In the context of abstract interpretation for languages without higher-order features we study the number of times a functional need to be unfolded in order to give the least fixed point. For the cases of total or monotone functions we obtain an exponential bound and in the case of strict and additive (or distributive) functions we obtain a quadratic bound. These bounds are shown to be tight in that sufficiently long chains of functions can be shown to exist. Specializing the case of strict and additive functions to functionals of a form that would correspond to iterative programs we show that a linear bound is tight. This is related to several analyses studied in the literature (including strictness analysis)
Deficiency in expressive power of the first-order logic has led to developing its numerous extension...
This paper develops a transformational paradigm by which nonnumerical algorithms are treated as fixe...
AbstractWe show that for several classes of idempotent semirings the least fixed-point of a polynomi...
In the context of abstract interpretation for languages without higher-order features we study the n...
This paper provides a link between the formulation of static program analyses using the framework o...
We give upper bounds on the number of times the fixed point operator needs to be unfolded for strict...
AbstractMuch of the earlier development of abstract interpretation, and its application to imperativ...
Abstract. Our aim is to show that techniques from higher-order strict-ness analysis may be used as a...
We investigate the complexity of the fixed-points of bounded formulas in the context of finite set...
AbstractThis paper develops a transformational paradigm by which nonnumerical algorithms are treated...
This report features an introduction to lattice- and fixpoint theory and a survey of methods and re...
. We present a new fixpoint theorem which guarantees the existence and the finite computability of t...
[eng] The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursiv...
AbstractAfter a simple and convenient generalization of the notion of continuous functions and conti...
AbstractThis paper gives a generalization of a result by Matiyasevich which gives explicit rates of ...
Deficiency in expressive power of the first-order logic has led to developing its numerous extension...
This paper develops a transformational paradigm by which nonnumerical algorithms are treated as fixe...
AbstractWe show that for several classes of idempotent semirings the least fixed-point of a polynomi...
In the context of abstract interpretation for languages without higher-order features we study the n...
This paper provides a link between the formulation of static program analyses using the framework o...
We give upper bounds on the number of times the fixed point operator needs to be unfolded for strict...
AbstractMuch of the earlier development of abstract interpretation, and its application to imperativ...
Abstract. Our aim is to show that techniques from higher-order strict-ness analysis may be used as a...
We investigate the complexity of the fixed-points of bounded formulas in the context of finite set...
AbstractThis paper develops a transformational paradigm by which nonnumerical algorithms are treated...
This report features an introduction to lattice- and fixpoint theory and a survey of methods and re...
. We present a new fixpoint theorem which guarantees the existence and the finite computability of t...
[eng] The celebrated Kleene fixed point theorem is crucial in the mathematical modelling of recursiv...
AbstractAfter a simple and convenient generalization of the notion of continuous functions and conti...
AbstractThis paper gives a generalization of a result by Matiyasevich which gives explicit rates of ...
Deficiency in expressive power of the first-order logic has led to developing its numerous extension...
This paper develops a transformational paradigm by which nonnumerical algorithms are treated as fixe...
AbstractWe show that for several classes of idempotent semirings the least fixed-point of a polynomi...