AbstractLet V be an n-dimensional vector space over a field F. An arrangement of hyperplanes A = {H1,…, Hk} in V is said to be in general position if whenever j Σ N lies between 1 and min(n,k) the dimension of the intersection of any j hyperplanes in A has codimension j. In this note we examine several subgroups of GL(n, F) associated with such an arrangement and the corresponding rings of polynomial invariants
AbstractLet F denote a finite field and let S(m, n, F) denote a set of generators of the invariants ...
Let A be a subspace arrangement and let χ(A,t) be the characteristic polynomial of its intersection ...
AbstractGiven a group G acting on a finite dimensional vector space V over any field k, we ask for t...
AbstractLet V be an n-dimensional vector space over a field F. An arrangement of hyperplanes A = {H1...
by Chan Suk Ha Iris.Bibliography: leaves 84-88Thesis (M.Ph.)--Chinese University of Hong Kon
AbstractWe use Nakajima's (J. Algebra85(1983), 253–286) characterization ofp-groups with polynomial ...
Let V be a finite vector space of dimension n over the field K. A hyperplane in V is an n − 1 dimens...
AbstractLet the finite group G act linearly on the n-dimensional vector space V over the field k of ...
AbstractLet V be an n-dimensional vector space over Fq. Let Φ be a Hermitian form with respect to an...
AbstractLetVdenote a finite-dimensionalKvector space and letGdenote a finite group ofK-linear automo...
summary:We investigate the invariant rings of two classes of finite groups $G\leq {\rm GL}(n,F_q)$ w...
summary:We investigate the invariant rings of two classes of finite groups $G\leq {\rm GL}(n,F_q)$ w...
AbstractFor a faithful linear representation of a finite group G over a field of characteristic p, w...
AbstractLet the finite group G act linearly on the n-dimensional vector space V over the field k of ...
A toric hyperplane is the preimage of a point $x \in S^1$ of a continuous surjective group homomorph...
AbstractLet F denote a finite field and let S(m, n, F) denote a set of generators of the invariants ...
Let A be a subspace arrangement and let χ(A,t) be the characteristic polynomial of its intersection ...
AbstractGiven a group G acting on a finite dimensional vector space V over any field k, we ask for t...
AbstractLet V be an n-dimensional vector space over a field F. An arrangement of hyperplanes A = {H1...
by Chan Suk Ha Iris.Bibliography: leaves 84-88Thesis (M.Ph.)--Chinese University of Hong Kon
AbstractWe use Nakajima's (J. Algebra85(1983), 253–286) characterization ofp-groups with polynomial ...
Let V be a finite vector space of dimension n over the field K. A hyperplane in V is an n − 1 dimens...
AbstractLet the finite group G act linearly on the n-dimensional vector space V over the field k of ...
AbstractLet V be an n-dimensional vector space over Fq. Let Φ be a Hermitian form with respect to an...
AbstractLetVdenote a finite-dimensionalKvector space and letGdenote a finite group ofK-linear automo...
summary:We investigate the invariant rings of two classes of finite groups $G\leq {\rm GL}(n,F_q)$ w...
summary:We investigate the invariant rings of two classes of finite groups $G\leq {\rm GL}(n,F_q)$ w...
AbstractFor a faithful linear representation of a finite group G over a field of characteristic p, w...
AbstractLet the finite group G act linearly on the n-dimensional vector space V over the field k of ...
A toric hyperplane is the preimage of a point $x \in S^1$ of a continuous surjective group homomorph...
AbstractLet F denote a finite field and let S(m, n, F) denote a set of generators of the invariants ...
Let A be a subspace arrangement and let χ(A,t) be the characteristic polynomial of its intersection ...
AbstractGiven a group G acting on a finite dimensional vector space V over any field k, we ask for t...