Title :
Statistical Learning Theory of the LMS Algorithm Under Slowly Varying Conditions, Using the Langevin Equation
Author_Institution :
McMaster Univ., Hamilton, ON
fDate :
Oct. 29 2006-Nov. 1 2006
Abstract :
The paper begins with a brief description of the Langevin equation of nonequilibrium thermodynamics. In so doing, I set the stage for analyzing the statistical learning behavior of the standard LMS algorithm, operating under the assumption of a small step-size parameter. In particular, it is shown that by making three justifiable assumptions and then applying the unitary similarity transformation, the transformed formulation of the LMS algorithm takes on the discrete-time version of a Langevin equation for each natural mode of the algorithm. Experimental results are presented, which support practical validity of the LMS learning theory.
Keywords :
learning (artificial intelligence); least mean squares methods; nonequilibrium thermodynamics; statistical analysis; LMS algorithm; Langevin equation; discrete-time version; natural mode; nonequilibrium thermodynamics; slowly varying conditions; statistical learning theory; step-size parameter; unitary similarity transformation; Adaptive filters; Algorithm design and analysis; Brownian motion; Equations; Filtering algorithms; Least squares approximation; Robustness; Statistical learning; Testing; Thermodynamics;
Conference_Titel :
Signals, Systems and Computers, 2006. ACSSC '06. Fortieth Asilomar Conference on
Conference_Location :
Pacific Grove, CA
Print_ISBN :
1-4244-0784-2
Electronic_ISBN :
1058-6393
DOI :
10.1109/ACSSC.2006.356621
