Math 306, Spring 2012 Homework 1 Solutions
Math 306, Spring 2012 Homework 1 Solutions

Unit 9: Family Letter - Everyday Mathematics
Unit 9: Family Letter - Everyday Mathematics

Precalculus Module 3, Topic A, Lesson 1: Student
Precalculus Module 3, Topic A, Lesson 1: Student

Congruences
Congruences

... (63468-2940) mod 1261 is tested the result is zero and therefore the result is uninteresting. The next combination that is found is when x = 36*41*44 and y = 2*3^2*5^2*7 which is also uninteresting. Luckily, the following combination, x = (44*46*49) and y = (2*3^3*5^2*19) is interesting. (Note: If t ...
TOPIC
TOPIC

GCD of Many Integers
GCD of Many Integers

Speeding Up HMM Decoding and Training by Exploiting Sequence
Speeding Up HMM Decoding and Training by Exploiting Sequence

... Observation 2. Words that appear as a prefix of at least k LZ-words are represented by trie nodes whose subtrees contain at least k nodes. In the previous case it was straightforward to transform X into X 0 , since each phrase p in the parsed sequence corresponded to a good substring. Now, however, ...
COMMUTATIVE ALGEBRA – PROBLEM SET 2 X A T ⊂ X
COMMUTATIVE ALGEBRA ā€“ PROBLEM SET 2 X A T āŠ‚ X

WHAT IS THE NEXT NUMBER IN THIS SEQUENCE?
WHAT IS THE NEXT NUMBER IN THIS SEQUENCE?

Computer-Generated Proofs of Mathematical Theorems
Computer-Generated Proofs of Mathematical Theorems

Elementary Number Theory
Elementary Number Theory

DiscreteTom2014
DiscreteTom2014

MATH882201 – Problem Set I (1) Let I be a directed set and {G i}i∈I
MATH882201 ā€“ Problem Set I (1) Let I be a directed set and {G i}iāˆˆI

The Fundamental Theorem of Algebra
The Fundamental Theorem of Algebra

Review of Basic Algebra Skills
Review of Basic Algebra Skills

MATH 2320. Problem set 1.
MATH 2320. Problem set 1.

Full text
Full text

In this chapter, you will be able to
In this chapter, you will be able to

File
File

Here`s a handout - Bryn Mawr College
Here`s a handout - Bryn Mawr College

Unit 4 Lesson 1 Day 5
Unit 4 Lesson 1 Day 5

The algorithmic and dialectic aspects in proof and proving
The algorithmic and dialectic aspects in proof and proving

What We Need to Know about Rings and Modules
What We Need to Know about Rings and Modules

On the Sum of Square Roots of Polynomials and Related Problems
On the Sum of Square Roots of Polynomials and Related Problems

Adding and Subtracting Polynomials - MELT-Institute
Adding and Subtracting Polynomials - MELT-Institute

Factorization of polynomials over finite fields

In mathematics and computer algebra the factorization of a polynomial consists of decomposing it into a product of irreducible factors. This decomposition is theoretically possible and is unique for polynomials with coefficients in any field, but rather strong restrictions on the field of the coefficients are needed to allow the computation of the factorization by means of an algorithm. In practice, algorithms have been designed only for polynomials with coefficients in a finite field, in the field of rationals or in a finitely generated field extension of one of them.The case of the factorization of univariate polynomials over a finite field, which is the subject of this article, is especially important, because all the algorithms (including the case of multivariate polynomials over the rational numbers), which are sufficiently efficient to be implemented, reduce the problem to this case (see Polynomial factorization). It is also interesting for various applications of finite fields, such as coding theory (cyclic redundancy codes and BCH codes), cryptography (public key cryptography by the means of elliptic curves), and computational number theory.As the reduction of the factorization of multivariate polynomials to that of univariate polynomials does not have any specificity in the case of coefficients in a finite field, only polynomials with one variable are considered in this article.