We 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 complexity of computing the determinant of a matrix over a non-commutati...
Let double-struck F be a field of characteristic ≠ 2. The determinantal complexity of a polynomial P...
Valiant, in his seminal paper in 1979, showed an efficient simulation of algebraic formulas by 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 ...
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...
AbstractIn Valiant's theory of arithmetic complexity, the following question occupies a central posi...
AbstractThe n×n permanent is not a projection of the m×m determinant if m ⩽ √2n− 6√n
Kabanets and Impagliazzo cite{KaIm04} show how to decide the circuit polynomial identity testing pro...
AbstractIt is shown that the permanent function of (0, 1)-matrices is a complete problem for the cla...
We show that any nonzero polynomial in the ideal generated by the $r \times r$ minors of an $n \time...
Tavenas has recently proved that any n^{O(1)}-variate and degree n polynomial in VP can be computed ...
Computational complexity is the study of the resources — time, memory, …— needed to algorithmically ...
<F4.793e+05> We prove a new combinatorial characterization of the<F3.928e+05> determi-&...
In this paper, we study the complexity of computing the determinant of a matrix over a non-commutati...
Let double-struck F be a field of characteristic ≠ 2. The determinantal complexity of a polynomial P...
Valiant, in his seminal paper in 1979, showed an efficient simulation of algebraic formulas by 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 ...
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...
AbstractIn Valiant's theory of arithmetic complexity, the following question occupies a central posi...
AbstractThe n×n permanent is not a projection of the m×m determinant if m ⩽ √2n− 6√n
Kabanets and Impagliazzo cite{KaIm04} show how to decide the circuit polynomial identity testing pro...
AbstractIt is shown that the permanent function of (0, 1)-matrices is a complete problem for the cla...
We show that any nonzero polynomial in the ideal generated by the $r \times r$ minors of an $n \time...
Tavenas has recently proved that any n^{O(1)}-variate and degree n polynomial in VP can be computed ...
Computational complexity is the study of the resources — time, memory, …— needed to algorithmically ...
<F4.793e+05> We prove a new combinatorial characterization of the<F3.928e+05> determi-&...
In this paper, we study the complexity of computing the determinant of a matrix over a non-commutati...
Let double-struck F be a field of characteristic ≠ 2. The determinantal complexity of a polynomial P...
Valiant, in his seminal paper in 1979, showed an efficient simulation of algebraic formulas by deter...