Abstract. We consider the complexity of computing the determinant over arbitrary finite-dimensional algebras. We first consider the case that A is fixed. We obtain the following dichotomy: If A / radA is noncom-mutative, then computing the determinant over A is hard. “Hard ” here means #P-hard over fields of characteristic 0 and ModpP-hard over fields of characteristic p> 0. If A / radA is commutative and the underlying field is perfect, then we can compute the determinant over A in polyno-mial time. We also consider the case when A is part of the input. Here the hardness is closely related to the nilpotency index of the commutator ideal of A. The commutator ideal com(A) of A is the ideal generated by all elements of the form xy − yx wit...
We investigate the complexity of enumerative approximation of two elementary problems in linear alge...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
The Sasaki-Murao algorithm computes the determinant of any square matrix over a commutative ring in ...
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...
<F4.793e+05> We prove a new combinatorial characterization of the<F3.928e+05> determi-&...
We study the deterministic time complexity of the equivalence problems for formulas and for straight...
By combining Kaltofen's 1992 baby steps/giant steps technique for Wiedemann's 1986 determinant algor...
Let B be a linear space of matrices over a field F spanned by n × n matrices B1, . . . ,Bm. The non-...
We present new baby steps/giant steps algorithms of asymptotically fast running time for dense matri...
Motivated by the recent developments on the complexity of non-commu-tative determinant and permanent...
Let {mathcal B} be a linear space of matrices over a field {mathbb spanned by ntimes n matrices B_1...
The algebras considered in this paper are commutative rings of which the additive group is a finite-...
We answer a question in [Landsberg, Ressayre, 2015], showing the regular determinantal complexity of...
We study the link between the complexity of polynomial matrix multiplication and the complexity of s...
We investigate the complexity of enumerative approximation of two elementary problems in linear alge...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
The Sasaki-Murao algorithm computes the determinant of any square matrix over a commutative ring in ...
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...
<F4.793e+05> We prove a new combinatorial characterization of the<F3.928e+05> determi-&...
We study the deterministic time complexity of the equivalence problems for formulas and for straight...
By combining Kaltofen's 1992 baby steps/giant steps technique for Wiedemann's 1986 determinant algor...
Let B be a linear space of matrices over a field F spanned by n × n matrices B1, . . . ,Bm. The non-...
We present new baby steps/giant steps algorithms of asymptotically fast running time for dense matri...
Motivated by the recent developments on the complexity of non-commu-tative determinant and permanent...
Let {mathcal B} be a linear space of matrices over a field {mathbb spanned by ntimes n matrices B_1...
The algebras considered in this paper are commutative rings of which the additive group is a finite-...
We answer a question in [Landsberg, Ressayre, 2015], showing the regular determinantal complexity of...
We study the link between the complexity of polynomial matrix multiplication and the complexity of s...
We investigate the complexity of enumerative approximation of two elementary problems in linear alge...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
The Sasaki-Murao algorithm computes the determinant of any square matrix over a commutative ring in ...