AbstractFirst steps in the algebraic invariant theory of vector-valued bilinear and sesquilinear forms are made. In particular, explicit formulas for generators of all invariant rational functions for such forms are derived. These formulas, and certain analogues, have applications to the geometry of Riemannian submanifolds, distributions, and CR structures
We give a method to obtain formal normal forms of reversible equivariant vector fields. The procedur...
We introduce an sl 2 -invariant family of polynomial vector fields with an irreducible nilpotent sin...
AbstractWe discuss some aspects of the invariant theory and arithmetic of the prehomogeneous vector ...
AbstractFirst steps in the algebraic invariant theory of vector-valued bilinear and sesquilinear for...
AbstractLet V be a vector space over a field or skew field F, and let U be its subspace. We study th...
AbstractVector spaces of pairs of rational vector valued functions, which are (1) invariant under th...
AbstractSimple systems of invariants for rational and integral quadratic forms are given, and those ...
AbstractCanonical matrices are given for(i)bilinear forms over an algebraically closed or real close...
It was conjectured in the recent article by Eastwood and Isaev that all absolute classical invariant...
We survey our recently proposed method for constructing biholomorphic invariants of quasihomogeneous...
We use classical invariant theory to construct invariants of complex graded Gorenstein algebras of f...
AbstractIn this paper we construct a linear space that parameterizes all invariant bilinear forms on...
The sheaves of tangent vector fields, differential forms or differential operators are canonical. Na...
the dot product on Rn to a bilinear form on a vector space and study algebraic and geo-metric notion...
. Some recent methods of Computer Aided Geometric Design are related to the apolar bilinear form, an...
We give a method to obtain formal normal forms of reversible equivariant vector fields. The procedur...
We introduce an sl 2 -invariant family of polynomial vector fields with an irreducible nilpotent sin...
AbstractWe discuss some aspects of the invariant theory and arithmetic of the prehomogeneous vector ...
AbstractFirst steps in the algebraic invariant theory of vector-valued bilinear and sesquilinear for...
AbstractLet V be a vector space over a field or skew field F, and let U be its subspace. We study th...
AbstractVector spaces of pairs of rational vector valued functions, which are (1) invariant under th...
AbstractSimple systems of invariants for rational and integral quadratic forms are given, and those ...
AbstractCanonical matrices are given for(i)bilinear forms over an algebraically closed or real close...
It was conjectured in the recent article by Eastwood and Isaev that all absolute classical invariant...
We survey our recently proposed method for constructing biholomorphic invariants of quasihomogeneous...
We use classical invariant theory to construct invariants of complex graded Gorenstein algebras of f...
AbstractIn this paper we construct a linear space that parameterizes all invariant bilinear forms on...
The sheaves of tangent vector fields, differential forms or differential operators are canonical. Na...
the dot product on Rn to a bilinear form on a vector space and study algebraic and geo-metric notion...
. Some recent methods of Computer Aided Geometric Design are related to the apolar bilinear form, an...
We give a method to obtain formal normal forms of reversible equivariant vector fields. The procedur...
We introduce an sl 2 -invariant family of polynomial vector fields with an irreducible nilpotent sin...
AbstractWe discuss some aspects of the invariant theory and arithmetic of the prehomogeneous vector ...
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