Elli Anastasiadi scite author profile

During recent years the field of fine-grained complexity has bloomed to produce a plethora of results, with both applied and theoretical impact on the computer science community. The cornerstone of the framework is the notion of fine-grained reductions, which correlate the exact complexities of problems such that improvements in their running times or hardness results are carried over. We provide a parameterized viewpoint of these reductions (PFGR) in order to further analyze the structure of improvable problems and set the foundations of a unified methodology for extending algorithmic results. In this context, we define a class of problems (FPI) that admit fixed-parameter improvements on their running time. As an application of this framework we present a truly subquadratic fixed-parameter algorithm for the orthogonal vectors problem. Finally, we provide a circuit characterization for FPI to further solidify the notion of improvement.

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Axiomatizing recursion-free, regular monitors

Aceto¹,

Achilleos²,

Anastasiadi³

et al. 2020

Preprint

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Elli Anastasiadi

In search of lost time: Axiomatising parallel composition in process algebras

On the axiomatisability of priority III: Priority strikes again

Monitoring Hyperproperties with Circuits

Parameterized Fine-Grained Reductions

Axiomatizing recursion-free, regular monitors

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