OEIS/FASS curves
Beyond OEIS sequence A220952
Sequence A220952 is best discussed with numbers to base 5. The first 125 values then are:
0, 1,2,3,4, 14,24,34,33,32,31,21,22,23,13,12,11,10,20,30,40,41,42,43,44, 144,244,344,343,342,341,241,242,243,143,142,141,140,240,340,330,320,310,210,220, 230,130,120,110,111,112,113,123,122,121,131,132,133,233,232,231,221,222,223,213, 212,211,311,312,313,323,322,321,331,332,333,334,324,314,214,224,234,134,124,114, 104,204,304,303,302,301,201,202,203,103,102,101,100,200,300,400,401,402,403,404, 414,424,434,433,432,431,421,422,423,413,412,411,410,420,430,440,441,442,443,444
In each generation the number of digits is increased by one. The first 25 values form the adjacency condition matrix as defined by Knuth:
04==14==24==34 44 || || || 03 13==23 33 43 || || || || || 02 12 22 32 42 || || || || || 01 11 21==31 41 || || || 00 10==20==30==40
Here, the last digit is the y coordinate, and the digit before is the x coordinate. In generation 3, the left-most digit can be interpreted as the z coordinate.
The curve is space-filling in every dimension
For the cube I wrote a Javascript program with the beautiful framework three.js.
Variants
There is another, trivial matrix:
04==14 24==34 44 || || || || || 03 13 23 33 43 || || || || || 02 12 22 32 42 || || || || || 01 11 21 31 41 || || || || || 00 10==20 30==40
A third shows the structure of an "s" inside:
04==14==24==34 44 || || || 03 13==23==33 43 || || || 02 12==22==32 42 || || || 01 11==21==31 41 || || || 00 10==20==30==40
The corresponding spinning cube shows the coordinate digits.