstract. The arithmetic of elliptic curves, namely polynomial addition and scalar multiplication, can be described in terms o

Contemporary Mathematics The geometry of efficient arithmetic on elliptic curves David Kohel Abstract. The arithmetic of elliptic curves, namely polynomial addition and scalar multiplication, can be described in terms o

DocID: 1vqo7 - View Document