Add to ORKGSchur s- and Q-functions are two important families of symmetric functions, with applications for other fields, such as the representation theory of the symmetric group. Other researchers have shown that there are unexpected equalities between seemingly unrelated skew s-functions. In this dissertation we investigate similar relationships among Q-functions and between s- and Q-functions. In particular, we determine which s-functions are a linear combination of Q-functions, showing in addition that all are Q-positive, and determine which s-functions are constant multiples of single non-skew Q-functions. For skew Q-functions whose diagrams are valid unshifted shapes, we determine which ones are constant multiples of single non-skew Q-functions...
Abstract. In recent years, there has been considerable interest in showing that certain conditions o...
Abstract. We define an equivalence relation on skew diagrams such that two skew diagrams are equival...
The Cauchy identities play an important role in the theory of symmetric functions. It is known that ...
Schur s- and Q-functions are two important families of symmetric functions, with applications for ot...
AMS Subject Classication: 05E05,05E10 Abstract. We nd a simple criterion for the equality Qλ = Qµ=ν ...
Abstract. We introduce a new operation on skew diagrams called composition of transpositions, and us...
We introduce a new operation on skew diagrams called composition of trans-positions, and use it and ...
2022 Spring.Includes bibliographical references.The Schur Q-functions form a basis of the algebra Ω ...
The Schur functions {s_lambda} and ubiquitous Littlewood-Richardson coefficients are instrumental in...
The Schur functions {s_lambda} and ubiquitous Littlewood-Richardson coefficients are instrumental in...
Schur Q-functions were originally introduced by Schur in relation to projective representations of t...
A quadratic identity for skew Schur functions is proved combinatorially by means of a nonintersectin...
Abstract. The product sµsν of two Schur functions is one of the most famous examples of a Schur-posi...
In 2001, Lapointe, Lascoux, and Morse discovered a class of symmetric functions called k-Schur funct...
In 2001, Lapointe, Lascoux, and Morse discovered a class of symmetric functions called k-Schur funct...
Abstract. In recent years, there has been considerable interest in showing that certain conditions o...
Abstract. We define an equivalence relation on skew diagrams such that two skew diagrams are equival...
The Cauchy identities play an important role in the theory of symmetric functions. It is known that ...
Schur s- and Q-functions are two important families of symmetric functions, with applications for ot...
AMS Subject Classication: 05E05,05E10 Abstract. We nd a simple criterion for the equality Qλ = Qµ=ν ...
Abstract. We introduce a new operation on skew diagrams called composition of transpositions, and us...
We introduce a new operation on skew diagrams called composition of trans-positions, and use it and ...
2022 Spring.Includes bibliographical references.The Schur Q-functions form a basis of the algebra Ω ...
The Schur functions {s_lambda} and ubiquitous Littlewood-Richardson coefficients are instrumental in...
The Schur functions {s_lambda} and ubiquitous Littlewood-Richardson coefficients are instrumental in...
Schur Q-functions were originally introduced by Schur in relation to projective representations of t...
A quadratic identity for skew Schur functions is proved combinatorially by means of a nonintersectin...
Abstract. The product sµsν of two Schur functions is one of the most famous examples of a Schur-posi...
In 2001, Lapointe, Lascoux, and Morse discovered a class of symmetric functions called k-Schur funct...
In 2001, Lapointe, Lascoux, and Morse discovered a class of symmetric functions called k-Schur funct...
Abstract. In recent years, there has been considerable interest in showing that certain conditions o...
Abstract. We define an equivalence relation on skew diagrams such that two skew diagrams are equival...
The Cauchy identities play an important role in the theory of symmetric functions. It is known that ...