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May 27 |
awarded | Popular Question |
Mar 10 |
comment |
Random Number generator function ran2 Numerical Recipes
@dirkgently: That would involve saving too much output. I'm talking about tens of millions of calls to the function. So it would be great to have a direct way of reaching some point in the series provided we know the seed. |
Mar 10 |
comment |
Random Number generator function ran2 Numerical Recipes
@Igancio. From the book Numerical Recipes: The Art of Scientific Computing. nr.com Fortran version. But I guess it shouldn't matter which language the program is in. |
Mar 10 |
asked | Random Number generator function ran2 Numerical Recipes |
Dec 10 |
comment |
Chain of connected points and rotation matrices
@Jitse: Thanks for the comment. We don't need to preserve the dihedrals, but we must preserve the bond lengths and bond angles. That's why I have a hunch that there must be a Transformation matrix which can do it. |
Dec 10 |
comment |
Chain of connected points and rotation matrices
@Andy: Thanks Andy. I think that is the area where such questions are concerned; however as you said I'm not sure if there is some prescription or well-defined approach to answer this question. |
Dec 10 |
comment |
Chain of connected points and rotation matrices
@Beta: I am saying that when we begin, we know all distances and angles, but then we want to change the distance,angles between non- immediate neighbour connections like [2-9,1-2-9, 1-2-9-10] and the question is that is there a way to do it while preserving (fixed) the immediate neighbour connections around atoms 9 and 10 [and all other atoms in fact]. Thanks for considering the question. |
Dec 10 |
asked | Chain of connected points and rotation matrices |
Oct 24 |
awarded | Student |
Oct 23 |
comment |
Position of connected points in space
Hi Beta, you certainly gave an answer and I'm thankful for that, but I'm not sure how to use it. In the general situation where I cannot define the Coordinate system this way for each such transformation how would I proceed? Think of it as 5 such changes done one after the other on 5 sets of points and defining the location and orientation of the set (i+1) with respect to the previous set (i). These sets of points are all in the same Cartesian system. If you can point me to the source of that formula, I'll be grateful. Thanks. |
Oct 23 |
revised |
Position of connected points in space
fixed grammar |
Oct 23 |
comment |
Position of connected points in space
I'm sorry I assumed that people will imagine the a Global Frame of Cartesian coordinates and yes you are right that even if the ordered quadruplet doesn't change, the 4 points can be sent whirling off. However, the question is how to assign the new coordinates (x,y,z) for the points once the ordered set changes to a known value. |
Oct 23 |
awarded | Editor |
Oct 23 |
revised |
Position of connected points in space
No iterative solution |
Oct 23 |
comment |
Position of connected points in space
Thanks, the general approach is known to me too but a method that's iterative will not do. I need to this in a simulation probably millions of times, so a method that can take me from state1 to state2 is needed. |
Oct 23 |
comment |
Position of connected points in space
Yes, I need a way to do this without iterations. I am looking for a way to do this. I have a hunch about using a bunch of rotations but I'm not sure about how the angle change can be effected. |
Oct 23 |
asked | Position of connected points in space |