# Google Protocol Buffers: ZigZag Encoding

From "Signed Types" on Encoding - Protocol Buffers - Google Code:

ZigZag encoding maps signed integers to unsigned integers so that numbers with a small absolute value (for instance, -1) have a small varint encoded value too. It does this in a way that "zig-zags" back and forth through the positive and negative integers, so that -1 is encoded as 1, 1 is encoded as 2, -2 is encoded as 3, and so on, as you can see in the following table:

``````Signed Original  Encoded As
0                0
-1               1
1                2
-2               3
2147483647       4294967294
-2147483648      4294967295
``````

In other words, each value n is encoded using

`(n << 1) ^ (n >> 31)`

for sint32s, or

`(n << 1) ^ (n >> 63)`

for the 64-bit version.

How does `(n << 1) ^ (n >> 31)` equal whats in the table? I understand that would work for positives, but how does that work for say, -1? Wouldn't -1 be `1111 1111`, and `(n << 1)` be `1111 1110`? (Is bit-shifting on negatives well formed in any language?)

Nonetheless, using the fomula and doing `(-1 << 1) ^ (-1 >> 31)`, assuming a 32-bit int, I get `1111 1111`, which is 4 billion, whereas the table thinks I should have 1.

-

Shifting a negative signed integer to the right copies the sign bit, so that

``````(-1 >> 31) == -1
``````

Then,

``````(-1 << 1) ^ (-1 >> 31) = -2 ^ -1
= 1
``````

This might be easier to visualise in binary (8 bit here):

``````(-1 << 1) ^ (-1 >> 7) = 11111110 ^ 11111111
= 00000001
``````
-
Ah, which is in fact what the next paragraph that I was misreading says. Thanks very much! – Thanatos Dec 26 '10 at 8:55
I gave a +1. However it should be pointed out that the meanings of `>>` and `>>>` differ by language/implementation (see Shift Operator). In the case of the protocol-buffer document it explicitly says an Arithmetic Shift (aka "Signed Shift") which semantically does as described. – user166390 Mar 18 '11 at 18:34