AbstractOn any general sequential model of computation with random-access input (e.g., a logarithmic cost RAM or a Turing machine with random-access input heads) the product time · space is: 1.(1) Not o(N2), hence not o((nlog n)2), for computing the discrete Fourier transform over finite prime fields, even when each entry in the input vector has length O(log N). Here N denotes the number of entries and n denotes the input length.2.(2) Ω(M3), hence not o((nlog n)1,5) for M by M matrix multiplication over the integers or over finite prime fields, even when each entry in the matrices has length O(log M).For this range of entries length these lower bounds on time · space coincide, up to a log no(1) factor, with the upper bounds achieved by the ...
AbstractTwo models for very-large scale integrated (VLSI) semiconductor circuits are considered that...
AbstractUpper bound time-space trade-offs are established for sorting and selection in two computati...
AbstractThe arguments used by R. Kannan (1984, Math. Systems Theory17, 29–45), L. Fortnow (1997, in ...
AbstractOn any general sequential model of computation with random-access input (e.g., a logarithmic...
AbstractThis paper establishes time-space tradeoffs for some algebraic problems in the branching pro...
AbstractRecent research has investigated time-space tradeoffs for register allocation strategies of ...
We prove the first time-space lower bound tradeoffs for randomized computation of decision problems....
AbstractThis paper initiates the study of communication complexity when the processors have limited ...
Abstract. An optimal (n2) lower bound is shown for the time-space product of any R-way branching pro...
A model has been developed to permit analysis of the expected execution-time performance of Fourier ...
An optimal R(n2) lower bound is shown for the time-space product of any R-way branching pro-gram tha...
We compare several algorithms for computing the discrete Fourier transform of n numbers. The number ...
International audienceWe present an algorithm that computes the product of two n-bit integers in O(n...
AbstractA VLSI computation model is presented with a time dimension in which the concept of informat...
The complexity of the Discrete Fourier Transform (DFT) is studied with respect to a new model of com...
AbstractTwo models for very-large scale integrated (VLSI) semiconductor circuits are considered that...
AbstractUpper bound time-space trade-offs are established for sorting and selection in two computati...
AbstractThe arguments used by R. Kannan (1984, Math. Systems Theory17, 29–45), L. Fortnow (1997, in ...
AbstractOn any general sequential model of computation with random-access input (e.g., a logarithmic...
AbstractThis paper establishes time-space tradeoffs for some algebraic problems in the branching pro...
AbstractRecent research has investigated time-space tradeoffs for register allocation strategies of ...
We prove the first time-space lower bound tradeoffs for randomized computation of decision problems....
AbstractThis paper initiates the study of communication complexity when the processors have limited ...
Abstract. An optimal (n2) lower bound is shown for the time-space product of any R-way branching pro...
A model has been developed to permit analysis of the expected execution-time performance of Fourier ...
An optimal R(n2) lower bound is shown for the time-space product of any R-way branching pro-gram tha...
We compare several algorithms for computing the discrete Fourier transform of n numbers. The number ...
International audienceWe present an algorithm that computes the product of two n-bit integers in O(n...
AbstractA VLSI computation model is presented with a time dimension in which the concept of informat...
The complexity of the Discrete Fourier Transform (DFT) is studied with respect to a new model of com...
AbstractTwo models for very-large scale integrated (VLSI) semiconductor circuits are considered that...
AbstractUpper bound time-space trade-offs are established for sorting and selection in two computati...
AbstractThe arguments used by R. Kannan (1984, Math. Systems Theory17, 29–45), L. Fortnow (1997, in ...