TY - GEN
T1 - Information theoretic principles of universal discrete denoising
AU - Ncotzel, Janis
AU - Winter, Andreas
N1 - Publisher Copyright:
© 2017 IEEE.
PY - 2017/11/14
Y1 - 2017/11/14
N2 - Social media platforms make tremendous amounts of data available. Often times, the same information is behind multiple different available data sets. This lends growing importance to latent variable models that try to learn the hidden information from the available imperfect versions. For example, social media platforms can contain an abundance of pictures of the same person, yet all of which are taken from different perspectives. In a simplified scenario, one may consider pictures taken from the same perspective, which are distorted by noise. This latter application allows for a rigorous mathematical treatment, which is the content of this contribution. We apply a recently developed method of dependent component analysis to image denoising when multiple distorted copies of one and the same image are available, each being corrupted by a different and unknown noise process. In a simplified scenario, one may assume such a distorted image to be corrupted by noise that acts independently on each pixel. We answer completely the question of how to perform optimal denoising, when at least three distorted copies are available: First we define optimality of an algorithm in the presented scenario, and then we describe an aymptotically optimal universal discrete denoising algorithm (UDDA).
AB - Social media platforms make tremendous amounts of data available. Often times, the same information is behind multiple different available data sets. This lends growing importance to latent variable models that try to learn the hidden information from the available imperfect versions. For example, social media platforms can contain an abundance of pictures of the same person, yet all of which are taken from different perspectives. In a simplified scenario, one may consider pictures taken from the same perspective, which are distorted by noise. This latter application allows for a rigorous mathematical treatment, which is the content of this contribution. We apply a recently developed method of dependent component analysis to image denoising when multiple distorted copies of one and the same image are available, each being corrupted by a different and unknown noise process. In a simplified scenario, one may assume such a distorted image to be corrupted by noise that acts independently on each pixel. We answer completely the question of how to perform optimal denoising, when at least three distorted copies are available: First we define optimality of an algorithm in the presented scenario, and then we describe an aymptotically optimal universal discrete denoising algorithm (UDDA).
KW - blind detection
KW - hidden variable
KW - image denoising
KW - internet of things
KW - latent variable
UR - http://www.scopus.com/inward/record.url?scp=85041438367&partnerID=8YFLogxK
U2 - 10.1109/ISWCS.2017.8108111
DO - 10.1109/ISWCS.2017.8108111
M3 - Conference contribution
AN - SCOPUS:85041438367
T3 - Proceedings of the International Symposium on Wireless Communication Systems
SP - 205
EP - 210
BT - 2017 International Symposium on Wireless Communication Systems, ISWCS 2017
PB - VDE VERLAG GMBH
T2 - 2017 International Symposium on Wireless Communication Systems, ISWCS 2017
Y2 - 28 August 2017 through 31 August 2017
ER -