• Title of article

    A distributed parameter identification problem in neuronal cable theory models

  • Author/Authors

    Bell، نويسنده , , Jonathan and Craciun، نويسنده , , Gheorghe، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2005
  • Pages
    19
  • From page
    1
  • To page
    19
  • Abstract
    Dendritic and axonal processes of nerve cells, along with the soma itself, have membranes with spatially distributed densities of ionic channels of various kinds. These ionic channels play a major role in characterizing the types of excitable responses expected of the cell type. These densities are usually represented as constant parameters in neural models because of the difficulty in experimentally estimating them. However, through microelectrode measurements and selective ion staining techniques, it is known that ion channels are non-uniformly spatially distributed. This paper presents a non-optimization approach to recovering a single spatially non-uniform ion density through use of temporal data that can be gotten from recording microelectrode measurements at the ends of a neural fiber segment of interest. The numerical approach is first applied to a linear cable model and a transformed version of the linear model that has closed-form solutions. Then the numerical method is shown to be applicable to non-linear nerve models by showing it can recover the potassium conductance in the Morris–Lecar model for barnacle muscle, and recover the spine density in a continuous dendritic spine model by Baer and Rinzel.
  • Keywords
    Variable conductance , Morris-Lecar model , Ion channel density , inverse problems , Distributed parameters , Cable theory
  • Journal title
    Mathematical Biosciences
  • Serial Year
    2005
  • Journal title
    Mathematical Biosciences
  • Record number

    1588842