Lie Theory

 Lie theory, developed initially by Sophus Lie and worked out by Wilhelm Killing and Élie Cartan, is one of the areas of mathematics. The basis of Lie theory is the exponential map that relates Lie algebras to Lie groups, which is called algebra correspondence Lie group. Lie theory is a topical research and development area. This advanced area of research centres on the principle of lie and its implementation. The Generalized Lie Theory and Applications Review is one of the world's best articles on lie theory. It is committed to delivering the most thrilling work on the principle of deception. Lie Theory Review is an interdisciplinary publication addressing the key ideas and study relevant to Deception. Journal of Lie Theory is a journal designed to publish information quickly in the following areas: Say algebras, algebraic groups and groupoids, and similar topological forms groups like compact and compact groupings locally. Applications of abstract representation, differential calculus, numerical control theory, descriptive, homogeneous harmonic analysis. It also includes fields, symmetrical fields, theoretical mechanics, and quantum classes. The foundation of Lie theory is the exponential map relating Lie algebras to Lie groups which is called algebra correspondence Lie group – Lie algebra. As Lie groups are differentiable manifolds, the subject is part of differential geometry.