AbstractThis paper initiates the study of communication complexity when the processors have limited work space. The following trade-offs between the number C of communications steps and space S are proved: 1.1. For multiplying two n × n matrices in the arithmetic model with two-way communication, CS = Θ(n3).2.2. For convolution of two degree n polynomials in the arithmetic model with two-way communication, CS = Θ(n2).3.3. For multiplying an n × n matrix by an n-vector in the Boolean model with one-way communication, CS = Θ(n2).In contrast, the discrete Fourier transform and sorting can be accomplished in O(n) communication steps and O(log n) space simultaneously, and the search problems of Karchmer and Wigderson associated with any language...
This lecture builds on the material from our first lecture, providing more tools for studying commun...
In the past thirty years, Communication Complexity has emerged as a foundational tool to proving low...
We derive lower bounds for tradeoffs between the communication C and space S for communicating circu...
This paper initiates the study of communication complexity when the processors have limited work spa...
AbstractThis paper initiates the study of communication complexity when the processors have limited ...
Abstract. This paper introduces communicating branching programs and develops a general technique fo...
textA central goal of theoretical computer science is to characterize the limits of efficient compu...
In this paper we propose a new approach to the study of the communication requirements of distribute...
In this paper we propose a new approach to the study of the communication requirements of distribute...
Ph.D. Thesis, Computer Science Dept., U. Rochester, Gary L. Peterson, thesis advisor; simultaneously...
We present lower bounds on the amount of communication that matrix multiplication algorithms must pe...
AbstractOn any general sequential model of computation with random-access input (e.g., a logarithmic...
We study the effect of limited communication throughput on parallel computation in a setting where t...
Communication is a universal process by which two or more individuals exchange information. A commun...
Dense linear algebra computations are essential to nearly every problem in scientific computing and ...
This lecture builds on the material from our first lecture, providing more tools for studying commun...
In the past thirty years, Communication Complexity has emerged as a foundational tool to proving low...
We derive lower bounds for tradeoffs between the communication C and space S for communicating circu...
This paper initiates the study of communication complexity when the processors have limited work spa...
AbstractThis paper initiates the study of communication complexity when the processors have limited ...
Abstract. This paper introduces communicating branching programs and develops a general technique fo...
textA central goal of theoretical computer science is to characterize the limits of efficient compu...
In this paper we propose a new approach to the study of the communication requirements of distribute...
In this paper we propose a new approach to the study of the communication requirements of distribute...
Ph.D. Thesis, Computer Science Dept., U. Rochester, Gary L. Peterson, thesis advisor; simultaneously...
We present lower bounds on the amount of communication that matrix multiplication algorithms must pe...
AbstractOn any general sequential model of computation with random-access input (e.g., a logarithmic...
We study the effect of limited communication throughput on parallel computation in a setting where t...
Communication is a universal process by which two or more individuals exchange information. A commun...
Dense linear algebra computations are essential to nearly every problem in scientific computing and ...
This lecture builds on the material from our first lecture, providing more tools for studying commun...
In the past thirty years, Communication Complexity has emerged as a foundational tool to proving low...
We derive lower bounds for tradeoffs between the communication C and space S for communicating circu...