Combinatorics on tableaux-like objects and understanding the relationships of various polynomial bases with each other are classical explorations in algebraic combinatorics. This type of exploration is the focus of this dissertation. In the world of symmetric polynomials and their corresponding objects, we prove some partial results for the Schur expansion of Jack polynomials in certain binomial coefficient bases. As a result, we conjecture a bijection between tableaux and rook boards, which spurs some further exploration of quasi-Yamanouchi tableaux as combinatorial objects of their own merit. We then move to the general polynomial ring and two of its bases, key and lock polynomials. These are each generating polynomials of certain kinds o...
With graph polynomials being a fairly new but intricate realm of graph theory, I will begin with a b...
Abstract. This paper uses the theory of dual equivalence graphs to give explicit Schur expansions to...
We state several new combinatorial formulas for the Schubert polynomials. They are generalizations o...
Combinatorics on tableaux-like objects and understanding the relationships of various polynomial bas...
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
Why do so many polynomials that arise naturally in various branches of mathematics and physics have ...
AbstractIn 1977 G. P. Thomas showed that the sequence of Schur polynomials associated to a partition...
Crystals are models for representations of symmetrizable Kac-Moody Lie algebras. They have close con...
AbstractThis paper studies a family of polynomials called key polynomials, introduced by Demazure an...
Abstract: We prove an elegant combinatorial rule for the generation of Schubert polynomials based on...
A. Lascoux and M.-P. Schutzenberger introduced Schubert polynomials to study the cohomology ring of ...
Starting from the existence of the 2-variable polynomial P for oriented links we develop the linear ...
Kohnert polynomials are polynomials indexed by unit cell diagrams in the first quadrant defined earl...
Demazure characters, also known as key polynomials, generalize the classical Schur polynomials. In p...
Schur functions and their q-analogs constitute an interesting branch of combinatorial representation...
With graph polynomials being a fairly new but intricate realm of graph theory, I will begin with a b...
Abstract. This paper uses the theory of dual equivalence graphs to give explicit Schur expansions to...
We state several new combinatorial formulas for the Schubert polynomials. They are generalizations o...
Combinatorics on tableaux-like objects and understanding the relationships of various polynomial bas...
A long-standing theme in algebraic combinatorics is to study bases of the rings of symmetric functio...
Why do so many polynomials that arise naturally in various branches of mathematics and physics have ...
AbstractIn 1977 G. P. Thomas showed that the sequence of Schur polynomials associated to a partition...
Crystals are models for representations of symmetrizable Kac-Moody Lie algebras. They have close con...
AbstractThis paper studies a family of polynomials called key polynomials, introduced by Demazure an...
Abstract: We prove an elegant combinatorial rule for the generation of Schubert polynomials based on...
A. Lascoux and M.-P. Schutzenberger introduced Schubert polynomials to study the cohomology ring of ...
Starting from the existence of the 2-variable polynomial P for oriented links we develop the linear ...
Kohnert polynomials are polynomials indexed by unit cell diagrams in the first quadrant defined earl...
Demazure characters, also known as key polynomials, generalize the classical Schur polynomials. In p...
Schur functions and their q-analogs constitute an interesting branch of combinatorial representation...
With graph polynomials being a fairly new but intricate realm of graph theory, I will begin with a b...
Abstract. This paper uses the theory of dual equivalence graphs to give explicit Schur expansions to...
We state several new combinatorial formulas for the Schubert polynomials. They are generalizations o...