Add to ORKGWe show that Stanley’s conjecture holds for any multigraded module M over S, with sdepth(M) = 0, where S = K[x_1; ... ; x_n]. Also, we give some bounds for the Stanley depth of the powers of the maximal irrelevant ideal in S
AbstractLet I be an m-generated complete intersection monomial ideal in S=K[x1,…,xn]. We show that t...
AbstractIn this paper, we answer a question posed by Y.H. Shen. We prove that if I is an m-generated...
A famous conjecture by R. Stanley relates the depth of a module, an algebraic invariant, with the so...
We show that Stanley’s conjecture holds for any multigraded module M over S, with sdepth(M) = 0, whe...
We show that Stanley’s conjecture holds for any multigraded module M over S, with sdepth(M) = 0, whe...
AbstractThe Stanley's Conjecture on Cohen–Macaulay multigraded modules is studied especially in dime...
AbstractWe apply Millerʼs theory on multigraded modules over a polynomial ring to the study of the S...
In this paper we introduce an algorithm for computing the Stanleydepth of a finitely generated multi...
In this article we describe an algorithm to compute the Stanley depth of I=J where I and J are monom...
In this article we describe an algorithm to compute the Stanley depth of I=J where I and J are monom...
In this article we describe an algorithm to compute the Stanley depth of I=J where I and J are monom...
In the first Chapter some definitions and necessary results from commutative algebra are given.Also ...
In this paper we introduce an algorithm for computing the Stanleydepth of a finitely generated multi...
AbstractLet J⊂I be monomial ideals. We show that the Stanley depth of I/J can be computed in a finit...
AbstractWe apply Millerʼs theory on multigraded modules over a polynomial ring to the study of the S...
AbstractLet I be an m-generated complete intersection monomial ideal in S=K[x1,…,xn]. We show that t...
AbstractIn this paper, we answer a question posed by Y.H. Shen. We prove that if I is an m-generated...
A famous conjecture by R. Stanley relates the depth of a module, an algebraic invariant, with the so...
We show that Stanley’s conjecture holds for any multigraded module M over S, with sdepth(M) = 0, whe...
We show that Stanley’s conjecture holds for any multigraded module M over S, with sdepth(M) = 0, whe...
AbstractThe Stanley's Conjecture on Cohen–Macaulay multigraded modules is studied especially in dime...
AbstractWe apply Millerʼs theory on multigraded modules over a polynomial ring to the study of the S...
In this paper we introduce an algorithm for computing the Stanleydepth of a finitely generated multi...
In this article we describe an algorithm to compute the Stanley depth of I=J where I and J are monom...
In this article we describe an algorithm to compute the Stanley depth of I=J where I and J are monom...
In this article we describe an algorithm to compute the Stanley depth of I=J where I and J are monom...
In the first Chapter some definitions and necessary results from commutative algebra are given.Also ...
In this paper we introduce an algorithm for computing the Stanleydepth of a finitely generated multi...
AbstractLet J⊂I be monomial ideals. We show that the Stanley depth of I/J can be computed in a finit...
AbstractWe apply Millerʼs theory on multigraded modules over a polynomial ring to the study of the S...
AbstractLet I be an m-generated complete intersection monomial ideal in S=K[x1,…,xn]. We show that t...
AbstractIn this paper, we answer a question posed by Y.H. Shen. We prove that if I is an m-generated...
A famous conjecture by R. Stanley relates the depth of a module, an algebraic invariant, with the so...