Complete collineations and blowing up determinantal ideals

We study the possible continuation of solutions of a nonlinear parabolic problem after the blow-up time. The nonlinearity in the equation is dissipative and blow-up is caused by the nonlinear boundary condition of the form ju/j = |u| q-1 u, where q > 1 is subcritical in H 1 ( ). If the dissipative t

Let (A; m) be a local noetherian ring with inÿnite residue ÿeld and I an ideal of A. Consider RA(I ) and GA(I ), respectively, the Rees algebra and the associated graded ring of I , and denote by l(I ) the analytic spread of I . Burch's inequality says that l(I )+inf {depth A=I n ; n ≥ 1} ≤ dim(A),

Let (S; m) be a graded algebra of dimension d generated by ÿnitely many elements of degree 1 over a ÿeld k and a homogeneous equimultiple ideal I of S with htI = h ¿ 0: In this paper we will show that if a1 6 a2 6 • • • 6 a h is the degree sequence of a minimal homogeneous reduction of I , then the