Generalizing the notion of Koszul algebra

Let K be a skew field and A = K @ A1 @ . . . a graded Kalgebra (both of them not necessarily commutative). We call A homogeneous (or standard) if it is generated by Al as a Kalgebra. A homogeneous Kalgebra A is Koszul if there exists a linear free resolution of the residue field K Y A/A+ as an A-mo

Vose, M.D., Generalizing the notion of schema in genetic algorithms (Research Note), Artificial Intelligence 50 (1991) 385-396. In this paper we examine some of the fundamental assumptions which are frequently used to explain the practical success which Genetic Algorithms (GAs) have enjoyed. Specifi

We show that diagonal subalgebras and generalized Veronese subrings of a bigraded Koszul algebra are Koszul. We give upper bounds for the regularity of side-diagonal and relative Veronese modules and apply the results to symmetric algebras and Rees rings. Recall that a positively graded K-algebra A