AbstractThe complexity of selection is analyzed for two sets, X + Y and matrices with sorted columns. Algorithms are presented that run in time which depends nontrivially on the rank k of the element to be selected and which is sublinear with respect to set cardinality. Identical bounds are also shown for the problem of ranking elements in these sets, and all bounds are shown to be optimal to within a constant multiplicative factor
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
AbstractWe identify a class of problems, called controlled selection problems, and study their compl...
We consider the problem of computing the rank of an m × nmatrix A over a field. We present a randomi...
AbstractThe complexity of selection is analyzed for two sets, X + Y and matrices with sorted columns...
AbstractLet X and Y be two sorted n-vectors and A = X + Y be an n×n matrix with sorted rows and colu...
AbstractWe consider the computational complexity of some problems dealing with matrix rank. Let E, S...
We present a parallel algorithm running in time O(logmlog*m(logm+log(nm))) time and O(mlog(nm)) oper...
Let X[0 . . n - 1] and Y[0 . . m - 1] be two sorted arrays, and define the m x n matrix A by A[j][i]...
AbstractThe paper contains the complete results for the complexity of the following three selection ...
Classical problems of sorting and searching assume an underlying linear ordering of the objects bein...
A large body of work studies the complexity of selecting the j-th largest element in an arbitrary se...
We survey a number of recent results that relate the fine-grained complexity of several NP-Hard prob...
The multiple selection problem asks for the elements of rank r1, r2,..., rk from a linearly ordered ...
In this paper we consider searching, and also ranking, in an m x n matrix with sorted columns on the...
We prove that it is {number_sign}P-hard to compute the mixed discriminant of rank 2 positive semidef...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
AbstractWe identify a class of problems, called controlled selection problems, and study their compl...
We consider the problem of computing the rank of an m × nmatrix A over a field. We present a randomi...
AbstractThe complexity of selection is analyzed for two sets, X + Y and matrices with sorted columns...
AbstractLet X and Y be two sorted n-vectors and A = X + Y be an n×n matrix with sorted rows and colu...
AbstractWe consider the computational complexity of some problems dealing with matrix rank. Let E, S...
We present a parallel algorithm running in time O(logmlog*m(logm+log(nm))) time and O(mlog(nm)) oper...
Let X[0 . . n - 1] and Y[0 . . m - 1] be two sorted arrays, and define the m x n matrix A by A[j][i]...
AbstractThe paper contains the complete results for the complexity of the following three selection ...
Classical problems of sorting and searching assume an underlying linear ordering of the objects bein...
A large body of work studies the complexity of selecting the j-th largest element in an arbitrary se...
We survey a number of recent results that relate the fine-grained complexity of several NP-Hard prob...
The multiple selection problem asks for the elements of rank r1, r2,..., rk from a linearly ordered ...
In this paper we consider searching, and also ranking, in an m x n matrix with sorted columns on the...
We prove that it is {number_sign}P-hard to compute the mixed discriminant of rank 2 positive semidef...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
AbstractWe identify a class of problems, called controlled selection problems, and study their compl...
We consider the problem of computing the rank of an m × nmatrix A over a field. We present a randomi...