constructive-algebra-0.1.2: A library of constructive algebra.



Specification of principal localization matrices used in the coherence proof of Prufer domains.



propPLM :: (CommutativeRing a, Eq a) => Ideal a -> Matrix a -> BoolSource

A principal localization matrix for an ideal (x1,...,xn) is a matrix such that:

  • The sum of the diagonal should equal 1.
  • For all i, j, l in {1..n}: a_lj * x_i = a_li * x_j

computePLM_B :: (BezoutDomain a, Eq a) => Ideal a -> Matrix aSource

Principal localization matrices for ideals are computable in Bezout domains.