Some results on local cohomology of polynomial and formal power series rings: the one dimensional case (Q308116)

In [J. Algebra 399, 770--781 (2014; Zbl 1311.13021)], \textit{L. Núñez-Betancourt}, asked the following question: Let \((R,m,k)\) be a local ring and \(S\) either \(R[X_1,\ldots, X_n]\) or \(R[[X_1,\ldots, X_n]]\). Then is \(H_m^iH_J^j(S)\) \(\Sigma\)-finite for every ideal \(J\subseteq S\) and \(i,j\geq 0\)? In this paper, among many things, the author gives a positive answer to the question when \(\dim(R/J\cap R)\leq 1\).