• DocumentCode
    2749360
  • Title

    Lambda functions for dipole applications

  • Author

    Ramsay, J.

  • Author_Institution
    A Div. of Cutler-Hammer Inc., Deer Park, Long Island, NY, USA
  • Volume
    14
  • fYear
    1966
  • fDate
    21-25 March 1966
  • Firstpage
    186
  • Lastpage
    199
  • Abstract
    Lambda functions, a class of functions resembling the Bessel functions, have many applications in antenna theory. This paper shows their application to describe some of the properties of dipoles. The field components of an electrically short dipole are usually expressed in terms of the inverse distance 1/r and its powers 1/r^{2} and 1/r^{3} . It is shown that the functions containing r are Lambda functions. The field components can then be concisely expressed in Lambda notation and the range dependence is easily determined from standard tables and graphs of the Lambda functions. The Lambda characterization of the field arises from the vector potential being itself a simple Lambda function. Lambda functions then enter into applications of short dipoles and simplify the descriptions. Examples are given in respect of mutual coupling, gain formulas, and lines of force. The paper contains a short account of the definitions and properties of the Lambda functions required for the dipole applications.
  • Keywords
    Antenna theory; Conferences; Dipole antennas; Electric potential; Equations; Instruments; Kelvin; Laboratories; Magnetic moments; Mutual coupling;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    1958 IRE International Convention Record
  • Conference_Location
    New York, NY, USA
  • Type

    conf

  • DOI
    10.1109/IRECON.1966.1147689
  • Filename
    1147689