Sampling and reconstructing diffusion fields in presence of aliasing

The reconstruction of a diffusion field, such as temperature, from samples collected by a sensor network is a classical inverse problem and it is known to be ill-conditioned. Previous work considered source models, such as sparse sources, to regularize the solution. Here, we consider uniform spatial sampling and reconstruction by classical interpolation techniques for those scenarios where the spatial sparsity of the sources is not realistic. We show that even if the spatial bandwidth of the field is infinite, we can exploit the natural low-pass filter given by the diffusion phenomenon to bound the aliasing error.

[1]  Martin Vetterli,et al.  Spatial super-resolution of a diffusion field by temporal oversampling in sensor networks , 2009, 2009 IEEE International Conference on Acoustics, Speech and Signal Processing.

[2]  Martin Vetterli,et al.  Sampling and reconstructing diffusion fields with localized sources , 2011, 2011 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[3]  J. C. Jaeger,et al.  Conduction of Heat in Solids , 1952 .

[4]  John M. Stockie,et al.  The Mathematics of Atmospheric Dispersion Modeling , 2011, SIAM Rev..

[5]  David Atienza,et al.  EigenMaps: Algorithms for optimal thermal maps extraction and sensor placement on multicore processors , 2012, DAC Design Automation Conference 2012.

[6]  Steffen Beirle,et al.  Weekly cycle of NO 2 by GOME measurements: a signature of anthropogenic sources , 2003 .

[7]  R. Smullyan ANNALS OF MATHEMATICS STUDIES , 1961 .

[8]  T. Ha-Duong,et al.  On an inverse source problem for the heat equation. Application to a pollution detection problem , 2002 .

[9]  Martin Vetterli,et al.  Sampling and reconstruction of time-varying atmospheric emissions , 2012, 2012 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[10]  Martin Vetterli,et al.  Distributed spatio-temporal sampling of diffusion fields from sparse instantaneous sources , 2009, 2009 3rd IEEE International Workshop on Computational Advances in Multi-Sensor Adaptive Processing (CAMSAP).

[11]  C.E. Shannon,et al.  Communication in the Presence of Noise , 1949, Proceedings of the IRE.

[12]  Toon van Waterschoot,et al.  Static field estimation using a wireless sensor network based on the finite element method , 2011, 2011 4th IEEE International Workshop on Computational Advances in Multi-Sensor Adaptive Processing (CAMSAP).

[13]  Toon van Waterschoot,et al.  Distributed estimation of static fields in wireless sensor networks using the finite element method , 2012, 2012 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[14]  P. Hansen Rank-Deficient and Discrete Ill-Posed Problems: Numerical Aspects of Linear Inversion , 1987 .