There are six unknowns, the components of Q and vector omega because omega sub 0 has been assumed to be zero, and five equations, not six equations as in the note. So more equations are needed as in Note 380(4).

To: EMyrone@aol.com

Sent: 25/06/2017 16:01:44 GMT Daylight Time

Subj: Re: 380(3): General Evaluation of omega and Q

Eq. (7) is exactly one scalar equation, therefore (2), (7) and (14) are obviously 5 equations, not 6.

Horst

Am 23.06.2017 um 14:02 schrieb EMyrone:

This note gives some more schemes of evaluation of the ECE2 field equations and lagrangian for computation. The equations are written out in three dimensions. If the “radiation gauge approximation” (11) is used, i.e. it is assumed that the spin connection has no timelike component, the problem of finding vector omega and vector Q can be solved completely by computer because there are six equations in six unknowns. The spin connection and Q vectors for retrograde precession are given by Eq. (26), and for forward precession by Eq. (27). If the potential is approximated by the Hooke Newton potential of gravitostatics, the problem can be solved completely as indicated. The next note will deal with the Biefeld Brown effect in more detail.

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