In particular, the GK dimension of the polynomial ring Is n.
(Warfield) For any real numberr ≥ 2, there exists a finitely generated algebra whose GK dimension is r.[1]
In the theory of D-Modulesedit
Given a right module M over the Weyl algebra, the Gelfand–Kirillov dimension of M over the Weyl algebra coincides with the dimension of M, which is by definition the degree of the Hilbert polynomial of M. This enables to prove additivity in short exact sequences for the Gelfand–Kirillov dimension and finally to prove Bernstein's inequality, which states that the dimension of M must be at least n. This leads to the definition of holonomic D-modules as those with the minimal dimension n, and these modules play a great role in the geometric Langlands program.
gelfand, kirillov, dimension, algebra, dimension, right, module, over, algebra, gkdim, displaystyle, operatorname, gkdim, limsup, infty, where, supremum, taken, over, finite, dimensional, subspaces, displaystyle, subset, displaystyle, subset, algebra, said, ha. In algebra the Gelfand Kirillov dimension or GK dimension of a right module M over a k algebra A is GKdim sup V M 0 lim sup n log n dim k M 0 V n displaystyle operatorname GKdim sup V M 0 limsup n to infty log n dim k M 0 V n where the supremum is taken over all finite dimensional subspaces V A displaystyle V subset A and M 0 M displaystyle M 0 subset M An algebra is said to have polynomial growth if its Gelfand Kirillov dimension is finite Contents 1 Basic facts 2 In the theory of D Modules 3 References 4 Further readingBasic facts editThe Gelfand Kirillov dimension of a finitely generated commutative algebra A over a field is the Krull dimension of A or equivalently the transcendence degree of the field of fractions of A over the base field In particular the GK dimension of the polynomial ring k x 1 x n displaystyle k x 1 dots x n nbsp Is n Warfield For any real number r 2 there exists a finitely generated algebra whose GK dimension is r 1 In the theory of D Modules editGiven a right module M over the Weyl algebra A n displaystyle A n nbsp the Gelfand Kirillov dimension of M over the Weyl algebra coincides with the dimension of M which is by definition the degree of the Hilbert polynomial of M This enables to prove additivity in short exact sequences for the Gelfand Kirillov dimension and finally to prove Bernstein s inequality which states that the dimension of M must be at least n This leads to the definition of holonomic D modules as those with the minimal dimension n and these modules play a great role in the geometric Langlands program References edit Artin 1999 Theorem VI 2 1 Smith S Paul Zhang James J 1998 A remark on Gelfand Kirillov dimension PDF Proceedings of the American Mathematical Society 126 2 349 352 doi 10 1090 S0002 9939 98 04074 X Coutinho A primer of algebraic D modules Cambridge 1995Further reading editArtin Michael 1999 Noncommutative Rings PDF Chapter VI nbsp This algebra related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Gelfand Kirillov dimension amp oldid 1021878127, wikipedia, wiki, book, books, library,
