# Ruben Specogna

According to our database

Collaborative distances:

^{1}, Ruben Specogna authored at least 16 papers between 2010 and 2019.Collaborative distances:

## Timeline

#### Legend:

Book In proceedings Article PhD thesis Other## Links

#### On csauthors.net:

## Bibliography

2019

Estimating the Volume of Unknown Inclusions in an Electrically Conducting Body with Voltage Measurements.

Sensors, 2019

Novel sensor to measure the volume of growth for in vitro bioassays.

Proceedings of the IEEE Sensors Applications Symposium, 2019

2018

Efficient construction of 2-chains representing a basis of H 2 ( Ω ¯ , ∂ Ω ; ℤ ) $H_{2}(\overline {\Omega }, \partial {\Omega }; \mathbb {Z})$.

Adv. Comput. Math., 2018

2017

Efficient Construction of 2-Chains with a Prescribed Boundary.

SIAM J. Numer. Anal., 2017

2016

An a posteriori-driven adaptive Mixed High-Order method with application to electrostatics.

J. Comput. Phys., 2016

2015

Modeling of anechoich chambers with equivalent materials and equivalent sources.

CoRR, 2015

2014

Extraction of VLSI Multiconductor Transmission Line Parameters by Complementarity.

IEEE Trans. Very Large Scale Integr. Syst., 2014

Topology Preserving Thinning of Cell Complexes.

IEEE Trans. Image Process., 2014

Computation of stationary 3D halo currents in fusion devices with accuracy control.

J. Comput. Phys., 2014

2013

Combined Electro-Optical Imaging for the Time Evolution of White Thrombus Growth in Artificial Capillaries.

IEEE Trans. Instrumentation and Measurement, 2013

Physics inspired algorithms for (co)homology computations of three-dimensional combinatorial manifolds with boundary.

Comput. Phys. Commun., 2013

2012

A Discrete Geometric Approach to Cell Membrane and Electrode Contact Impedance Modeling.

IEEE Trans. Biomed. Engineering, 2012

Physics inspired algorithms for (co)homology computation

CoRR, 2012

2011

A discrete geometric approach to solving time independent Schrödinger equation.

J. Comput. Phys., 2011

2010

Critical Analysis of the Spanning Tree Techniques.

SIAM J. Numer. Anal., 2010

A new set of basis functions for the discrete geometric approach.

J. Comput. Phys., 2010