On the finiteness of differential invariants

Let G be a reductive complex algebraic group and V a finite-dimensional G-module. be restriction, where D(O(V ) G ) denotes the differential operators on O(V ) G . Much attention of late has been given to the study of Im ρ and Ker ρ. Less well studied are properties of B itself. For example: • Wha

Let R be a prime ring with extended centroid C and let φ X j i be a reduced differential polynomial with coefficients in Q , the symmetric Martindale quotient ring of R, and with zero constant term. We prove that the finiteness of A φ and the finite-dimensionality of the C-span of A φ are equivalen

Rank invariants of multidimensional persistent homology groups are a parameterized version of Betti numbers of a space multi-filtered by a continuous vector-valued function. In this note we give a sufficient condition for their finiteness. This condition is sharp for spaces embeddable in R n .

In Part I of this paper [G.W. Schwarz, Finite-dimensional representations of invariant differential operators, J. Algebra 258 (2002) 160-204] we considered the representation theory of the algebra B := D(g) G , where G = SL 3 (C) and D(g) G denotes the algebra of G-invariant polynomial differential