Add to ORKGReal PCF is an extension of the programming language PCF with a data type for real numbers. Although a Real PCF definable real number cannot be computed in finitely many steps, it is possible to compute an arbitrarily small rational interval containing the real number in a sufficiently large number of steps. Based on a domain-theoretic approach to integration, we show how to define integration in Real PCF. We propose two approaches to integration in Real PCF. One consists in adding integration as primitive. The other consists in adding a primitive for maximization of functions and then recursively defining integration from maximization. In both cases we have an adequacy theorem for the corresponding extension of Real PCF. Moreover, based on...
In [2] we presented a Definite Integral Table Lookup (the DITLU) for parametric functions, including...
An intensional model for the programming language PCF is described in which the types of PCF are int...
Abstract Recently, functions over the reals that extend elementarily computable functions over the i...
AbstractReal PCF is an extension of the programming language PCF with a data type for real numbers. ...
) Mart'in Hotzel Escard'o Department of Computing, Imperial College, London SW7 2BZ. Frid...
AbstractThe partial real line is an extension of the Euclidean real line with partial real numbers, ...
AbstractWe extend the programming language PCF with a type for (total and partial) real numbers. By ...
We develop a theory of higher-order exact real number computation based on Scott domain theory. Our ...
The main goal of this research project is to develop a functional programming language to perform re...
AbstractThis paper addresses the topic of the refinement of exact real numbers. It presents a three-...
AbstractThere have been many suggestions for what should be a computable real number or function. So...
AbstractIn recent years, there has been a considerable amount of work on using continuous domains in...
We provide a semantical framework for exact real arithmetic using linear fractional transformations ...
We introduce majorant computability of functions on reals. A structural theorem is proved, which con...
In recent years, there has been a considerable amount of work on using continuous domains in real an...
In [2] we presented a Definite Integral Table Lookup (the DITLU) for parametric functions, including...
An intensional model for the programming language PCF is described in which the types of PCF are int...
Abstract Recently, functions over the reals that extend elementarily computable functions over the i...
AbstractReal PCF is an extension of the programming language PCF with a data type for real numbers. ...
) Mart'in Hotzel Escard'o Department of Computing, Imperial College, London SW7 2BZ. Frid...
AbstractThe partial real line is an extension of the Euclidean real line with partial real numbers, ...
AbstractWe extend the programming language PCF with a type for (total and partial) real numbers. By ...
We develop a theory of higher-order exact real number computation based on Scott domain theory. Our ...
The main goal of this research project is to develop a functional programming language to perform re...
AbstractThis paper addresses the topic of the refinement of exact real numbers. It presents a three-...
AbstractThere have been many suggestions for what should be a computable real number or function. So...
AbstractIn recent years, there has been a considerable amount of work on using continuous domains in...
We provide a semantical framework for exact real arithmetic using linear fractional transformations ...
We introduce majorant computability of functions on reals. A structural theorem is proved, which con...
In recent years, there has been a considerable amount of work on using continuous domains in real an...
In [2] we presented a Definite Integral Table Lookup (the DITLU) for parametric functions, including...
An intensional model for the programming language PCF is described in which the types of PCF are int...
Abstract Recently, functions over the reals that extend elementarily computable functions over the i...