# Implementing a 4-heap using an array

What kind of math do you use to traverse the 4-heap when using an array to store all the elements? Specifically, how do you find the index of a parent node to a specific leaf?

Let's say I have the following array:

0|1|2|3|4|5|6|7|8|9|10|... etc.

with the heap then constructed from that with 1 being the root, 2..5 its children, 6..9 2's children etc.

What exactly is the math i need if I need to find (for example) the parent of 6?

-

## 3 Answers

To find the parent of any child (other than 1, which has no parent):

``````parent = int((child + 2) / 4)
``````

To find the first and last child of a parent:

``````child_first = parent * 4 - 2
child_last  = parent * 4 + 1
``````

You can see this in operation since, at each level, you add four times as many elements as you did in the previous level:

``````  1           (   1)
2 thru    5 (   4)
6 thru   21 (  16)
22 thru   85 (  64)
86 thru  341 ( 256)
342 thru 1365 (1024)

Level 1:
1 -> 2 3 4 5

Level 2:
2 ->  6  7  8  9
3 -> 10 11 12 13
4 -> 14 15 16 17
5 -> 18 19 20 21

Level 3:
6 -> 22 23 24 25
7 -> 26 27 28 29
8 -> 30 31 32 33
9 -> 34 35 36 37
10 -> 38 39 40 41
11 -> 42 43 44 45
12 -> 46 47 48 49
13 -> 50 51 52 53
14 -> 54 55 56 57
15 -> 58 59 60 61
16 -> 62 63 64 65
17 -> 66 67 68 69
18 -> 70 71 72 73
19 -> 74 75 76 77
20 -> 78 79 80 81
21 -> 82 83 84 85
``````

``````Level 4:
22 ->  86  87  88  89
23 ->  90  91  92  93
24 ->  94  95  96  97
25 ->  98  99 100 101
: : : :
82 -> 326 327 328 329
83 -> 330 331 332 333
84 -> 334 335 336 337
85 -> 338 339 340 341
``````

Examples are:

``````parent of 342 = int(344/4) = 86 (same for 343,344,345).
parent of 346 = int(348/4) = 87 (same for 347,348,349).
first child of 21 = 21 * 4 - 2 = 82
last  child of 21 = 21 * 4 + 1 = 85
``````
-

First a simple observation. Root is at 1, so all children begin at 2. Before index i there are i-1 vertices (remember, index 0 is not a vertex!) in the heap, each has 4 children exactly. So ith children will be at 2+4*(i-1) to 2+4*i-1 for example, 1's children are 2+4*0=2 to 2+4*0+3=5.

``````def son_(i):
return range(2+4*(i-1),2+4*i)
for i in range(1,10): print i,son_(i)
``````

output

``````1 [2, 3, 4, 5]
2 [6, 7, 8, 9]
3 [10, 11, 12, 13]
4 [14, 15, 16, 17]
5 [18, 19, 20, 21]
6 [22, 23, 24, 25]
7 [26, 27, 28, 29]
8 [30, 31, 32, 33]
9 [34, 35, 36, 37]
``````

No holes, see.

If first_son(i)=2+4i and last_son(i)=2+4i+3=4(i+1)+1, we have that father(n)=floor((n-2)/4)+1. (the +1 is to make the array to start at 1)

Let's test that:

``````def father_(n):
return (n-2)/4+1
for i in range(2,20): print i,father_(i)
``````

Output:

``````2 1
3 1
4 1
5 1
6 2
7 2
8 2
9 2
10 3
11 3
12 3
13 3
14 4
15 4
16 4
17 4
18 5
19 5
``````
-
I did, but somehow it stack into my head that you were talking about 2-heap. Sorry. Fixed now. –  Elazar Leibovich May 3 '09 at 12:12

You need integer division and multiplication. For example, the parent of 6 is `1+((6-1)/4) = 2`. The parent of 5 is `1+((5-1)/4) = 2`. The parent of 10 is `1+((10-1)/4) = 3`, etc. 2's children are `2+4*(2-1)..(2+4*(3-1))-1 = 6..9`.

-
You are right. I believe I fixed this now. –  Yuval F May 3 '09 at 11:50