We present the first approach to deduce lower bounds for innermost runtime complexity of term rewrite systems (TRSs) automatically. Inferring lower runtime bounds is useful to detect bugs and to complement existing techniques that compute upper complexity bounds. The key idea of our approach is to generate suitable families of rewrite sequences of a TRS and to find a relation between the length of such a rewrite sequence and the size of the first term in the sequence. We implemented our approach in the tool AProVE and evaluated it by extensive experiments
In this paper we introduce a modular framework which allows to infer (feasible) upper bounds on the ...
A simple, efficient, and correct compilation technique for left-linear Term Rewriting Systems (TRSs)...
This thesis is concerned with investigations into the "complexity of term rewriting systems". Moreov...
We present the first approach to deduce lower bounds for innermost runtime complexity of term rewrit...
We present a new method to infer upper bounds on the innermost runtime complexity of term rewrite sy...
Derivational complexity of term rewriting considers the length of the longest rewrite sequence for a...
In this paper, we present a variant of the dependency pair method for analysing runtime complexities...
We revisit parallel-innermost term rewriting as a model of parallel computation on inductive data st...
Besides functional correctness, one of the most important prerequisites for the success of a piece o...
For term rewrite systems (TRSs), a huge number of automated termination analysis tech-niques have be...
We propose a notion of complexity for oriented conditional term rewritesystems satisfying certain re...
We recall the recent approach by (Zankl and Korp, 2010) to prove upper bounds on the (derivational) ...
For any class C of computable total functions satisfying some mild conditions, we prove that the fol...
Based on earlier work on amortised resource analysis, we establish two novel automated amortised res...
We propose a notion of complexity for oriented conditional term rewrite systems. This notion is real...
In this paper we introduce a modular framework which allows to infer (feasible) upper bounds on the ...
A simple, efficient, and correct compilation technique for left-linear Term Rewriting Systems (TRSs)...
This thesis is concerned with investigations into the "complexity of term rewriting systems". Moreov...
We present the first approach to deduce lower bounds for innermost runtime complexity of term rewrit...
We present a new method to infer upper bounds on the innermost runtime complexity of term rewrite sy...
Derivational complexity of term rewriting considers the length of the longest rewrite sequence for a...
In this paper, we present a variant of the dependency pair method for analysing runtime complexities...
We revisit parallel-innermost term rewriting as a model of parallel computation on inductive data st...
Besides functional correctness, one of the most important prerequisites for the success of a piece o...
For term rewrite systems (TRSs), a huge number of automated termination analysis tech-niques have be...
We propose a notion of complexity for oriented conditional term rewritesystems satisfying certain re...
We recall the recent approach by (Zankl and Korp, 2010) to prove upper bounds on the (derivational) ...
For any class C of computable total functions satisfying some mild conditions, we prove that the fol...
Based on earlier work on amortised resource analysis, we establish two novel automated amortised res...
We propose a notion of complexity for oriented conditional term rewrite systems. This notion is real...
In this paper we introduce a modular framework which allows to infer (feasible) upper bounds on the ...
A simple, efficient, and correct compilation technique for left-linear Term Rewriting Systems (TRSs)...
This thesis is concerned with investigations into the "complexity of term rewriting systems". Moreov...