ECE CS498: Applied Cryptography Instructor: Andrew Miller, TA: Kevin Liao Lecture 1: Group Theory 1 - Cryptography - Document - PDFSEARCH.IO

First Page		Document Content
Algebra Abstract algebra Group theory Mathematics Coset Group Subgroup Discrete logarithm Finite field Generating set of a group Modular arithmetic Field		ECE/CS498: Applied Cryptography Instructor: Andrew Miller, TA: Kevin Liao Lecture 1: Group Theory 1 Add to Reading List Source URL: gitlab-beta.engr.illinois.edu Download Document from Source Website File Size: 168,17 KB Share Document on Facebook

$Continued fractions and number systems: applications to correctly-rounded implementations of elementary functions and modular arithmetic. Mourad Gouicem PEQUAN Team, LIP6/UPMC$	Continued fractions and number systems: applications to correctly-rounded implementations of elementary functions and modular arithmetic. Mourad Gouicem PEQUAN Team, LIP6/UPMC DocID: 1uA3L - View Document
	Galois representations associated to modular forms Johan BosmanThese are notes from a talk given at an intercity seminar arithmetic geometry. The main reference is [1], where more details and further referenc DocID: 1uy0a - View Document
	SPECIAL SECTION ON DESIGN OF CIRCUITS AND INTEGRATED SYSTEMS Improving residue number system multiplication with more balanced moduli sets and enhanced modular arithmetic structures R. Chaves and L. Sousa DocID: 1u5nt - View Document
	Arithmetic and Diophantine Geometry 14Gxx [1] Matthew H. Baker, Enrique Gonz´alez-Jim´enez, Josep Gonz´alez, and Bjorn Poonen, Finiteness results for modular curves of genus at least 2, Amer. J. Math), no. DocID: 1u3w4 - View Document
	MODULAR ARITHMETIC 5 minute review. Remind students what addition and multiplication mod m means and the notation they saw in Semester 1, e.g. 3 + 4 ≡ 2 (mod 5) and 3 × 3 ≡ 4 (mod 5). Introduce Zm = {0, 1, . . . , DocID: 1tE3z - View Document