Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I'm trying to construct a nearest neighbor list in python that stores the nearest neighbors of a node in a finite 3d hexagonal-closest packing (HCP) lattice. I've done this already with a 2d square lattice defining the structure like so. I don't want coordinates, but just a quick way to create a nearest neighbor list for an HCP out of a list of integers. Below is the sample code of how I did this task with a square lattice.

N = int #number of nodes
L = side # a 32x32 graph, L would be 32

for i in range(N):

    nearNeighbor[i][0] = (i + 1 ) % N
    nearNeighbor[i][1] = (i + (N - 1)) % N
    nearNeighbor[i][2] = (i + L) % N
    nearNeighbor[i][3] = (i + N - L) % N

    if (i-L < 0):
         nearNeighbor[i][3] = -2
    if (i+L >= N):
         nearNeighbor[i][2] = -2
    if (i%L) == 0:
         nearNeighbor[i][1] = -2     
    if ((i+1)%L) == 0:
         nearN[eighbori][0] = -2

That's it. Now an HCP lattice, when visualized, resembles a giant cube of spheres closely packed together. Each node should have at most 12 nearest neighbors and they should come out to make something like a cube. I guess largely I want to know how to use integers and modular arithmetic to represent the HCP lattice like I did with the square lattice. Can you help me stack?

share|improve this question

1 Answer 1

up vote 3 down vote accepted

The answer to this question depends on how one chooses to truncate the HCP lattice and index it. One choice is

Indexed HCP lattice Indexed HCP lattice part 2

With this choice, the following code will return a list of neighbors of a given site.

def neighbors(i, W, H, D):
  A = W * H

  plane = i / A
  plane_index = i % A
  row = plane_index / W
  col = plane_index % W

  r = -1 if row % 2 else 1   # (-1)**row
  p = -1 if plane % 2 else 1 # (-1)**plane

  nbors = []

  # first include neighbors in same plane
  if col != W-1: nbors.append(i+1)
  if col != 0:   nbors.append(i-1)
  if row != H-1: nbors.append(i+W)
  if row != 0:   nbors.append(i-W)
  if (col != 0 or r > 0) and (col != W-1 or r < 0):
    if row != H-1: nbors.append(i+W+r)
    if row != 0:   nbors.append(i-W+r)

  # now add neighbors from other planes
  if plane != D-1: nbors.append(i+A)
  if plane != 0:   nbors.append(i-A)

  if (col != 0 or p < 0) and (col != W-1 or p > 0):
    if plane != D-1: nbors.append(i+A-p)
    if plane != 0:   nbors.append(i-A-p)

  if ((col != W - 1 or p > 0 or r < 0) and
      (col != 0 or p < 0 or r > 0) and
      (row != H-1 or p < 0) and
      (row != 0 or p > 0)):
    if plane != D-1:
      nbors.append(i + A + p*W + (r-p)/2) #10
    if plane != 0:
      nbors.append(i - A + p*W + (r-p)/2) #11

  return nbors

To make sure I got the logic correct, I used the following test while writing the above function

def test_neighbors():
  n = lambda i: set(neighbors(i, 5, 5, 5))

  # test bottom layer
  assert n(0) == set([1,5,6,25,30])
  assert n(2) == set([1,3,7,8,26,27,32])
  assert n(4) == set([3,9,28,29,34])
  assert n(5) == set([0,6,10,30])
  assert n(9) == set([3,4,8,13,14,33,34,38])
  assert n(20) == set([15,16,21,45])
  assert n(21) == set([16,17,20,22,45,46])
  assert n(24) == set([19,23,48,49])

  # test second layer
  assert n(25) == set([0,1,26,30,31,50,51])
  assert n(34) == set([4,9,28,29,33,38,39,54,59])
  assert n(36) == set([7,11,12,31,32,35,37,41,42,57,61,62])
  assert n(49) == set([24,44,48,74])

Note that the test doesn't cover all of the unique types of sites, so, there may still be a corner case somewhere that is wrong.

share|improve this answer
    
I originally wrote a much longer answer that motivates and builds up this code. But, SO gives me an about how my post "appears to contain code that is not properly formatted as code." (Although it appears to render everything correctly). If anyone wants the longer description, let me know and I'll put it up somewhere else. –  rephorm Apr 4 '12 at 6:43
    
This was really helpful thank you! I also am interested in your longer description and perhaps how to do find nearest neighbors in other configurations (like sphere packing within a giant sphere). I really appreciate it. –  Uncle Taco Apr 4 '12 at 16:09
    
More detail in this article. –  rephorm Apr 4 '12 at 23:07

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.