TY - JOUR
T1 - Reducing probability of decision error using stochastic resonance
AU - Kay, Steven
AU - Michels, James H.
AU - Chen, Hao
AU - Varshney, Pramod K.
PY - 2006/11
Y1 - 2006/11
N2 - The problem of reducing the probability of decision error of an existing binary receiver that is suboptimal using the ideas of stochastic resonance is solved. The optimal probability density function of the random variable that should be added to the input is found to be a Dirac delta function, and hence, the optimal random variable is a constant. The constant to be added depends upon the decision regions and the probability density functions under the two hypotheses and is illustrated with an example. Also, an approximate procedure for the constant determination is derived for the mean-shifted binary hypothesis testing problem.
AB - The problem of reducing the probability of decision error of an existing binary receiver that is suboptimal using the ideas of stochastic resonance is solved. The optimal probability density function of the random variable that should be added to the input is found to be a Dirac delta function, and hence, the optimal random variable is a constant. The constant to be added depends upon the decision regions and the probability density functions under the two hypotheses and is illustrated with an example. Also, an approximate procedure for the constant determination is derived for the mean-shifted binary hypothesis testing problem.
KW - Modeling
KW - Pattern classification
KW - Signal detection
UR - http://www.scopus.com/inward/record.url?scp=33750141554&partnerID=8YFLogxK
U2 - 10.1109/LSP.2006.879455
DO - 10.1109/LSP.2006.879455
M3 - Article
AN - SCOPUS:33750141554
SN - 1070-9908
VL - 13
SP - 695
EP - 698
JO - IEEE Signal Processing Letters
JF - IEEE Signal Processing Letters
IS - 11
ER -