info:oai:cogprints.org:102info:ofi/fmt:xml:xsd:oai_dc
Statistical mechanics of neocortical interactions: Stability and duration of the 7+-2 rule of short-term-memory capacity
Ingber, Lester
Computational Neuroscience
Statistical Models
This paper is an essential addendum to L. Ingber, ``Statistical mechanics of neocortical interactions. Derivation of short-term-memory capacity,'' Phys. Rev. A 29, 3346-3358 (1984). Calculations are presented here to support the claim there, that there exists an approximate one-dimensional solution to the two-dimensional neocortical Fokker-Planck equation. This solution is extremely useful, not only to obtain a closed algebraic expression for the time of first passage, but also to establish that minima of the associated path-integral stationary Lagrangian are indeed stable points of the transient dynamic system. Also, a relatively nontechnical summary is given of the basic theory.
1985
Journal (Paginated)
PeerReviewed
application/postscript
http://cogprints.org/102/2/smni85_stm.ps
Ingber, Lester (1985) Statistical mechanics of neocortical interactions: Stability and duration of the 7+-2 rule of short-term-memory capacity. [Journal (Paginated)]
http://cogprints.org/102/