Macaulay posets are posets for which there is an analogue of the classical Kruskal-Katona theorem for finite sets. These posets are of great importance in many branches of combinatorics and have numerous applications. We survey mostly new and also some old results on Macaulay posets, where the intention is to present them as pieces of a general theory. In particular, the classical examples of Macaulay posets are included as well as new ones. Emphasis is also put on the construction of Macaulay posets, and their relations to other discrete optimization problems
AbstractThe generalized Macaulay theorem is extended slightly to a form convenient for dealing with ...
We consider the shadow minimization problem (SMP) for cartesian powers P n of a Macaulay poset P ....
We present an analog of the well-known Kruskal-Katona theorem for the poset of subspaces of PG (n; 2...
Macaulay posets are posets for which there is an analogue of the classical Kruskal-Katona theorem fo...
We develop a new approach for establishing the Macaulayness of posets representable as cartesian pow...
We develop a new approach for establishing the Macaulayness of posets representable as cartesian pow...
AbstractWe develop a new approach for establishing the Macaulayness of posets representable as carte...
AbstractLet Q(k, l) be a poset whose Hasse diagram is a regular spider with k+1 legs having the same...
Let Q(k, l) be a poset whose Hasse diagram is a regular spider with k+1 legs having the same length ...
If P is an upper semilattice whose Hasse diagram is a tree and whose cartesian powers are Macaulay, ...
AbstractIt is a well known fact that a supersolvable lattice is EL-shellable. Hence a supersolvable ...
International audienceWe present here a family of posets which generalizes both partition and pointe...
We introduce some equivalence relations on graphs and posets and prove that they are closed under th...
AbstractIfPis an upper semilattice whose Hasse diagram is a tree and whose cartesian powers are Maca...
AbstractThe initial point of this paper are two Kruskal–Katona type theorems. The first is the Color...
AbstractThe generalized Macaulay theorem is extended slightly to a form convenient for dealing with ...
We consider the shadow minimization problem (SMP) for cartesian powers P n of a Macaulay poset P ....
We present an analog of the well-known Kruskal-Katona theorem for the poset of subspaces of PG (n; 2...
Macaulay posets are posets for which there is an analogue of the classical Kruskal-Katona theorem fo...
We develop a new approach for establishing the Macaulayness of posets representable as cartesian pow...
We develop a new approach for establishing the Macaulayness of posets representable as cartesian pow...
AbstractWe develop a new approach for establishing the Macaulayness of posets representable as carte...
AbstractLet Q(k, l) be a poset whose Hasse diagram is a regular spider with k+1 legs having the same...
Let Q(k, l) be a poset whose Hasse diagram is a regular spider with k+1 legs having the same length ...
If P is an upper semilattice whose Hasse diagram is a tree and whose cartesian powers are Macaulay, ...
AbstractIt is a well known fact that a supersolvable lattice is EL-shellable. Hence a supersolvable ...
International audienceWe present here a family of posets which generalizes both partition and pointe...
We introduce some equivalence relations on graphs and posets and prove that they are closed under th...
AbstractIfPis an upper semilattice whose Hasse diagram is a tree and whose cartesian powers are Maca...
AbstractThe initial point of this paper are two Kruskal–Katona type theorems. The first is the Color...
AbstractThe generalized Macaulay theorem is extended slightly to a form convenient for dealing with ...
We consider the shadow minimization problem (SMP) for cartesian powers P n of a Macaulay poset P ....
We present an analog of the well-known Kruskal-Katona theorem for the poset of subspaces of PG (n; 2...