analog57
10-31-04, 03:31 PM
How can Stokes Theorem be used describe a succession of 2 dimensional
surfaces, all causally connected? The surfaces would all be closed
geometric forms. An example would be the 2 dimensional surface of a 3
dimensional sphere. The the successive surfaces would be iterations
from previous outer surfaces, where the next surface is "inside" or
projected inwardly becoming an inner shell, from the larger previous
iteration, and the future iteration would be projected outwardly to
the outer shells. The past and future would be perfectly symmetrical
and interchangeable. The past could be the inward surfaces projected
outwardly also. There would be no x-y plane to use as an outside
reference though. At most, the x-y plane would be equilateral
dissections of the n-dimensional surfaces. How can it be done?
surfaces, all causally connected? The surfaces would all be closed
geometric forms. An example would be the 2 dimensional surface of a 3
dimensional sphere. The the successive surfaces would be iterations
from previous outer surfaces, where the next surface is "inside" or
projected inwardly becoming an inner shell, from the larger previous
iteration, and the future iteration would be projected outwardly to
the outer shells. The past and future would be perfectly symmetrical
and interchangeable. The past could be the inward surfaces projected
outwardly also. There would be no x-y plane to use as an outside
reference though. At most, the x-y plane would be equilateral
dissections of the n-dimensional surfaces. How can it be done?