<> <> Effective Genericity, Delta-Regularity and Strong Noether Position <> Communications in Algebra <> 40 (2012) 3933-3949 <> www.tandfonline.com/toc/lagb20/current <> doi.org/10.1080/00927872.2011.599354 <> It is shown that the concept of strong Noether position for a polynomial ideal recently introduced by Hashemi is equivalent to delta-regularity and thus related to Pommaret bases. In particular, I provide explicit Pommaret bases for two of the ideal sequences used by him for the definition of strong Noether position and alternative proofs for a number of his statements. Finally, I show that one consequence of delta-regularity is that any Pommaret basis contains a system of parameters and I present an algorithm for checking whether the factor ring is Gorenstein via a socle computation. <> journals <> pdf <> 2011 <> involutive basis, delta-regularity <> computer algebra <>