Locally Compact Abelian Group
Each vector in this sequence is 1/5 the preceding vector. The fact that there is an infinite sequence of vectors determines the shape of the group.
Compact as used in politics may refer broadly to a pact or treaty; in more specific cases it may refer to: Interstate compact; Compact government, a type of colonial
Mathematics Projects Overview. Mathematics is the logical study of abstract structures and relationships. Math Projects. Elementary. Algebraic equations.
My name is Daniel Murfet, I am a Lecturer (aka tenure-track Assistant Professor) in the Mathematics Department at the University of Melbourne. My CV is here and you
In group theory, a simple Lie group is a connected locally compact non-abelian Lie group G which does not have nontrivial connected normal subgroups.
Port Manteaux churns out silly new words when you feed it an idea or two. Enter a word (or two) above and you’ll get back a bunch of portmanteaux created by jamming
Oxide electronic materials provide a plethora of possible applications and offer ample opportunity for scientists to probe into some of the exciting and intriguing
Geometric Langlands Seminar. This is an archive of email messages concerning the Geometric Langlands Seminar for 2012-13.
2017/704 ( PDF) A Key Backup Scheme Based on Bitcoin Zhongxiang Zheng and Chunhuan Zhao and Haining Fan and Xiaoyun Wang 2017/703 ( PDF)
In mathematics, a Lie group / ˈ l iː / is a group that is also a differentiable manifold, with the property that the group operations are compatible with the smooth