to perform the kind of merge I want. Basically:
I have a series of three integers, each representing a radius measure:
Radii[0-2]
I have a three sets of series of 3Dpoints, each set with ~100-400 vals:
PListOne[0-333]
PListTwo[0-333]
PListThree[0-333]
I want to link the data paths up so that the Radii form the first dimension of the array, and that the second dimension is the corresponding points set. So
Radii[0] = 500 (the radius)
Radii[0][0] = 50,75,0 (the first point in PListOne)
...
Radii[2][99] = 44,66,0 (the 100th point in PListThree)
This should be really simple, but I cant seem tog et my head around the right components to do it. I've attached a file with number series in place of the radii/points lists. If someone could show me how to merge the components in the manner above, it would be extremely appreciated.…
all the other rules.
2. No Flattening! use path shift / trim tree instead of flattening.
3. No Path Mapper! I have never met a data operation with the path mapper that could not be achieved through relative means.
4. No Simplify! It makes things *look* nicer but believe it or not those zeros are meaningful and shouldn't just be eliminated. If you are OCD about the way your paths look, then Path shift after every operation that introduces a new branch level (a new "0" at the end) IF AND ONLY IF you are sure that in the case of your definition the component will always function "1 to 1" - that is, for every single input there is only one output.
5. If you absolutely must flatten (to take a global bounds, or generate random values for every item, or whatever) be sure to Unflatten before continuing.
6. Design for the worst case - start with primary inputs in the most complex data structure your definition is likely to need to be able to handle (a tree for instance) rather than a single item.
If you follow the above rules, 99% of the time your definitions will respond appropriately to any change in upstream data structure. If you want an example of how this works in practice, post your definition and I can help find "relative" approaches to the "absolute" things you are currently doing. …