Add to ORKGWe study the varieties and their coordinate rings of pairs of matrices of indeterminates whose product is symmetric. Hochster and Eagon developed the method of Principal Radical Systems to show that determinantal rings are Cohen-Macaulay normal domain. We use this method to show our rings are Cohen-Macaulay normal domains. We explicitly construct a linear homogeneous system of parameters for our rings and show that the a-invariant of our rings is negative. Thus, we reduce the question of F-rationality to that of F-injectivity by a criterion due to Hara and Watanabe. Using Grobner bases techniques and deformation theory, along with a theorem of Conca and Herzog we establish, in several cases, that our rings are F-injective, hence F-ration...
This paper is an exposition about matrices over commutative rings. Concepts about the determinants, ...
AbstractIn a paper on F-rationality [J. Algebra 176 (1995) 824–860] Donna Glassbrenner showed that o...
Abstract. The notions of F-rational and F-regular rings are defined via tight closure, which is a cl...
Given two varieties, we can construct the embedded join variety. The homogeneous coordinate ring of ...
AbstractStarting from a theorem of Frobenius that every n×n matrix is the product of two symmetric o...
When one studies certain rings, it is natural to classify them according to certain properties. This...
AbstractWe consider orthogonal and symplectic analogues of determinantal varieties O¯r1,r2. Such var...
AbstractGiven a pair of matrices (A,B)∈Rn×n×Rn×m with coefficients in a commutative ring we study th...
AbstractF-rational rings are defined for rings of characteristic p > 0 using the Frobenius endomorph...
Let $X$ be smooth projective curve of genus $g$. Let $R(g,n)$ be $Hom(\pi_1(X),GL_n(C)$ with the nat...
AbstractSome identities resulting from the Cayley-Hamilton theorem are derived. Some applications in...
Let $X$ be smooth projective curve of genus $g$. Let $R(g,n)$ be $Hom(\pi_1(X),GL_n(C)$ with the nat...
Abstract. We describe some of the determinantal ideals attached to symmetric, exterior and tensor po...
AbstractThe determinants of solutions X to any of the 2×2 matrix equations: (1) XAX>−1=At, t denotin...
We show that when a finite cyclic group permutes the variables in a polynomial ring, the resulting i...
This paper is an exposition about matrices over commutative rings. Concepts about the determinants, ...
AbstractIn a paper on F-rationality [J. Algebra 176 (1995) 824–860] Donna Glassbrenner showed that o...
Abstract. The notions of F-rational and F-regular rings are defined via tight closure, which is a cl...
Given two varieties, we can construct the embedded join variety. The homogeneous coordinate ring of ...
AbstractStarting from a theorem of Frobenius that every n×n matrix is the product of two symmetric o...
When one studies certain rings, it is natural to classify them according to certain properties. This...
AbstractWe consider orthogonal and symplectic analogues of determinantal varieties O¯r1,r2. Such var...
AbstractGiven a pair of matrices (A,B)∈Rn×n×Rn×m with coefficients in a commutative ring we study th...
AbstractF-rational rings are defined for rings of characteristic p > 0 using the Frobenius endomorph...
Let $X$ be smooth projective curve of genus $g$. Let $R(g,n)$ be $Hom(\pi_1(X),GL_n(C)$ with the nat...
AbstractSome identities resulting from the Cayley-Hamilton theorem are derived. Some applications in...
Let $X$ be smooth projective curve of genus $g$. Let $R(g,n)$ be $Hom(\pi_1(X),GL_n(C)$ with the nat...
Abstract. We describe some of the determinantal ideals attached to symmetric, exterior and tensor po...
AbstractThe determinants of solutions X to any of the 2×2 matrix equations: (1) XAX>−1=At, t denotin...
We show that when a finite cyclic group permutes the variables in a polynomial ring, the resulting i...
This paper is an exposition about matrices over commutative rings. Concepts about the determinants, ...
AbstractIn a paper on F-rationality [J. Algebra 176 (1995) 824–860] Donna Glassbrenner showed that o...
Abstract. The notions of F-rational and F-regular rings are defined via tight closure, which is a cl...