Add to ORKGWe have studied E-polynomials which are combinatorial analogue of Eisenstein series. In this paper, we apply this approach to classical invariant theory. The corresponding subrings to E-polynomials are investigated
M. Khovanov constructed a bigraded (co)homology group for links such that its graded Euler character...
summary:The two diffeomorphism invariant algebras introduced in Grosser M., Far\-kas E., Kunziger ...
summary:The two diffeomorphism invariant algebras introduced in Grosser M., Far\-kas E., Kunziger ...
In this paper, we construct the analogue theory of Eisenstein series in classical invariant theory. ...
AbstractA problem that arose in the study of the mass of the neutrino led us to the evaluation of a ...
The purpose of this paper is to collect computations related to the weight enumerators and to presen...
Thesis advisor: Mark ReederA polynomial is said to be invariant for a group of linear fractional tra...
For a prime p>2 and q=p^n, we compute a finite generating set for the SL_2(F_q)-invariants of the se...
AbstractOur main result is a proof of the Florent Hivert conjecture [F. Hivert, Local action of the ...
AbstractLet D be an X-outer S-derivation of a prime ring R, where S is an automorphism of R. The fol...
The aim of this paper is to generalize the classical formula $e^xye^{-x}=\sum\limits_{k\ge 0} \frac{...
We consider one of the fundamental problems of classical invariant theory, the research of Hilbert p...
Let $r>2$ be an integer and let $K$ be a field in which $r!$ is invertible. An $r$-form over $K$ is ...
AbstractA recent proof that the Grassmannian G1,n,2 of lines of PG(n,2) has polynomial degree n2-1 i...
Let $r>2$ be an integer and let $K$ be a field in which $r!$ is invertible. An $r$-form over $K$ is ...
M. Khovanov constructed a bigraded (co)homology group for links such that its graded Euler character...
summary:The two diffeomorphism invariant algebras introduced in Grosser M., Far\-kas E., Kunziger ...
summary:The two diffeomorphism invariant algebras introduced in Grosser M., Far\-kas E., Kunziger ...
In this paper, we construct the analogue theory of Eisenstein series in classical invariant theory. ...
AbstractA problem that arose in the study of the mass of the neutrino led us to the evaluation of a ...
The purpose of this paper is to collect computations related to the weight enumerators and to presen...
Thesis advisor: Mark ReederA polynomial is said to be invariant for a group of linear fractional tra...
For a prime p>2 and q=p^n, we compute a finite generating set for the SL_2(F_q)-invariants of the se...
AbstractOur main result is a proof of the Florent Hivert conjecture [F. Hivert, Local action of the ...
AbstractLet D be an X-outer S-derivation of a prime ring R, where S is an automorphism of R. The fol...
The aim of this paper is to generalize the classical formula $e^xye^{-x}=\sum\limits_{k\ge 0} \frac{...
We consider one of the fundamental problems of classical invariant theory, the research of Hilbert p...
Let $r>2$ be an integer and let $K$ be a field in which $r!$ is invertible. An $r$-form over $K$ is ...
AbstractA recent proof that the Grassmannian G1,n,2 of lines of PG(n,2) has polynomial degree n2-1 i...
Let $r>2$ be an integer and let $K$ be a field in which $r!$ is invertible. An $r$-form over $K$ is ...
M. Khovanov constructed a bigraded (co)homology group for links such that its graded Euler character...
summary:The two diffeomorphism invariant algebras introduced in Grosser M., Far\-kas E., Kunziger ...
summary:The two diffeomorphism invariant algebras introduced in Grosser M., Far\-kas E., Kunziger ...