Algorithms for Associated Primes, Weyl Closure, and Local Cohomology of D-Modules

Let https://www.w3.org/1998/Math/MathML"> S = K x 1 , … , x n https://s3-euw1-ap-pe-df-pch-content-public-p.s3.eu-west-1.amazonaws.com/9780429175633/5bc16269-a792-4117-a208-ca03c55a3a8d/content/eq4917.tif" xmlns:xlink="https://www.w3.org/1999/xlink"/> be the polynomial ring over a field K of characteristic zero, and let https://www.w3.org/1998/Math/MathML"> D = K x 1 , … , x n , ∂ 1 , … , ∂ n https://s3-euw1-ap-pe-df-pch-content-public-p.s3.eu-west-1.amazonaws.com/9780429175633/5bc16269-a792-4117-a208-ca03c55a3a8d/content/eq4918.tif" xmlns:xlink="https://www.w3.org/1999/xlink"/> be the n-th Wey! algebra over K. If M is a finitely generated D-module, then M is also an S-module and we can consider its associated primes, https://www.w3.org/1998/Math/MathML"> Ass S ( M ) = P ⊂ S prime ideal ∣ P = a n n S ( m ) for some m ∈ M . https://s3-euw1-ap-pe-df-pch-content-public-p.s3.eu-west-1.amazonaws.com/9780429175633/5bc16269-a792-4117-a208-ca03c55a3a8d/content/eq4919.tif" xmlns:xlink="https://www.w3.org/1999/xlink"/>