Differential Gröbner bases in one variable and in the partial case

We give an account of the theory of Gröbner bases for Clifford and Grassmann algebras, both important in physical applications. We describe a characterization criterion tailored to these algebras which is significantly simpler than those given earlier or for more general non-commuting algebras. Our

If K is a field, let the ring R consist of finite sums of homogeneous elements in Then, R contains M, the free semi-group on the countable set of variables {x 1 , x 2 , x 3 , . . .}. In this paper, we generalize the notion of admissible order from finitely generated sub-monoids of M to M itself; as

Let P K (n, d) be the set of polynomials in n variables of degree at most d over the field K of characteristic zero. We show that there is a number c n,d such that if f ∈ P K (n, d) then the algebraic de Rham cohomology group H i dR (K n \Var( f )) has rank at most c n,d . We also show the existence