Add to ORKGIn this paper, we examine the problem of incrementally evaluating algebraic functions. In particular, if f(x1, x2, …, xn) = (y1, y2, …, ym) is an algebraic problem, we consider answering on-line requests of the form "change input xi to value v" or "what is the value of output yj?" We first present lower bounds for some simply stated algebraic problems such as multipoint polynomial evaluation, polynomial reciprocal, and extended polynomial GCD, proving an &#x03A9(n). lower bound for the incremental evaluation of these functions. In addition, we prove two time-space trade-off theorems that apply to incremental algorithms for almost all algebraic functions. We then derive several general-purpose algorithm design techniques and apply them t...
Algorithms for the evaluation of polynomials on a hypothetical computer with k independent arithmeti...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
Computational Complexity is concerned with the resources that are required for algorithms to detect ...
AbstractWe consider dynamic evaluation of algebraic functions (matrix multiplication, determinant, c...
We consider dynamic evaluation of algebraic functions (matrix multiplication, determinant, convoluti...
AbstractWe consider dynamic evaluation of algebraic functions (matrix multiplication, determinant, c...
AbstractA common way to evaluate the time complexity of an algorithm is to use asymptotic worst-case...
AbstractA common way to evaluate the time complexity of an algorithm is to use asymptotic worst-case...
An incremental algorithm (also called a dynamic update algorithm) updates the answer to some problem...
A study of the general properties of incremental algorithms is presented. First, it is shown that wi...
AbstractWe exhibit a new method for showing lower bounds for time-space tradeoffs of polynomial eval...
© 2018, Springer International Publishing AG, part of Springer Nature. Using an extension of the not...
AbstractAlgebraic models of real computation and their induced notions of time complexity neglect st...
AbstractThe application of the recent techniques of the design of algebraic algorithms to the sequen...
The research presented focuses on optimization of polynomials using algebraic manipulations at the h...
Algorithms for the evaluation of polynomials on a hypothetical computer with k independent arithmeti...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
Computational Complexity is concerned with the resources that are required for algorithms to detect ...
AbstractWe consider dynamic evaluation of algebraic functions (matrix multiplication, determinant, c...
We consider dynamic evaluation of algebraic functions (matrix multiplication, determinant, convoluti...
AbstractWe consider dynamic evaluation of algebraic functions (matrix multiplication, determinant, c...
AbstractA common way to evaluate the time complexity of an algorithm is to use asymptotic worst-case...
AbstractA common way to evaluate the time complexity of an algorithm is to use asymptotic worst-case...
An incremental algorithm (also called a dynamic update algorithm) updates the answer to some problem...
A study of the general properties of incremental algorithms is presented. First, it is shown that wi...
AbstractWe exhibit a new method for showing lower bounds for time-space tradeoffs of polynomial eval...
© 2018, Springer International Publishing AG, part of Springer Nature. Using an extension of the not...
AbstractAlgebraic models of real computation and their induced notions of time complexity neglect st...
AbstractThe application of the recent techniques of the design of algebraic algorithms to the sequen...
The research presented focuses on optimization of polynomials using algebraic manipulations at the h...
Algorithms for the evaluation of polynomials on a hypothetical computer with k independent arithmeti...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
Computational Complexity is concerned with the resources that are required for algorithms to detect ...