# How do you keep the `roll` operator straight?

In postscript, the `roll` operator is very general and difficult to visualize. How do you make sure you're rolling in the right direction?

I want to get a solid handle on `roll` because I want to be able to transform functions using variables

``````/f { % x y z
/z exch def
/y exch def
/x exch def
x dup mul
y dup mul
} def
``````

into functions using stack manipulations, more like

``````/f { % x y z
3 1 roll dup mul % y z x^2
3 1 roll dup mul % z x^2 y^2
3 1 roll dup mul % x^2 y^2 z^2
} def
``````

or

``````/f { % x y z
3 { 3 1 roll dup mul } repeat
2 { add } repeat      % x^2+y^2+z^2
} bind def
``````

These should both execute faster by having fewer name-lookups (hashtable search).

With `roll` I always have to test it out; and I usually get it wrong on the first try! I'm okay with exch, though

-
This question is contrived to motivate the answer (Share your knowledge). Any suggestions for improvement are eagerly solicited. – luser droog Apr 14 '13 at 10:27

I had difficulty with roll for a very long time. I remember it now using these ways, which are all equivalent:

# the rhyme (-ish)

n j roll

• positive j, to roll away

``````7 8 9  3 1 roll
% 9 7 8``````

• negative, to get it back (or "negateeve, to then retrieve")

``````% 9 7 8
3 -1 roll
% 7 8 9``````

# stack (of things)

Perhaps a better way to think of it is a physical stack (of books, say) so the top of stack is literally "on top".

Then a positive roll goes up:

```   for j number of times
pick up n books
put the top one on the bottom (shifting the substack "up")
put them back down```

And a negative roll goes down:

```   for j number of times
pick up n books
put the bottom one on top (shifting the substack "down")
put them back down```

# sideways

But I usually picture the stack sideways, the way the objects would look in a file as a sequence of literals. So I think of the positive roll as stashing the top j things behind the nth thing; and the negative roll as snagging j things starting with the nth thing. Give and Take.

Away.

``````n j roll

__ j > 0 __     move top j elements to the bottom of n

n            TOS
-------------|
|       j     |
|        -----|
|       |     |
V       V     |

a b c d e f g h

^       |       |
|       |-------|
^           |
-<-<-<-<-<-
move
``````

And back.

``````__ j < 0 __   move j elements from the bottom of n to the top

n            TOS
-------------|
|     j       |
|-----        |
|     |       |
V     V       |

a b c d e f g h

|       |       ^
|-------|       |
|           ^
->->->->->-
move
``````

# lint-roller

Still another way is to picture it sideways, and laying a sticky wheel on top (a lint-roller, maybe)

```(a) (b) (c) (d) (e) 5 3 roll

_______
/       \
|   3   |
| / | \ |
\_______/
(a) (b) (c) (d) (e)```

Then a positive roll goes counterclockwise just like arc and rotate.

```       _______ (e)
/     / \
|   3 --| (d)
|     \ |
\_______/ (c)
(a) (b)

(e)__(d)__(c)
/\  |  /\
|   3   |
|       |
\_______/
(a) (b)

(c)_______
/\      \
(d) |-- 3   |
|/      |
\_______/
(e) (a) (b)

_______
/       \
|   3   |
| / | \ |
\_______/
(c) (d) (e) (a) (b)```

And a negative roll goes clockwise like arcn and a negative rotation.

```    _______
/       \
|   3   |
| / | \ |
\_______/
(a) (b) (c) (d) (e)

(a)_______
/\      \
(b) |-- 3   |
|/      |
\_______/
(c)       (d) (e)

(c)__(b)__(a)
/\  |  /\
|   3   |
|       |
\_______/
(d) (e)

_______ (c)
/     / \
|   3 --| (b)
|     \ |
\_______/ (a)
(d) (e)

_______
/       \
|   3   |
| / | \ |
\_______/
(d) (e) (a) (b) (c)```

# eliminate the negative

It shouldn't be difficult to see that negative rolls are entirely unnecessary because if j<0, it can be replaced by n-j. eg.

``````3 -1 roll  % roll bottom 1 element from 3 to the top
3 2 roll   % roll top 2 elements behind the 3rd
``````

are the same.

``````16 -4 roll  % roll bottom 4 elements from 16 to the top
16 12 roll  % roll top 12 elements behind the 16th
``````

are the same.

This leads to the final, ultimate simplified view (though each of the above will work, too).

# Roll is just a big Swap

You're really just exchanging the top j elements with the n-j elements below that.

Say you have this mess on the stack (where \$TOS\$ marks the top of the stack), and want to order it properly:

``````g  h  i  j  k  l  m  n  o  p  q  r  s  t  u  v  w  x  y  z  a  b  c  d  e  f \$TOS\$
``````

Count up (down) for n and j.

``````g  h  i  j  k  l  m  n  o  p  q  r  s  t  u  v  w  x  y  z  a  b  c  d  e  f
26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9  8  7  6  5  4  3  2  1
|                                                         | j = 6 .  .  .  .
| n = 26 .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .

> 26 6 roll   pstack

a  b  c  d  e  f  g  h  i  j  k  l  m  n  o  p  q  r  s  t  u  v  w  x  y  z
``````

A negative value for j simply positions that dividing line relative to the deepest element from among the n elements (it counts from below).

``````t  u  v  w  x  y  z  a  b  c  d  e  f  g  h  i  j  k  l  m  n  o  p  q  r  s
26 25 24 23 22 21 20 19 18 17 16 15 14 13 12 11 10 9  8  7  6  5  4  3  2  1
.  .  .  .   j = -7 |                                                      |
.  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  .  . n = 26 |

> 26 -7 roll  pstack

a  b  c  d  e  f  g  h  i  j  k  l  m  n  o  p  q  r  s  t  u  v  w  x  y  z
``````

Here is a convenience function that gives an interface to roll that's more closely analogous to the big swap view.

``````% r0..rN s0..sM n m  swap  s0..sM r0..rN
% a gentler interface to the power of roll
/swap {
roll
} def
0 1 2 3 /a /b /c 4 3 swap pstack
``````

Output:

``````GPL Ghostscript 8.62 (2008-02-29)
If you've read all the way to here, test your understanding by trying to read the /xpose function here which does a transpose of a flattened 4x4 matrix. The function could be factored to have all the numbers in a 2d array and `{aload pop roll}forall`, but then there'd be nowhere to write the comment. :) – luser droog Apr 15 '13 at 6:28