AbstractWe exhibit a new method for showing lower bounds for time-space tradeoffs of polynomial evaluation procedures given by straight-line programs. From the tradeoff results obtained by this method we deduce lower space bounds for polynomial evaluation procedures running in optimal nonscalar time. Time, denoted by L, is measured in terms of nonscalar arithmetic operations and space, denoted by S, is measured by the maximal number of pebbles (registers) used during the given evaluation procedure. The time-space tradeoff function considered in this paper is LS2. We show that for “almost all” univariate polynomials of degree at most d our time-space tradeoff functions satisfy the inequality LS2⩾d8. From this we conclude that for “almost all...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
We prove the first time-space lower bound tradeoffs for randomized computation of decision problems....
Abstract. An optimal (n2) lower bound is shown for the time-space product of any R-way branching pro...
AbstractWe exhibit a new method for showing lower bounds for time-space tradeoffs of polynomial eval...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
AbstractWe obtain the first non-trivial time–space tradeoff lower bound for functions f:{0, 1}n→{0, ...
AbstractRecent research has investigated time-space tradeoffs for register allocation strategies of ...
AbstractWe investigate time-space tradeoffs for traversing undirected graphs, using a variety of str...
AbstractWe give the first nontrivial model-independent time–space tradeoffs for satisfiability. Name...
We study the fundamental problem of sorting in a sequential model of computation and in particular c...
AbstractIn this paper, we consider the related problems of convolution and polynomial multiplication...
AbstractThis paper establishes time-space tradeoffs for some algebraic problems in the branching pro...
We study the fundamental problem of sorting n integers of w bits on a unit-cost RAM with word size w...
AbstractWe present a family of randomized algorithms that enjoys a wide range of time–space trade-of...
A single-player game of Memory is played with n distinct pairs of cards, with the cards in each pair...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
We prove the first time-space lower bound tradeoffs for randomized computation of decision problems....
Abstract. An optimal (n2) lower bound is shown for the time-space product of any R-way branching pro...
AbstractWe exhibit a new method for showing lower bounds for time-space tradeoffs of polynomial eval...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
AbstractWe obtain the first non-trivial time–space tradeoff lower bound for functions f:{0, 1}n→{0, ...
AbstractRecent research has investigated time-space tradeoffs for register allocation strategies of ...
AbstractWe investigate time-space tradeoffs for traversing undirected graphs, using a variety of str...
AbstractWe give the first nontrivial model-independent time–space tradeoffs for satisfiability. Name...
We study the fundamental problem of sorting in a sequential model of computation and in particular c...
AbstractIn this paper, we consider the related problems of convolution and polynomial multiplication...
AbstractThis paper establishes time-space tradeoffs for some algebraic problems in the branching pro...
We study the fundamental problem of sorting n integers of w bits on a unit-cost RAM with word size w...
AbstractWe present a family of randomized algorithms that enjoys a wide range of time–space trade-of...
A single-player game of Memory is played with n distinct pairs of cards, with the cards in each pair...
Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
We prove the first time-space lower bound tradeoffs for randomized computation of decision problems....
Abstract. An optimal (n2) lower bound is shown for the time-space product of any R-way branching pro...