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Summary: Exploring the interaction of a given set of variables means finding the F's in xi=Fi(xo;t). (Assembling a machine gives us the [xoi=fi(x)] equations). By the independence test on the Second Jacobian Matrix applied in one
stroke we eliminate what is not wanted. That its behaviour is reproducible is equivalent
to the requirement that t is explicitly absent from the f's. This restricts possible F's. An equation is given which they must satisfy. It is proved that under these conditions
the F's are always completed.
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This page references page 1298
This page is referenced from 2 pages: 1298 1319 |
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