Skip to main content

dynamic - Initializing Manipulator value within DialogInput (version 10.1 only)


Bug introduced in 10.1.0 and fixed in 10.2.0


I've confirmed, with WRI, that an issue was introduced in version 10.1 with regard to initializing Manipulator Dynamic values when the Manipulator is wrapped in a DialogInput.




Here, I'm asking for help in creating a work-around. The slightly modified code snippets I've included are from a larger notebook. But, they show the issue.



The following code shows the initialization of the Manipulator when not wrapped within a DialogInput:


DynamicModule[{val = 75.0},
Print[val]; (* Print for Debug *)
Column[{Manipulator[Dynamic[val], {50, 100, 0.2},
Appearance -> {"Open", "Labeled"},
AppearanceElements -> {"InputField", "StepLeftButton", "StepRightButton"}]}]
]

The above works fine with the Manipulator being initialized to 75., even in version 10.1.


The following is the code that will not propagate the initialization value to the Manipulator inside a DialogInput using version 10.1, but worked in prior versions. Note that the Manipulator is initialized to 50., not 75.:



DynamicModule[{val = 75.0},
DialogInput[
Print[val]; (* Print for Debug *)
Column[{Manipulator[Dynamic[val], {50, 100, 0.2},
Appearance -> {"Open", "Labeled"},
AppearanceElements -> {"InputField", "StepLeftButton", "StepRightButton"}],
Row[{DefaultButton[DialogReturn[{Today, Round[val, 0.2]}]], CancelButton[]}]}],
WindowTitle -> "Input Value"]
]


In the actual code, the initialization value for val is from a file, not hard-coded. Can anyone think of a work-around that will allow me to get an initialization value into the Manipulator that works in version 10.1? It may not be possible, but I'm looking for something relatively simple that doesn't require modifying any system files.


To address some questions in the comments:


I should have mentioned that I'm running Win 8.1, 64-bit. Maybe it's specific to that OS version. I did get confirmation from WRI that they were able to reproduce my problem.


The purpose of the code is simply to be able to open a DialogInput with a slider initialized to a piece of data read from a file. If desired, manipulate the slider to a new value and return that value along with the date. If my current approach is not a good one, I'm open to better ideas.




Comments

Popular posts from this blog

plotting - Plot 4D data with color as 4th dimension

I have a list of 4D data (x position, y position, amplitude, wavelength). I want to plot x, y, and amplitude on a 3D plot and have the color of the points correspond to the wavelength. I have seen many examples using functions to define color but my wavelength cannot be expressed by an analytic function. Is there a simple way to do this? Answer Here a another possible way to visualize 4D data: data = Flatten[Table[{x, y, x^2 + y^2, Sin[x - y]}, {x, -Pi, Pi,Pi/10}, {y,-Pi,Pi, Pi/10}], 1]; You can use the function Point along with VertexColors . Now the points are places using the first three elements and the color is determined by the fourth. In this case I used Hue, but you can use whatever you prefer. Graphics3D[ Point[data[[All, 1 ;; 3]], VertexColors -> Hue /@ data[[All, 4]]], Axes -> True, BoxRatios -> {1, 1, 1/GoldenRatio}]

plotting - Filling between two spheres in SphericalPlot3D

Manipulate[ SphericalPlot3D[{1, 2 - n}, {θ, 0, Pi}, {ϕ, 0, 1.5 Pi}, Mesh -> None, PlotPoints -> 15, PlotRange -> {-2.2, 2.2}], {n, 0, 1}] I cant' seem to be able to make a filling between two spheres. I've already tried the obvious Filling -> {1 -> {2}} but Mathematica doesn't seem to like that option. Is there any easy way around this or ... Answer There is no built-in filling in SphericalPlot3D . One option is to use ParametricPlot3D to draw the surfaces between the two shells: Manipulate[ Show[SphericalPlot3D[{1, 2 - n}, {θ, 0, Pi}, {ϕ, 0, 1.5 Pi}, PlotPoints -> 15, PlotRange -> {-2.2, 2.2}], ParametricPlot3D[{ r {Sin[t] Cos[1.5 Pi], Sin[t] Sin[1.5 Pi], Cos[t]}, r {Sin[t] Cos[0 Pi], Sin[t] Sin[0 Pi], Cos[t]}}, {r, 1, 2 - n}, {t, 0, Pi}, PlotStyle -> Yellow, Mesh -> {2, 15}]], {n, 0, 1}]

plotting - Mathematica: 3D plot based on combined 2D graphs

I have several sigmoidal fits to 3 different datasets, with mean fit predictions plus the 95% confidence limits (not symmetrical around the mean) and the actual data. I would now like to show these different 2D plots projected in 3D as in but then using proper perspective. In the link here they give some solutions to combine the plots using isometric perspective, but I would like to use proper 3 point perspective. Any thoughts? Also any way to show the mean points per time point for each series plus or minus the standard error on the mean would be cool too, either using points+vertical bars, or using spheres plus tubes. Below are some test data and the fit function I am using. Note that I am working on a logit(proportion) scale and that the final vertical scale is Log10(percentage). (* some test data *) data = Table[Null, {i, 4}]; data[[1]] = {{1, -5.8}, {2, -5.4}, {3, -0.8}, {4, -0.2}, {5, 4.6}, {1, -6.4}, {2, -5.6}, {3, -0.7}, {4, 0.04}, {5, 1.0}, {1, -6.8}, {2, -4.7}, {3, -1....