Closed polynomials and their applications for computations of kernels of monomial derivations

Abstract

In this paper, we give some results on closed polynomials and factorially closed polynomial in n variables. In particular, we give a characterization of factorially closed polynomials in n variables over an algebraically closed field for any characteristic. Furthermore, as an application of results on closed polynomials, we determine kernels of non-zero monomial derivations on the polynomial ring in two variables over a UFD. Finally, by using this result, for a field k, we determine the non-zero monomial derivations D on k[x,y] such that the quotient field of the kernel of D is not equal to the kernel of D in k(x,y).