AbstractThe Hilbert ideal is an ideal generated by invariant polynomials (of strictly positive degree) of a finite group. In this paper, the reduced Gröbner bases and the universal Gröbner bases of Hilbert ideals of alternating groups are studied
In this paper we use Groebner bases theory in order to determine planarity of intersections of two a...
AbstractGröbner bases can be used to solve various algorithmic problems in the context of finitely g...
AbstractIn a paper on F-rationality [J. Algebra 176 (1995) 824–860] Donna Glassbrenner showed that o...
AbstractThe theory of Gröbner basis for ideals can be applied in the non-associative, noncommutative...
The Hilbert ideal is the ideal generated by positive degree invariants of a finite group. We conside...
Cataloged from PDF version of article.We consider a finite dimensional representation of the dihedra...
Cataloged from PDF version of article.The Hilbert ideal is the ideal generated by positive degree in...
AbstractThe Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finit...
AbstractOur main result is a proof of the Florent Hivert conjecture [F. Hivert, Local action of the ...
AbstractFrom Mason's theorem on rational function fields (the progenitor of the abc-conjecture) we i...
The Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finite group....
AbstractA finite basis problem in Specht modules is considered. Some criteria are proved for a submo...
Let S = K[x1, x2, . . . , xn] be a standard graded K-algebra for any field K. Without using any heav...
AbstractLet R=k[x,y] denote the polynomial ring in two variables over an infinite field k. We study ...
AbstractThis paper deals with a Hilbert-type linear series operator and its norm. Several generaliza...
In this paper we use Groebner bases theory in order to determine planarity of intersections of two a...
AbstractGröbner bases can be used to solve various algorithmic problems in the context of finitely g...
AbstractIn a paper on F-rationality [J. Algebra 176 (1995) 824–860] Donna Glassbrenner showed that o...
AbstractThe theory of Gröbner basis for ideals can be applied in the non-associative, noncommutative...
The Hilbert ideal is the ideal generated by positive degree invariants of a finite group. We conside...
Cataloged from PDF version of article.We consider a finite dimensional representation of the dihedra...
Cataloged from PDF version of article.The Hilbert ideal is the ideal generated by positive degree in...
AbstractThe Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finit...
AbstractOur main result is a proof of the Florent Hivert conjecture [F. Hivert, Local action of the ...
AbstractFrom Mason's theorem on rational function fields (the progenitor of the abc-conjecture) we i...
The Hilbert ideal is the ideal generated by positive degree invariant polynomials of a finite group....
AbstractA finite basis problem in Specht modules is considered. Some criteria are proved for a submo...
Let S = K[x1, x2, . . . , xn] be a standard graded K-algebra for any field K. Without using any heav...
AbstractLet R=k[x,y] denote the polynomial ring in two variables over an infinite field k. We study ...
AbstractThis paper deals with a Hilbert-type linear series operator and its norm. Several generaliza...
In this paper we use Groebner bases theory in order to determine planarity of intersections of two a...
AbstractGröbner bases can be used to solve various algorithmic problems in the context of finitely g...
AbstractIn a paper on F-rationality [J. Algebra 176 (1995) 824–860] Donna Glassbrenner showed that o...
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