NMinimize seems to be on crack

Say I have a crazy function, `f`, defined like so:

``````util[x_, y_, c_] := 0.5*Log[c-x] + 0.5*Log[c-y]
cost[x_, y_, l_] := c /. First[NSolve[util[x, y, c+l] == Log[10+l], c]]
prof[x_, y_]   := 0.01*Norm[{x,y}, 2]
liquid[x_, y_] := 0.01*Norm[{x,y}, 2]
f[x_, y_, a_, b_] := cost[a, b, liquid[x,y] + liquid[a-x, b-y]] - Max[a,b]
- cost[0,0,0] + prof[x,y] + liquid[x,y] + prof[a-x, b-y] + liquid[a-x, b-y]
``````

Now I call `NMinimize` like this:

``````NMinimize[{f[50, 50, k, j], k >= 49, k <= 51, j >= 49, j <= 51}, {j, k}]
``````

Which tells me this:

``````{-21.0465, {j -> 51., k -> 49.}}
``````

But then if I actually check what `f[50,50,49,51]` is, it's this:

``````0.489033
``````

Which is pretty different from the -21.0465 that NMinimize said. Is this par for the course with NMinimize? Floating point errors compounding or whatnot? Any ideas for beating NMinimize (or some such function) into submission?

-
+1 for the title –  Verbeia Sep 10 '11 at 1:48

It certainly seems to be related to your function `f` not being restricted to numerical arguments, plus the symbolic preprocessing performed by `NMinimize`. Once you change the signature to

``````f[x_?NumericQ, y_?NumericQ, a_?NumericQ, b_?NumericQ]:=...
``````

The result is as expected, although it takes considerably longer to get it.

EDIT

We can dig deeper to reveal the true reason. First, note that your `f` (the original one, args unrestricted) is quite a function:

``````In[1423]:= f[50,50,49.,51.]
Out[1423]= 0.489033

In[1392]:= f[50,50,k,j]/.{j->51.`,k->49.`}
Out[1392]= -21.0465
``````

The real culprit is `NSolve`, which gives two ordered solutions:

``````In[1398]:= NSolve[util[x,y,c+l]==Log[10+l],c]
Out[1398]= {{c->0.5 (-2. l+1. x+1. y-2. Sqrt[100.+20. l+1. l^2+0.25 x^2-0.5 x y+0.25 y^2])},
{c->0.5 (-2. l+1. x+1. y+2. Sqrt[100.+20. l+1. l^2+0.25 x^2-0.5 x y+0.25 y^2])}}
``````

The problem is, what is the ordering. It turns out to be different for symbolic and numeric arguments to `NSolve`, because in the latter case we don't have any symbols around. This can be seen as:

``````In[1399]:=
Block[{cost},
cost[x_,y_,l_]:=c/.Last[NSolve[util[x,y,c+l]==Log[10+l],c]];
f[50,50,k,j]/.{j->51.,k->49.}]

Out[1399]= 0.489033
``````

So you really have to settle on what is the right ordering for you, and which solution you really want to pick.

-
Wow, nice catch in spotting that issue with NSolve! Thanks Leonid! –  dreeves Sep 10 '11 at 3:12
@dreeves Daniel, glad I could help. For some while, I was quite puzzled - had no idea before that this may happen. –  Leonid Shifrin Sep 10 '11 at 23:13
FYI, 51 and 49 are backwards in `In[1400]` (but you get the same result regardless!) –  JxB Sep 11 '11 at 3:39
@JxB Thanks! I noticed, but had no time to correct. Will do soon. –  Leonid Shifrin Sep 11 '11 at 9:37