AbstractThe Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finite group. For a cyclic group of prime order p, we show that the image of the transfer lie in the ideal generated by invariants of degree at most p−1. Consequently we show that the Hilbert ideal corresponding to an indecomposable representation is generated by polynomials of degree at most p, confirming a conjecture of Harm Derksen and Gregor Kemper for this case
AbstractAbhyankar defined the index of a monomial in a matrix of indeterminates X to be the maximal ...
AbstractLet R ≅ k[x1,..., xr]/(F1,..., Fn) where (F1,..., Fn) denotes the ideal of homogeneous polyn...
This note investigates the image of the transfer homomor-phism for permutation representations of fi...
The Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finite group....
AbstractThe Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finit...
AbstractThe Hilbert ideal is an ideal generated by invariant polynomials (of strictly positive degre...
Let G=Z_p be a cyclic group of prime order p with a representation G#->#GL(V) over a field K of c...
The Hilbert ideal is the ideal generated by positive degree invariants of a finite group. We conside...
The growth of Hilbert coefficients for powers of ideals are Studied. For a graded ideal I in the pol...
AbstractWe study the transfer homomorphism in modular invariant theory paying particular attention t...
AbstractFor a faithful linear representation of a finite group G over a field of characteristic p, w...
There is a longstanding conjecture by Fröberg about the Hilbert series of the ring R∕I, where R is a...
AbstractWe consider the ring of coinvariants for modular representations of cyclic groups of prime o...
We consider a finite dimensional representation of the dihedral group D 2p over a field of character...
This paper is an exposition of Hilbert Basis Theorem and Grobner Basis. We first recall some basis c...
AbstractAbhyankar defined the index of a monomial in a matrix of indeterminates X to be the maximal ...
AbstractLet R ≅ k[x1,..., xr]/(F1,..., Fn) where (F1,..., Fn) denotes the ideal of homogeneous polyn...
This note investigates the image of the transfer homomor-phism for permutation representations of fi...
The Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finite group....
AbstractThe Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finit...
AbstractThe Hilbert ideal is an ideal generated by invariant polynomials (of strictly positive degre...
Let G=Z_p be a cyclic group of prime order p with a representation G#->#GL(V) over a field K of c...
The Hilbert ideal is the ideal generated by positive degree invariants of a finite group. We conside...
The growth of Hilbert coefficients for powers of ideals are Studied. For a graded ideal I in the pol...
AbstractWe study the transfer homomorphism in modular invariant theory paying particular attention t...
AbstractFor a faithful linear representation of a finite group G over a field of characteristic p, w...
There is a longstanding conjecture by Fröberg about the Hilbert series of the ring R∕I, where R is a...
AbstractWe consider the ring of coinvariants for modular representations of cyclic groups of prime o...
We consider a finite dimensional representation of the dihedral group D 2p over a field of character...
This paper is an exposition of Hilbert Basis Theorem and Grobner Basis. We first recall some basis c...
AbstractAbhyankar defined the index of a monomial in a matrix of indeterminates X to be the maximal ...
AbstractLet R ≅ k[x1,..., xr]/(F1,..., Fn) where (F1,..., Fn) denotes the ideal of homogeneous polyn...
This note investigates the image of the transfer homomor-phism for permutation representations of fi...
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