# How to improve this Mathematica 9 code with Dynamic

How to improve this Mathematica 9 code with Dynamic to speed up the calculation. On my PC this code working with "n" less then 13 otherwise the result is "\$Aborted", but I need n=20. You can use, for example, rho=0.64 and phi=1.107 I want that in opened html file when you type parameters automatically calculates, and even better, that was a button "calculate".

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at first I need solve

``````Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy, zz}]
``````

then do "Replace" three times fo each variable

"1"

``````Replace[xx,
First[Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy,
zz}]][[1]]]
``````

"2"

``````Replace[yy,
First[Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy,
zz}]][[2]]]
``````

"3"

``````Replace[zz,
First[Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy,
zz}]][[3]]]
``````

In fact, I write it all in one "Dynamic" as I do not know how to make it right - so that in the html file automatically calculates all after entering the values ​​of the variables

"1","2","3" in code are acronyms for the above

``````Dynamic[
Cases[
Drop[Tuples[Range[-n, n], 3], {(
Length[Tuples[Range[-n, n], 3]] + 1)/2}], {h_, k_,
l_} /;
("1" -"1"/10) <= h/(
GCD[h, k, l] Sqrt[
h^2 + k^2 +
l^2]) <= ("1" +"1"/10) \[And] ("2" -"2"/10) <= k/(
GCD[h, k, l] Sqrt[
h^2 + k^2 +
l^2]) <= ("2" +"2"/10) \[And] ("3" -"3"/10) <= l/(
GCD[h, k, l] Sqrt[
h^2 + k^2 +
l^2]) <= ("3" +"3"/10)]]
``````

if denote

"11" -

``````h/(GCD[h, k, l] Sqrt[h^2 + k^2 + l^2])
``````

"22" -

``````k/(GCD[h, k, l] Sqrt[h^2 + k^2 + l^2])
``````

"33" -

``````l/(GCD[h, k, l] Sqrt[h^2 + k^2 +l^2])
``````

then code are:

``````            Dynamic[
Cases[
Drop[
Tuples[
Range[-n, n], 3], {(Length[Tuples[Range[-n, n], 3]] + 1)/2}], {h_, k_, l_} /;
("1" -"1"/10) <= "11" <= ("1" +"1"/10)
\[And]
("2" -"2"/10) <= "22" <= ("2" +"2"/10)
\[And]
("3" -"3"/10) <= "33" <= ("3" +"3"/10)]]
``````

This code works, as I need. Thank you for your interest!

``````Column[{Style["Определить hkl", Bold, 16],
Labeled[InputField[Dynamic[\[Rho]]], "\[Rho]", Left,
LabelStyle -> Directive[Bold, FontSize -> 18]],
Labeled[InputField[Dynamic[\[Phi]]], "\[Phi]", Left,
LabelStyle -> Directive[Bold, FontSize -> 18]],
Labeled[InputField[Dynamic[n]], "n", Left,
LabelStyle -> Directive[Bold, FontSize -> 18]]}]

SetAttributes[redoButton, HoldRest]
redoButton[str_, fun_] :=
DynamicModule[{result = Null}, Column[{Button[str, result = fun]}]]

Column[{redoButton[
"x,y,z", {px =
Replace[xx,
First[Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy,
zz}]][[1]]],
py = Replace[yy,
First[Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy,
zz}]][[2]]],
pz = Replace[zz,
First[Solve[(xx == Sin[\[Rho]] Cos[\[Phi]]) && (yy ==
Sin[\[Rho]] Sin[\[Phi]]) && (zz == Cos[\[Rho]]), {xx, yy,
zz}]][[3]]]}], {Dynamic[px], Dynamic[py], Dynamic[pz]},
redoButton["ppp",
ppp = Part[
Nearest[ReplaceAll[
Drop[Tuples[Range[-n, n], 3], {(
Length[Tuples[Range[-n, n], 3]] + 1)/2}], {h_, k_, l_} -> {h/
Sqrt[h^2 + k^2 + l^2], k/Sqrt[h^2 + k^2 + l^2], l/Sqrt[
h^2 + k^2 + l^2]}], {px, py, pz}], 1]], Dynamic[ppp],
redoButton["hkl",
hkl = MatrixForm[
Cases[Drop[
Tuples[Range[-n, n], 3], {(
Length[Tuples[Range[-n, n], 3]] + 1)/2}], {h_, k_, l_} /;
h/(GCD[h, k, l] Sqrt[h^2 + k^2 + l^2]) == Part[ppp, 1] \[And]
k/(GCD[h, k, l] Sqrt[h^2 + k^2 + l^2]) == Part[ppp, 2] \[And]
l/(GCD[h, k, l] Sqrt[h^2 + k^2 + l^2]) == Part[ppp, 3]]]],
Style[Dynamic[hkl], Bold, 18]}]
``````
-
I'm certainly not going to look in detail at all that code to try and figure out how you can make it run faster. I suggest you isolate the kernel which occupies most of the run time and post just that for SO's consideration –  High Performance Mark Mar 11 '13 at 10:04
@HighPerformanceMark Now we are two –  belisarius Mar 11 '13 at 13:11