مرکز منطقه ای اطلاع رساني علوم و فناوري - Transient response in an imperfect dielectric

Abstract :

This paper gives the transient electric field response to an electric current element in an infinite linear homogeneous isotropic medium for all values of the parameter $b = r\\sigma \\sqrt {\\mu/\\epsilon}$ upon which its shape depends. It is shown that the response cannot be separated into that resulting from 1) the charge, 2) the current, and 3) its derivative when $b$ is appreciably different from zero. The initial response occurs at the time $t = q = r \\sqrt {\\epsilon \\mu}$ . The radial component of the field is a monotonically increasing function of time approaching a constant asymptote. Its initial value has a maximum of 0.7358 times its final value at $b = 2$ . The shape of the transient changes radically at $b = 2$ . For values of $b > 20$ the initial value is negligible and the response is closely approximated by the asymptotic expression for $b$ large. The tangential component approaches its constant asymptote from larger values. For small $b$ the maximum occurs when $t$ is large. The tangential component is approximately the same as the radial component for $b < frac{1}{2}$ . For larger values of $b$ the maximum occurs at earlier times, occurring when $t = q$ for $2.243 < b < 6.600$ . It has its maximum initial value of 1.692 times its final value for $b = 5.043$ . For values of $b> 6.6$ the maximum occurs at increasingly later times. For $b> 24$ the initial value is negligible and the response is approximated by the asymptotic expression for $b$ large. Curves are given for the response not only as a function of time for various values of $b$ but also as a function of $b$ for various times. Comparison of experiments with these curves will allow the determination of $b$ and, hence, the conductivity. The response is also given as a function of distance for various times. The Bessel function integral involved in this problem has been evaluated and presented in the form of curves for all values of $b$ and all values of $t$ for which it makes an appreciable contribution to the result.