# How to plot surface faster, when the function is extremely complicated?

I'm trying to plot the graph of the function `hh` in the following code (please skip over to the last line of the code). I have already set `PlotPoints->2` and `MaxRecursion->0`, but the code is still running, having run for about 8 hours. The function `hh` is extremely complicated, involving a huge amount of iterations. Is there any way to make the code run faster?

``````s0[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, x_] :=
{a, b, u, c, d, v, p, q, z, s, t, w, 1, 0, (a + b) x + u}

s1[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, n_, x_] :=
Which[0 <= x <= c, {a, b, u, c, d, v, p, q, z, s, t, w, 2, n - 1, x/c*q + p},
c <= x <= c + d, {a, b, u, c, d, v, p, q, z, s, t, w, 2, n, (x - c)/d*p},
c + d <= x <= 1, {a, b, u, c, d, v, p, q, z, s, t, w, 1, n + 1, (x - (c + d))/v*u}]

s2[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, n_, x_] :=
Which[0 <= x <= w, {a, b, u, c, d, v, p, q, z, s, t, w, 2, n - 1, x/w*z + p + q},
w <= x <= 1 - s, {a, b, u, c, d, v, p, q, z, s, t, w, 3, n - 1, (x - w)/t*v + c + d},
1 - s <= x <= 1, {a, b, u, c, d, v, p, q, z, s, t, w, 3, n, (x - (1 - s))/s*d + c}]

s3[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, n_, x_] :=
Which[0 <= x <= u, {a, b, u, c, d, v, p, q, z, s, t, w, 4, n - 1, x/u*t + w},
u <= x <= 1 - a, {a, b, u, c, d, v, p, q, z, s, t, w, 4, n, (x - u)/b*w},
1 - a <= x <= 1, {a, b, u, c, d, v, p, q, z, s, t, w, 3,n + 1, (x - (1 - a))/a*c}]

s4[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, n_, x_] :=
Which[0 <= x <= p, {a, b, u, c, d, v, p, q, z, s, t, w, 4, n - 1, x/p*s + 1 - s},
p <= x <= p + q, {a, b, u, c, d, v, p, q, z, s, t, w, 5, n - 1, (x - p)/q*a/(a+ b)+ b/(a + b)},
p + q <= x <= 1, {a, b, u, c, d, v, p, q, z, s, t, w, 5, n, (x - (p + q))/z*b/(a + b)}]

f[{a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, k_, n_, x_}] :=
Which[k == 0, s0[a, b, u, c, d, v, p, q, z, s, t, w, x],
k == 1, s1[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
k == 2, s2[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
k == 3, s3[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
k == 4, s4[a, b, u, c, d, v, p, q, z, s, t, w, n, x]]

g[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, x_] :=
NestWhile[f, {a, b, u, c, d, v, p, q, z, s, t, w, 0, 0, x}, Function[e, Extract[e, {13}] != 5]]

h[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, x_] :=
Extract[g[a, b, u, c, d, v, p, q, z, s, t, w, x], {15}] +
Extract[g[a, b, u, c, d, v, p, q, z, s, t, w, x], {14}]

ff[{a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, x_}] := {a, b, u, c, d, v, p, q, z, s, t, w, h[a, b, u, c, d, v, p, q, z, s, t, w, x - Floor[x]] + Floor[x]}

gg[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_] :=
N[Extract[Nest[ff, N[{a, b, u, c, d, v, p, q, z, s, t, w, 0}], 10^3], {13}]/10^3]

hh[x_, y_] :=
gg[x, y, 1 - x - y, x, y, 1 - x - y, x, y, 1 - x - y, x, y, 1 - x - y]

Plot3D[hh[x, y], {x, 0, 1}, {y, 0, 1}, RegionFunction -> Function[{x, y, z}, x + y <= 1], PlotPoints -> 2,  MaxRecursion -> 0]
``````
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Something is wrong with your function: evaluation, for example, `hh[1, 1]`, prints messages and runs infinitely: `Extract::partw: "Part 13 of f[s0[1.,1.,-1.,1.,1.,-1.,1.,1.,-1.,1.,1.,-1.,0.]] does not exist."` –  Alexey Popkov Aug 16 '12 at 10:27
The function `hh` does not allow the input `(1,1)`. The arguments `x,y` must satisfy `x+y<1`. Thanks for the comment though. –  Michael C Aug 16 '12 at 19:34

I think there are some problems with your function. However here are some ideas; I modified several functions :

``````s0[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, n_, x_] =
{a, b, u, c, d, v, p, q, z, s, t, w, 1, 0, (a + b) x + u}

(* so it matches the others *)

f[{a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, k_, n_, x_}] :=
{s0[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
s1[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
s2[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
s3[a, b, u, c, d, v, p, q, z, s, t, w, n, x],
s4[a, b, u, c, d, v, p, q, z, s, t, w, n, x]}[[k + 1]]

g[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, x_] :=
NestWhile[f, {a, b, u, c, d, v, p, q, z, s, t, w, 0, 0, x}, #[[13]] != 5 &]

h[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_, x_] :=
Total[g[a, b, u, c, d, v, p, q, z, s, t, w, x][[{14, 15}]]]

(* in order to avoid calculating the same quantity twice *)

gg[a_, b_, u_, c_, d_, v_, p_, q_, z_, s_, t_, w_] :=
Nest[ff, {a, b, u, c, d, v, p, q, z, s, t, w, 0}, 10^3][[13]]/10^3

{elapsed, data} = Outer[If[#1 + #2 <= 1, {#1, #2, hh[#1, #2]}, {#1, #2, "bad"}] &,
Range[0.1, 1, 0.25], Range[0.1, 1, 0.25]] // AbsoluteTiming

(* {6.820061, {{{0.1, 0.1, -1.99961}, {0.1, 0.35, -1.99961}, {0.1, 0.6, -2.00009},
{0.1, 0.85, -2.00001}}, {{0.35, 0.1, -1.99993}, {0.35, 0.35, -2.00004},
{0.35, 0.6, -2.00017}, {0.35, 0.85, "bad"}}, {{0.6, 0.1, -1.99996},
@gatessucks Thanks for your answer. The modified code now runs for only 8 seconds on my machine. I do have a question though. Why is it necessary to use `Select`? The points in `data` seem already all numeric. –  Michael C Aug 16 '12 at 19:59
@MichaelC No, I used a quick way to get a handful of points. I included points not meeting the constraint `x+y <= 1` (for which the z-value is "bad") and therefore I need to remove those points before plotting. –  b.gatessucks Aug 17 '12 at 8:17