In this work, we revisit the theory of stochastic
electromagnetic fields using exterior differential forms. We
present a short overview as well as a brief introduction to the
application of differential forms in electromagnetic theory.
Within the framework of exterior calculus we derive equations
for the second order moments, describing stochastic
electromagnetic fields. Since the resulting objects are continuous
quantities in space, a discretization scheme based on
the Method of Moments (MoM) is introduced for numerical
treatment. The MoM is applied in such a way, that the
notation of exterior calculus is maintained while we still arrive
at the same set of algebraic equations as obtained for the
case of formulating the theory using the traditional notation
of vector calculus. We conclude with an analytic calculation
of the radiated electric field of two Hertzian dipole, excited
by uncorrelated random currents.
«
In this work, we revisit the theory of stochastic
electromagnetic fields using exterior differential forms. We
present a short overview as well as a brief introduction to the
application of differential forms in electromagnetic theory.
Within the framework of exterior calculus we derive equations
for the second order moments, describing stochastic
electromagnetic fields. Since the resulting objects are continuous
quantities in space, a discretization scheme based on
the Method of Moments...
»
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