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Consider a $n$ by $n$ by $n$ grid represented by the set of $3$-uples $S=\{1,2,\dots, n\}^3$.
A line (resp. slice) of $S$ is a subset of cardinal $n$ (resp. $n^2$) where two components (resp. one component) of the $3$-uples are fixed.

Some boxes of the grid are black (and the remaining ones are white), they are represented by a subset $B \subseteq S$. For a fixed $r \le n$, consider the following assumptions on $B$:

  • every line contains exactly $r$ black boxes.
  • in every slice, the black boxes can be filled collinearly, i.e. there is an ordering $b_1, b_2, \dots, b_{rn}$ such that for all $i>1$ there is $j<i$ such that $b_i$ and $b_j$ are in a same line.

The examples below, given by the pictures of parallel slices, satisfies the two above assumptions.

For $r=2$ and $n = 3$:

$\substack{ \displaystyle{◻ ◼ ◼} \cr \displaystyle{◼ ◻ ◼} \cr \displaystyle{◼ ◼ ◻} } $ $\substack{ \displaystyle{◼ ◼ ◻} \cr \displaystyle{◻ ◼ ◼} \cr \displaystyle{◼ ◻ ◼} } $ $\substack{ \displaystyle{◼ ◻ ◼} \cr \displaystyle{◼ ◼ ◻} \cr \displaystyle{◻ ◼ ◼} } $

For $r=3$ and $n = 4$:

$\substack{ \displaystyle{◻ ◼ ◼ ◼} \cr \displaystyle{◼ ◻ ◼ ◼} \cr \displaystyle{◼ ◼ ◻ ◼} \cr \displaystyle{◼ ◼ ◼ ◻} } $ $\substack{ \displaystyle{◼ ◼ ◼ ◻} \cr \displaystyle{◻ ◼ ◼ ◼} \cr \displaystyle{◼ ◻ ◼ ◼} \cr \displaystyle{◼ ◼ ◻ ◼} } $ $\substack{ \displaystyle{◼ ◼ ◻ ◼} \cr \displaystyle{◼ ◼ ◼ ◻} \cr \displaystyle{◻ ◼ ◼ ◼} \cr \displaystyle{◼ ◻ ◼ ◼} } $ $\substack{ \displaystyle{◼ ◻ ◼ ◼} \cr \displaystyle{◼ ◼ ◻ ◼} \cr \displaystyle{◼ ◼ ◼ ◻} \cr \displaystyle{◻ ◼ ◼ ◼} } $

An ordering $b_1, b_2, \dots, b_{rn^2}$ of $B$ is Eulerian if for all $i>1$ and for all $j<i$, there is $k<i$ such that $b_i$ and $b_k$ are in a same line $l$, and if $b_i$ and $b_j$ are in a same slice $s$, then $l \subset s$.
The notion of Eulerian ordering is related to the notion of shelling, as explained in this post.

If $r=n$ then the grid contains black boxes only and the lexicographic ordering is Eulerian.
If $r=n-1$ then both cases are possible:
The above example with $(r,n) = (2,3)$ has no Eulerian ordering, as shown by brute-force search below, and any partial Eulerian ordering has length at most $8$:

enter image description here

The above example with $(r,n) = (3,4)$ has an Eulerian ordering:

enter image description here

Question: Do the two above assumptions imply the existence of an Eulerian ordering if $r \ge 3$?

Remark: I don't know whether the following examples, with $(r,n) = (3,7)$, have an Eulerian ordering (the second is a 90° rotation of the first).

enter image description here


Brute-force search with SAGE

Computation:

sage: %attach SAGE/EulerianGrid.spyx
Compiling ./SAGE/EulerianGrid.spyx... 
sage: S=[[1,1,1],[1,1,2],[1,2,1],[1,2,3],[1,3,2],[1,3,3],[2,1,1],[2,1,3],[2,2,2],[2,2,3],[2,3,1],[2,3,2],[3,1,2],[3,1,3],[3,2,1],[3,2,2],[3,3,1],[3,3,3]]
sage: %time PartialOrdering(S,[],8)
CPU times: user 10.4 s, sys: 15 ms, total: 10.4 s
Wall time: 10.5 s

Code:

# %attach SAGE/EulerianGrid.spyx

from sage.all import *

cpdef JoinDegree(list L1, list L2):
    cdef int i,c
    c=0
    for i in range(3):
        if L1[i]==L2[i]:
            c+=1
    return c

cpdef IsCollinearList(list l, list L):
    cdef list i
    if L==[]:
        return True
    for i in L:
        if JoinDegree(l,i)==2:
            return True
    return False

cpdef PartialOrdering(list L, list P, int A):
    cdef int c,cc
    cdef list i,j,k,t,LL,PP
    if len(P)>A:
        print(P)
    if L<>[]:
        for i in L:
            if IsCollinearList(i,P):
                cc=0
                for j in P:
                    if JoinDegree(i,j)==1:
                        c=0
                        for k in P:
                            if JoinDegree(i,k)==2 and JoinDegree(j,k)>=1:
                                c=1
                                break 
                        if c==0:
                            cc=1
                if cc==0:
                    LL=[t for t in L]
                    PP=[t for t in P]
                    LL.remove(i)
                    PP.append(i)
                    if LL<>[]:
                        PartialOrdering(LL,PP,A)
                    else:
                        return PP
$\endgroup$
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  • $\begingroup$ This is different from collinear ordering, right? Because I see a (level by level) collinear ordering of your 4 by 4 by 4 example. Gerhard "Which Makes A Nice Puzzle" Paseman, 2018.05.30. $\endgroup$ Commented May 30, 2018 at 19:41
  • $\begingroup$ @GerhardPaseman: Yes, for an ordering "Eulerian" is stronger than "collinear". The collinear condition is of the form "$\forall i>1, \exists j<i$...", whereas the Eulerian condition is of the form "$\forall i>1, \forall j<i, \exists k<i$...". For a 2D grid, these two conditions are the same, but it is no more true for a 3D grid (and beyond). $\endgroup$ Commented May 30, 2018 at 21:10
  • $\begingroup$ The example without Eulerian ordering (considered in the two above comments) was replaced by a 3 by 3 by 3 example. We also added a new 4 by 4 by 4 example having an Eulerian ordering. $\endgroup$ Commented Jul 29, 2018 at 10:43

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