# implementing shifts

I need to implement a bitwise shift (logical not arithmetic) on OpenInsight 8.

In the system mostly everything is a string but there are 4 functions that treat numbers as 32-bit integers.

The bitwise functions available are and or not and xor. Any arithmetic operators treat the number as signed.

I'm currently having a problem with implementing left and right shifts which I need to implement SHA-1.

Can anyone suggest an algorithm which can help me accomplish this? Pseudocode is good enough, I just need a general idea.

-
Do you really need to implement SHA1 yourself? No libraries available? – Bart Friederichs Aug 21 '12 at 12:41
Nope... no libraries. I looked around to try and find one – Cedric Mamo Aug 21 '12 at 13:28
Can you some code you have tried? – Bart Friederichs Aug 21 '12 at 13:48
pastebin.com/eS0KVDD4 – Cedric Mamo Aug 21 '12 at 14:33
why don't you use hexadecimal in the code snippet above? Isn't 0x80000000 easier to understand than 2,147,483,648? – Lưu Vĩnh Phúc Nov 21 '14 at 18:39

You can implement shifting with integer multiplication and division:

Shift left = *2

Shift right = /2

Perhaps you need to mask the number first to make the most siginificant bit zero to prevent integer overflow.

-
I tried that already but something is just not working correctly. That's why i asked for pseudocode so i can see if i did something wrong – Cedric Mamo Aug 21 '12 at 13:28
This won't work. Dividing a negative number by 2 rounds towards zero, whereas shifting a negative number right by 1 rounds towards negative infinity (and, for logical shifts, loses the sign bit). – harold Aug 21 '12 at 13:56

logical shift down by one bit using signed arithmetic and bitwise ops

```if v < 0 then
v = v & 0x7fffffff   // clear the top bit
v = v / 2            // shift the rest down
v = v + 0x40000000   // set the penultimate bit
else
v = v / 2
fi
```

-

If there's no logical right shift you can easily achieve that by right shifting arithmetically n bits then clear the top n bits

For example: shift right 2 bits:

``````x >= 2;
x &= 0x3fffffff;
``````

Shift right n bits

``````x >= n;
x &= ~(0xffffffff << (32 - n));
// or
x >= n;
x &= (1 << (32 - n)) - 1;
``````

For left shifting there's no logical/mathematical differentiation because they are all the same, just shift 0s in.

-