Add to ORKGMy main research focus right now is symmetric and quasisymmetric functions. In particular, I am interested in specializations of Macdonald polynomials and generalizations of Schur functions. A symmetric function is a polynomial which remains unchanged when the variables are permuted. The Schur function basis for symmetric functions is related to many different areas of mathematics and can be generated in many ways, but I am most interested in its combinatorial aspects and the properties of semi-standard Young tableaux (boxes containing numbers placed according to certain rules) which can be used to construct Schur functions. Most of my recent work in this area has been on a related collection of polynomials, called "quasisymmetric Schur...
