# Mathematica: Asynchronous incremental generation of dynamical graphics

What is the simplest way to asynchronously apply consecutive improvements to a `Graphics` object in a dynamic setting (and abort the evaluation of the unneeded results if input changes while they are being computed)?

As a simple example, consider this:

``````speed[r_] := Graphics@{Red, Circle[{0, 0}, r]}
qualityA[r_] := (Pause[1]; Graphics@{Red, Disk[{0, 0}, r]})
qualityB[r_] := (Pause[1]; Graphics@{Black, Circle[{0, 0}, r]})
Manipulate[Show[
ControlActive[speed[r], {qualityA[r], qualityB[r]}],
PlotRange -> {{-1, 1}, {-1, 1}}
], {{r, .5}, 0, 1}]
``````

How can I evaluate `qualityA` and `qualityB` consecutively, and append their output to the display when it is ready?

Bonus points for `Abort`'ing the evaluation of unneeded results, and for allowing a part of the result to be calculated multiple times, so that after releasing the control I would see e.g. `{qualityA[r]}` then `{qualityA[r],qualityB[r]}`, and finally `{qualityA2[r],qualityB[r]}`.

-

My colleague Lou, an expert on Dynamic, suggested this neat answer:

``````Manipulate[
ControlActive[
Graphics[{LightRed, Circle[{0, 0}, r]},
PlotRange -> {{-1, 1}, {-1, 1}}],
DynamicModule[{exprs = {Red, Circle[{0, 0}, r]}, rr = r},
Graphics[Dynamic[exprs], PlotRange -> {{-1, 1}, {-1, 1}}],
Initialization :> (Pause[1];
AppendTo[exprs, {Red, Disk[{0, 0}, rr]}]; Pause[1];
AppendTo[exprs, {Black, Circle[{0, 0}, rr]}]),
SynchronousInitialization -> False]], {{r, 0.5}, 0, 1}]
``````

How it works:

When not ControlActive, the result of the dynamic expression is a `DynamicModule`. The code for refining the graphics is contained in the `Initialization` option of this DynamicModule. The `SynchronousInitialization -> False` makes this initialization run asynchronously.

Renaming `rr = r` in the DynamicModule serves two purposes. First, it makes the result always depend on the Manipulate variable `r`. Second, you can check `rr != r` to decide whether the user has moved the slider during initialization, and abort early, saving computation time:

``````Manipulate[
ControlActive[
Graphics[{LightRed, Circle[{0, 0}, r]},
PlotRange -> {{-1, 1}, {-1, 1}}],
DynamicModule[{exprs = {Red, Circle[{0, 0}, r]}, rr = r},
Graphics[Dynamic[exprs], PlotRange -> {{-1, 1}, {-1, 1}}],
Initialization :> (If[rr =!= r, Abort[]]; Pause[1];
AppendTo[exprs, {Red, Disk[{0, 0}, rr]}]; If[rr =!= r, Abort[]];
Pause[1]; AppendTo[exprs, {Black, Circle[{0, 0}, rr]}]),
SynchronousInitialization -> False]], {{r, 0.5}, 0, 1}]
``````

I hope this helps.

-
This one I cannot break! I really expected your first one to work -- but as mentioned it dies on 'monkey testing'. This one I can fiddle with as much as I want, and just keeps behaving as intended. Thank you very much for pursuing this! –  Janus Feb 25 '11 at 8:26

Really good question.

I may be overlooking a simpler way. There often is one when it comes to Dynamic... But here is my suggestion:

``````DynamicModule[{quality = 0, exprs = {}},
Manipulate[
Show[
ControlActive[
exprs = {}; quality = 0; Graphics@{Red, Circle[{0, 0}, r]},
Switch[quality,
0, Pause[1]; quality = 1;
AppendTo[exprs, Graphics@{Red, Disk[{0, 0}, r]}],
1, Pause[1]; quality = 2;
AppendTo[exprs, Graphics@{Black, Circle[{0, 0}, r]}],
_, r];
exprs
],
PlotRange -> {{-1, 1}, {-1, 1}}],
{{r, .5}, 0, 1}
]
]
``````

First we define some variables controlling increasingly high quality graphics: `quality` (ranging to 0 to the maximum quality, 2 in this case), and `exprs` (a list of expressions to Show, just as in your example).

Now note what happens in the two cases of ControlActive:

When ControlActive, the result is the same as yours, except we take the opportunity to reset `quality` and `exprs` relating to the "high quality" graphics.

When not ControlActive, the Dynamic expression evaluates to

``````code; exprs
``````

This expression has the following key properties.

1. It returns the list `exprs` every time.
2. Each time `code` is evaluated, it improves the graphics by appending something to `exprs`.
3. Each time `code` is evaluated, at least one of the variables lexically contained in `code; exprs` (such as `quality`) is changed. This means Dynamic will go ahead and evaluate our dynamic expression again, and again, and again, until ...
4. Eventually `code` evaluates without any of the variables lexically contained in `code; exprs` changing. This means Dynamic will stop re-evaluating.
5. The final evaluation lexically contains `r`. (Via the otherwise useless default case in the Switch, `_, r`.) This is important to make the slider still trigger updates.

Give it a try and let me know if that works for you.

Edit: What \$Version of Mathematica are you using? I see some version dependence in the behavior of my code above.

Edit 2: I asked an expert on Dynamic and he found a better way, which I will describe in a separate answer.

-
Thanks, Andrew! This looks pretty much like the idea I was trying to get. Unfortunately it doesn't work too well for me (v8.0, 64bit OS-X): First move-release round is fine, but then the slider stops following, and next everything just stops... And as usual with Dynamics, I have no clue what is going wrong :) –  Janus Feb 24 '11 at 1:16