Internal inductance versus external inductance

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Presentation transcript:

Internal inductance versus external inductance Example. Magnetic-Head Connector (MHC) Configuration of high speed magnetic head connector. Simulation only demonstrates current distribution in ground plane and in the two circular wires at 1 GHz. Courteously performed under financial support of W.L. Gore EEE340 Lecture 26

Current distribution in the ground plane EEE340 Lecture 26

Magnetic Head Connector - 3 Fig. 6: Current distribution in the left and right circular wire EEE340 Lecture 26

Measurement and simulation Results for MHC Measurements from 1 MHz to 1 GHz Fig. 9: Self and mutual resistances, R11, R12 by different methods EEE340 Lecture 26

Measurement and Simulation Results Self and mutual resistances, L11, L12 by different methods Quasi-static error may exceed 300%!! EEE340 Lecture 26

The work done by the field (to establish magnetic fields) is 6-12: Magnetic Energy Consider a single closed loop of inductance L1 without initial current. The work done by the field (to establish magnetic fields) is W1 is the stored magnetic energy. (6.157) (6.158) EEE340 Lecture 26

For a two-loop system, V21 Similarly, The total energy (6.159) (6.160) (6.161) EEE340 Lecture 26

Generalizing the result to a system of n loops carrying currents I1, I2, …, In where (6.162) (6.166) EEE340 Lecture 26

6-12.1: Magnetic energy in terms of fields Using The magnetic energy (6.166) becomes where As (6.167) (6.169) EEE340 Lecture 26

From vector identities, we can obtain where the integrand is magnetic energy density, From the stored magnetic energy one can evaluate the Inductance of a system/circuit: (6-172) (6-174) (6-175) EEE340 Lecture 26

Example 6-18 Mutual inductance. Two coils of N1 and N2 terns are wound on a cylinder core of radius a and permeability The windings are of lengths Find the mutual inductance. Solution. The magnetic flux l2 l1 b a EEE340 Lecture 26

Since coil 2 has N2 turns, we have the linkage The magnetic coupling coefficient The best coupling is k=1 of no leakage flux (a=b, l1=l2) (6-151) (6-135) EEE340 Lecture 26