Barrio Garrido, Rosa MaríaGarcía Castillo, Luis EmilioGómez Revuelto, IgnacioSalazar Palma, Magdalena2022-09-262022-09-262016-05-010898-1221https://hdl.handle.net/10016/35780To alleviate the computational bottleneck of a powerful two-dimensional self-adaptive hp finite element method (FEM) for the analysis of open region problems, which uses an iterative computation of the Integral Equation over a fictitious boundary for truncating the FEM domain, we propose the use of Adaptive Cross Approximation (ACA) to effectively accelerate the computation of the Integral Equation. It will be shown that in this context ACA exhibits a robust behavior, yields good accuracy and compression levels up to 90%, and provides a good fair control of the approximants, which is a crucial advantage for hp adaptivity. Theoretical and empirical results of performance (computational complexity) comparing the accelerated and non-accelerated versions of the method are presented. Several canonical scenarios are addressed to resemble the behavior of ACA with h, p and hp adaptive strategies, and higher order methods in general.22eng© 2016 Elsevier Ltd.Finite element methodAdaptive cross approximationHp-adaptivityOpen region scattering problemsFast methodPec scattering problemsRadiation problemsElectromagnetic scatteringAlgorithmMatricesWavesresearch articleInformáticaMatemáticashttps://doi.org/10.1016/j.camwa.2016.02.030open access1911101932Computers & Mathematics with Applications71AR/0000017882