Add to ORKGWe answer a question in [Landsberg, Ressayre, 2015], showing the regular determinantal complexity of the determinant det_m is O(m^3). We answer questions in, and generalize results of [Aravind, Joglekar, 2015], showing there is no rank one determinantal expression for perm_m or det_m when m >= 3. Finally we state and prove several "folklore" results relating different models of computation
In this paper, we study the computational complexity of computing the noncommutative determinant. We...
Abstract. We initiate a study of determinantal representations with symmetry. We show that Grenet’s ...
International audienceGrenet's determinantal representation for the permanent is optimal among deter...
We answer a question in [Landsberg, Ressayre, 2015], showing the regular determinantal complexity of...
International audienceThe determinantal complexity of a polynomial f is defined here as the minimal ...
AbstractThe n×n permanent is not a projection of the m×m determinant if m ⩽ √2n− 6√n
Recent results by Toda, Vinay, Damm, and Valiant have shown that the complexity of the determinant i...
AbstractIn Valiant's theory of arithmetic complexity, the following question occupies a central posi...
Valiant's famous determinant versus permanent problem is the flagship problem in algebraic complexit...
International audienceWe initiate a study of determinantal representations with symmetry. We show th...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
<F4.793e+05> We prove a new combinatorial characterization of the<F3.928e+05> determi-&...
In this paper we consider the complexity of computing permanents over fields of characteristic 3. We...
We investigate the complexity of enumerative approximation of two elementary problems in linear alge...
In this paper, we study the complexity of computing the determinant of a matrix over a non-commutati...
In this paper, we study the computational complexity of computing the noncommutative determinant. We...
Abstract. We initiate a study of determinantal representations with symmetry. We show that Grenet’s ...
International audienceGrenet's determinantal representation for the permanent is optimal among deter...
We answer a question in [Landsberg, Ressayre, 2015], showing the regular determinantal complexity of...
International audienceThe determinantal complexity of a polynomial f is defined here as the minimal ...
AbstractThe n×n permanent is not a projection of the m×m determinant if m ⩽ √2n− 6√n
Recent results by Toda, Vinay, Damm, and Valiant have shown that the complexity of the determinant i...
AbstractIn Valiant's theory of arithmetic complexity, the following question occupies a central posi...
Valiant's famous determinant versus permanent problem is the flagship problem in algebraic complexit...
International audienceWe initiate a study of determinantal representations with symmetry. We show th...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
<F4.793e+05> We prove a new combinatorial characterization of the<F3.928e+05> determi-&...
In this paper we consider the complexity of computing permanents over fields of characteristic 3. We...
We investigate the complexity of enumerative approximation of two elementary problems in linear alge...
In this paper, we study the complexity of computing the determinant of a matrix over a non-commutati...
In this paper, we study the computational complexity of computing the noncommutative determinant. We...
Abstract. We initiate a study of determinantal representations with symmetry. We show that Grenet’s ...
International audienceGrenet's determinantal representation for the permanent is optimal among deter...
