Add to ORKGWe will explore the combinatorial and geometric properties related to the Macdonald polynomials and the diagonal harmonics. We have the combinatorial Macdonald polynomial formula that fits the defining conditions directly. The shuffle conjecture gives an elegant expression of the Frobenius series of the diagonal harmonics. While the geometric properties of the Hilbert scheme and schemes over it provides explanations from a different perspective. We use examples to show that these two approaches arrive at the same goal
The aim of these lectures was to give an overview of some combinatorial, symmetric-function theoreti...
AbstractLet Q[X, Y] denote the ring of polynomials with rational coefficients in the variables X = {...
AbstractIn this paper we use the combinatorics of alcove walks to give uniform combinatorial formula...
We will explore the combinatorial and geometric properties related to the Macdonald polynomials and ...
We will explore the combinatorial and geometric properties related to the Macdonald polynomials and ...
We will explore the combinatorial and geometric properties related to the Macdonald polynomials and ...
Since their introduction in 1988, Macdonald polynomials have played a central role in algebraic comb...
Since their introduction in 1988, Macdonald polynomials have played a central role in algebraic comb...
The combinatorial q, t-Catalan numbers are weighted sums of Dyck paths introduced by J. Haglund and ...
We study bigraded Sn-modules introduced by Garsia and Haiman as an approach to prove the Macdonald p...
We study bigraded Sn-modules introduced by Garsia and Haiman as an approach to prove the Macdonald p...
AbstractWe introduce a conjectured way of expressing the Hilbert series of diagonal harmonics as a w...
The theory of symmetric functions is ubiquitous throughout mathematics. They arise naturally in comb...
This chapter contains an account of a two-parameter version of the Catalan numbers, and correspondin...
Abstract: We prove a combinatorial formula for the Macdonald polynomial $\tilde{H}_{\mu }(x;q,t)$...
The aim of these lectures was to give an overview of some combinatorial, symmetric-function theoreti...
AbstractLet Q[X, Y] denote the ring of polynomials with rational coefficients in the variables X = {...
AbstractIn this paper we use the combinatorics of alcove walks to give uniform combinatorial formula...
We will explore the combinatorial and geometric properties related to the Macdonald polynomials and ...
We will explore the combinatorial and geometric properties related to the Macdonald polynomials and ...
We will explore the combinatorial and geometric properties related to the Macdonald polynomials and ...
Since their introduction in 1988, Macdonald polynomials have played a central role in algebraic comb...
Since their introduction in 1988, Macdonald polynomials have played a central role in algebraic comb...
The combinatorial q, t-Catalan numbers are weighted sums of Dyck paths introduced by J. Haglund and ...
We study bigraded Sn-modules introduced by Garsia and Haiman as an approach to prove the Macdonald p...
We study bigraded Sn-modules introduced by Garsia and Haiman as an approach to prove the Macdonald p...
AbstractWe introduce a conjectured way of expressing the Hilbert series of diagonal harmonics as a w...
The theory of symmetric functions is ubiquitous throughout mathematics. They arise naturally in comb...
This chapter contains an account of a two-parameter version of the Catalan numbers, and correspondin...
Abstract: We prove a combinatorial formula for the Macdonald polynomial $\tilde{H}_{\mu }(x;q,t)$...
The aim of these lectures was to give an overview of some combinatorial, symmetric-function theoreti...
AbstractLet Q[X, Y] denote the ring of polynomials with rational coefficients in the variables X = {...
AbstractIn this paper we use the combinatorics of alcove walks to give uniform combinatorial formula...