We study two quite different approaches to understanding the complexity of fundamental problems in numerical analysis: • The Blum-Shub-Smale model of computation over the reals. • A problem we call the “Generic Task of Numerical Computation, ” which captures an aspect of doing numerical computation in floating point, similar to the “long exponent model ” that has been studied in the numerical computing community. We show that both of these approaches hinge on the question of understanding the complexity of the following problem, which we call PosSLP: Given a division-free straight-line program producing an integer N, decide whether N>0. • In the Blum, Shub, Smale model, polynomial time computation over the reals (on discrete inputs) is p...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
AbstractIn the real number model of computation one assumes that arithmetic operations with real num...
objects encountered in analysis, such as real functions, from the viewpoints of computability and co...
We study two quite different approaches to understanding the complexity of fundamental problems in n...
AbstractThis paper deals with issues of structural complexity in a linear version of the Blum-Shub-S...
The classical (Turing) theory of computation has been extraordinarily successful in providing the fo...
Arithmetic Circuits compute polynomial functions over their inputs via a sequence of arithmetic oper...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
Computable analysis studies problems involving real numbers, sets and functions from the viewpoint o...
Naive computations with real numbers on computers may cause serious errors. In traditional numerical...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
In this thesis, we present some results in computational complexity. We consider two approaches for ...
AbstractThe real-number model of computation is used in computational geometry, in the approach sugg...
Computational Complexity is concerned with the resources that are required for algorithms to detect ...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
AbstractIn the real number model of computation one assumes that arithmetic operations with real num...
objects encountered in analysis, such as real functions, from the viewpoints of computability and co...
We study two quite different approaches to understanding the complexity of fundamental problems in n...
AbstractThis paper deals with issues of structural complexity in a linear version of the Blum-Shub-S...
The classical (Turing) theory of computation has been extraordinarily successful in providing the fo...
Arithmetic Circuits compute polynomial functions over their inputs via a sequence of arithmetic oper...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
Computable analysis studies problems involving real numbers, sets and functions from the viewpoint o...
Naive computations with real numbers on computers may cause serious errors. In traditional numerical...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
In this thesis, we present some results in computational complexity. We consider two approaches for ...
AbstractThe real-number model of computation is used in computational geometry, in the approach sugg...
Computational Complexity is concerned with the resources that are required for algorithms to detect ...
At its core, much of Computational Complexity is concerned with combinatorial objects and structures...
AbstractIn the real number model of computation one assumes that arithmetic operations with real num...
objects encountered in analysis, such as real functions, from the viewpoints of computability and co...