Add to ORKGPromotion and rowmotion are intriguing actions in dynamical algebraic combinatorics which have inspired much work in recent years. In this paper, we study $P$-strict labelings of a finite, graded poset $P$ of rank $n$ and labels at most $q$, which generalize semistandard Young tableaux with $n$ rows and entries at most $q$, under promotion. These $P$-strict labelings are in equivariant bijection with $Q$-partitions under rowmotion, where $Q$ equals the product of $P$ and a chain of $q-n-1$ elements. We study the case where $P$ equals the product of chains in detail, yielding new homomesy and order results in the realm of tableaux and beyond. Furthermore, we apply the bijection to the cases in which $P$ is a minuscule poset and when $P$ is t...
We study a birational map associated to any finite poset P. This map is a far-reaching generalizatio...
Consider a plane partition $P$ as an order ideal in the product $[a] \times [b] \times [c]$ of thre...
Consider a plane partition $P$ as an order ideal in the product $[a] \times [b] \times [c]$ of thre...
We define \(P\)-strict labelings for a finite poset \(P\) as a generalization of semistandard Young ...
We define \(P\)-strict labelings for a finite poset \(P\) as a generalization of semistandard Young ...
In this talk, we introduce Dynamical Algebraic Combinatorics by investigating ever more general doma...
We present an equivariant bijection between two actions—promotion and rowmotion—on order ideals in c...
We describe a correspondence between a family of labelled partially ordered sets and semi-standard Y...
Let \(P\) be a graded poset of rank \(r\) and let \(\mathbf{c}\) be a \(c\)-element chain. A plane p...
We describe a correspondence between a family of labelled partially ordered sets and semi-standard Y...
Let \(P\) be a graded poset of rank \(r\) and let \(\mathbf{c}\) be a \(c\)-element chain. A plane p...
We study a birational map associated to any finite poset P. This map is a far-reaching generalizatio...
Let $P$ be a graded poset of rank $r$ and let $\mathbf{c}$ be a $c$-element chain. For an order idea...
Various authors have studied a natural operation (under various names) on the order ideals (equivale...
AbstractWe describe a correspondence between a family of labelled partially ordered sets and semista...
We study a birational map associated to any finite poset P. This map is a far-reaching generalizatio...
Consider a plane partition $P$ as an order ideal in the product $[a] \times [b] \times [c]$ of thre...
Consider a plane partition $P$ as an order ideal in the product $[a] \times [b] \times [c]$ of thre...
We define \(P\)-strict labelings for a finite poset \(P\) as a generalization of semistandard Young ...
We define \(P\)-strict labelings for a finite poset \(P\) as a generalization of semistandard Young ...
In this talk, we introduce Dynamical Algebraic Combinatorics by investigating ever more general doma...
We present an equivariant bijection between two actions—promotion and rowmotion—on order ideals in c...
We describe a correspondence between a family of labelled partially ordered sets and semi-standard Y...
Let \(P\) be a graded poset of rank \(r\) and let \(\mathbf{c}\) be a \(c\)-element chain. A plane p...
We describe a correspondence between a family of labelled partially ordered sets and semi-standard Y...
Let \(P\) be a graded poset of rank \(r\) and let \(\mathbf{c}\) be a \(c\)-element chain. A plane p...
We study a birational map associated to any finite poset P. This map is a far-reaching generalizatio...
Let $P$ be a graded poset of rank $r$ and let $\mathbf{c}$ be a $c$-element chain. For an order idea...
Various authors have studied a natural operation (under various names) on the order ideals (equivale...
AbstractWe describe a correspondence between a family of labelled partially ordered sets and semista...
We study a birational map associated to any finite poset P. This map is a far-reaching generalizatio...
Consider a plane partition $P$ as an order ideal in the product $[a] \times [b] \times [c]$ of thre...
Consider a plane partition $P$ as an order ideal in the product $[a] \times [b] \times [c]$ of thre...