# Weird behavior of InterpolationOrder option of Interpolation

When trying to recreate an `InterpolationFunction` produced by `NDSolve` I faced very strange problem with `InterpolationOrder` option of `Interpolation`. Consider the following `InterpolationFunction` (an example function from the Documentation):

``````ifun = First[
x /. NDSolve[{x'[t] == Exp[x[t]] - x[t], x[0] == 1}, x, {t, 0, 10}]]
``````

Now let us to try to reconstruct it. Here is the data:

``````Needs["DifferentialEquations`InterpolatingFunctionAnatomy`"]
data = Transpose@{InterpolatingFunctionGrid[ifun],
InterpolatingFunctionValuesOnGrid[ifun]};
``````

And here is `InterpolationOrder`:

``````interpolationOrder = InterpolatingFunctionInterpolationOrder[ifun]
(*=> {3}*)
``````

Now we try to construct the `InterpolatingFunction`:

``````Interpolation[data, InterpolationOrder -> interpolationOrder];
``````

and get error `Message`:

Interpolation::inord: Value of option InterpolationOrder -> {3} should be a non-negative machine-sized integer or a list of integers with length equal to the number of dimensions, 1. >>

But if we specify `InterpolationOrder` by hands, it is OK:

``````Interpolation[data, InterpolationOrder -> {3}]
(*=> InterpolatingFunction[{{0.,0.516019}},<>]*)
``````

Can anyone explain why `InterpolationOrder -> interpolationOrder` does not work while `InterpolationOrder -> {3}` works although `interpolationOrder` must be replaced with `{3}` BEFORE calling `Interpolation` according to the standard evaluation sequence?

P.S. The problem occurs in Mathematica 7.0.1 and 8.0.1 but not in Mathematica 5.2.

## UPDATE

I have found one workaround for this bug:

``````Interpolation[data,
ToExpression@ToString[InterpolationOrder -> interpolationOrder]]
``````

works as expected.

It seems that expressions generated by evaluation of `Rule[InterpolationOrder,interpolationOrder]` and `Rule[InterpolationOrder,{3}]` has different internal structure in spite of the fact that they are identical:

``````ByteCount // Attributes
ByteCount[InterpolationOrder -> interpolationOrder]
ByteCount[InterpolationOrder -> {3}]
Order[InterpolationOrder -> interpolationOrder,
InterpolationOrder -> {3}]

(*=>
{Protected}
192
112
0
*)
``````
-

It seems that I have found the reason for this behavior. It is because `InterpolatingFunctionInterpolationOrder` function returns `PackedArray`:

``````Developer`PackedArrayQ@InterpolatingFunctionInterpolationOrder[ifun]
(*=> True*)
``````

We can convert `{3}` into `PackedArray` ourselves:

``````Interpolation[data,
InterpolationOrder -> Developer`ToPackedArray@{3}];

(*=> gives the error Message*)
``````

So the reason is that `Interpolate` does not support `PackedArray` as a value for `InterpolationOrder` option. The workaround is to unpack it manually:

``````Interpolation[data,
InterpolationOrder -> Developer`FromPackedArray@interpolationOrder]
(*=> InterpolatingFunction[{{0.,0.516019}},<>]*)
``````
-

Very strange behaviour indeed. Something like

``````a = {3};
Interpolation[data, InterpolationOrder -> a]
``````

works fine, and both `??interpolationOrder` and `OwnValues[interpolationOrder]` seem to indicate that `interpolationOrder` is just equal to `{3}`. Even weirder is that this does seem to work

``````interpolationOrder = 2 InterpolatingFunctionInterpolationOrder[ifun]/2
Interpolation[data, InterpolationOrder -> interpolationOrder]
``````
-
Division by 2 results in unpacking because rational numbers cannot be packed. See my answer for further details. –  Alexey Popkov Oct 10 '11 at 10:17