Francesca Vipiana
Polytechnic University of Turin
262 Papers
630 Citations
Francesca Vipiana is an academic researcher from Polytechnic University of Turin. The author has contributed to research in topics: Integral equation & Basis function. The author has an hindex of 22, co-authored 224 publications. Previous affiliations of Francesca Vipiana include Istituto Superiore Mario Boella.
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Papers
Performances of MR-preconditioned fast MoM techniques
TL;DR: The integration of a multiresolution (MR) approach into a few fast factorization methods for the method‐of‐moments (MoM), with specific attention to the analysis of large nonperiodic arrays is described.
Non overlapping Domain Decomposition based on Discontinuous Galerkin and enhanced transmission conditions for multi-scale structures
M. A. Echeverri Bautista,Francesca Vipiana,Giuseppe Vecchi,Matteo Alessandro Francavilla +3 more
- 06 Jul 2014
TL;DR: A Non overlapping Domain Decomposition (DDM) strategy is proposed, to solve the ill-conditioning in multi-scale PEC structures, using the Discontinuous Galerkin (DG) formulation.
Experimental Validation of a Microwave Brain Scanner for Cerebrovascular Diseases Monitoring
J. A. Tobon Vasquez,Rosa Scapaticci,Giovanna Turvani,Gennaro Bellizzi,Nadine Joachimowicz,Bernard Duchêne,Mario R. Casu,Lorenzo Crocco,Francesca Vipiana +8 more
- 07 Jul 2019
TL;DR: The experimental testing of a novel device able to monitor cerebrovascular diseases, whose realization is based on microwave imaging technology is reported about.
Evaluation of 6-D MoM Integrals by Application of the Divergence Theorem with Singularity Subtraction Acceleration
J. Rivero,Francesca Vipiana,Donald R. Wilton,William A. Johnson +3 more
- 22 Mar 2021
TL;DR: In this paper, the divergence theorem is used to reduce both source and test integrals to surface integrals and smoothing the surface integrand is provided by first removing the static asymptotic form of the integrand from the integral, then restoring its contribution as a closed form integral whose removal accelerates convergence of the difference integral.
MoM-oriented array Green’s function for the analysis of large finite arrays
Alessia Polemi,Francesca Vipiana,F. Mariottini,Giuseppe Vecchi,Stefano Maci +4 more
- 05 Jul 2008
TL;DR: The windowing approach, although the number of unknowns does not decrease, the treatment of each element is attributed to the solution of an independent integral equation, thus reducing the complex problem to the inversion of a large number of small size problems that can be efficiently computed collectively in terms of FWs.