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f[x_,y_,z_] := Sqrt[3x+1]+Sqrt[3y+1]+Sqrt[3z+1]

I want to get the minimum of f for x>=0&&y>=0&&z>=0&&x+y+z==1 using mathematica.

PS: I do know how to get the minimum by math method:

Since 0<=x<=1,0<=y<=1,0<=z<=1, we have
3a+1 >= a^2 + 2a + 1 = (a+1)^2, where a in {x,y,z}.
f[x,y,z] >= x+1+y+1+z+1 = 4,
Where the equality holds if and only if (x==0&&y==0||z==1)||...

PS2: I expected the following code would work, but it did't.


Actually, as Simon point out, it works ... The running time is longer than I expected and I closed it before Mahtematica show me the result.

share|improve this question
huh? only two viable options i see are x=y=z=(1/3), f(x,y,z)=3*sqrt(2) .... or x=y=0, z=1 leads to f(x,y,z)=1+1+sqrt(4)=1+1+2=4 – jon_darkstar Nov 25 '10 at 0:06
@jon_darkstar minimum,not maximum – Eastsun Nov 25 '10 at 0:08
yea i caught that right afterwards =P. but are the middle options even worth exploring? – jon_darkstar Nov 25 '10 at 0:09
Correct without constraints, but note that x + y + z = 1. Need a Lagrange multiplier or two in there. – duffymo Nov 25 '10 at 0:10
the partial derivative of f w.r.t any of three variables is obviously always decreasing, so you'd want to "consolidate" all of that x+y+z=1 constraint into one variable. Legrange? why? i guess maybe if you needed a proof or wanted to generalize f in a weird way (generalizing constraints makes no differenece - replace x+y+z=1 with x+y+z=k and you still want one of them to be equal to k), but intuitively its pretty straightforward – jon_darkstar Nov 25 '10 at 0:16
up vote 4 down vote accepted

Is this what you want?

In[1]:= f[x_,y_,z_]:=Sqrt[3x+1]+Sqrt[3y+1]+Sqrt[3z+1]
In[2]:= Minimize[{f[x,y,z],x>=0,y>=0,z>=0,x+y+z==1},{x,y,z}]
Out[2]= {4,{x->1,y->0,z->0}}

Note that the Documentation says "Even if the same minimum is achieved at several points, only one is returned" so you will have to impose the permutation symmetry of the problem yourself.

PS You can turn this into a Lagrange Multiplier problem

In[3]:= Thread[D[f[x,y,z] - \[Lambda](x+y+z-1), {{x,y,z,\[Lambda]}}]==0];
        {f[x,y,z],D[f[x, y, z], {{x, y, z}, 2}]}/.ToRules[%]
Out[4]= x==1/3&&y==1/3&&z==1/3&&\[Lambda]==3/(2 Sqrt[2])
Out[5]= {3 Sqrt[2],{{-(9/(8 Sqrt[2])),0,0},{0,-(9/(8 Sqrt[2])),0},{0,0,-(9/(8 Sqrt[2]))}}}

and see that the only stationary point is the maximum at x=y=z=1/3. Thus the minimum must lie on the boundary. You can then use similar code but restricted to the boundary to eventually find the correct result.

share|improve this answer
Oh, thanks. That's what I want. Actually, I have tried that and it had been running more than 2 mius before I forced close the program. – Eastsun Nov 25 '10 at 0:53
@Eastsun: It is quite slow -- It took about 30secs on my cheap hp laptop... The reduce code is much faster. – Simon Nov 25 '10 at 1:02
+1 for the explicit Lagrange Mults – Dr. belisarius Nov 25 '10 at 15:32

Just for fun, this is a plot of the solution given by Simon:

f[x_, y_, z_] := Sqrt[3 x + 1] + Sqrt[3 y + 1] + Sqrt[3 z + 1]
g1 = ContourPlot3D[f[x, y, z] == 4, {x, 0, 1}, {y, 0, 1}, {z, 0, 1}, AxesLabel -> {x,y,z}, MeshFunctions -> {#3 &}, ContourStyle -> {Blue, Opacity[0.5]}];
g2 = ContourPlot3D[ x + y + z == 1, {x, 0, 1}, {y, 0, 1}, {z, 0, 1}, AxesLabel -> {x,y,z}, MeshFunctions -> {#2 &}, ContourStyle -> {Green, Opacity[0.5]}];
Show[g1, g2, Graphics3D[{PointSize[0.05], Red, Point[{1, 0, 0}]}], ViewPoint -> {1.1`, -2.4`, 1.7`}]

alt text

share|improve this answer

You say you aren't interested in the "math method" (I'm not sure what you have in mind when you say that, but it makes me think of minimization methods with Lagrange multipliers). If that's correct, why do you bring Mathematica into the discussion? What do you think it'll be using?

I'll have to assume that you mean numerical, computer solutions. I'd start with linear programming and the simplex method.

share|improve this answer
I just want to know if there have any simple way, i.e. solved the problem in one or two lines. – Eastsun Nov 25 '10 at 0:20
linear programming / numerical would do it, but that deserves a more interesting function to optimize IMO – jon_darkstar Nov 25 '10 at 0:24
More interesting, indeed. – duffymo Nov 25 '10 at 1:20

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