I have a 3D closed mesh object that has 3D 65.000 position coordinates. For lighting purposes, I need a 3D surface normal extractor.
Could you help me to have it.
Thanks.
Richard

OK, here's a stab at a general algorithm to carry out this task, independent of what language and graphics library you are using.
Now, I must stress that this is a rough description of what needs to be accomplished in order to do this there are certain corners that can be cut for efficiency. What I'm getting at is that you don't need to calculate all triangle normals first and then calculate all vertex normals  the 2 steps can be mixed in to make things more efficient. Some pseudo code might look this
Regarding some of the other comments about winding order  if you get this wrong, the normals will point inwards, rather than outwards. This can be fixed by simply changing the order of the cross product, as noted above. 


since you have the indices, i am assuming its either a triangle list / strip or fan. Read each triangle. Compute the normal by taking the cross product of 2 of the vectors of the triangle. You have 1 problem though. If you dont know the winding order of the triangles, then you might get the opposite value. Which software created the mesh ? Can you inspect within the data file or software what the winding order was ? is it left or right handed ? 


What you need is simply the crossproduct of the vectors that make up two sides of the triangle, normalized to a unit vector. As Andrew Keith said in his comment, you'd better know that the triangles are defined either clockwise or counterclockwise when you look at the triangle from the "outside." If you can't guarantee consistency, you have a mess on your hands. But probably (or at least hopefully) the code that created the object is sane. 


I am not sure if this will help but have a look at this link. 


Steg's answer points into the right direction. However, if you need highquality normals, have a look at the paper Discrete DifferentialGeometry Operators for Triangulated 2Manifolds. The cotangent formula (8) gives you good results even for irregular meshes where estimates such as the triangle area break down. 

