# How get smallest n, that 2 ^ n >= x for given integer x in O(1)?

How for given unsigned integer `x` find the smallest n, that `2 ^ n``x` in O(1)? in other words I want to find the index of higher set bit in binary format of `x` (plus 1 if `x` is not power of 2) in O(1) (not depended on size of integer and size of byte).

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Tagged as homework, as it does sound like that. If that's wrong, please remove tag. –  Tony The Lion May 11 '11 at 9:51
In constant time? I doubt that is possible!! –  Tony The Lion May 11 '11 at 9:52
@Tony The Tiger: not necessarily homework: could as well be an interview question. Should be precised anyway tought. –  ereOn May 11 '11 at 9:53
Similar: stackoverflow.com/questions/53161/… (but not constant time) –  Rup May 11 '11 at 9:54

If you have no memory constraints, then you can use a lookup table (one entry for each possible value of `x`) to achieve O(1) time.

If you want a practical solution, most processors will have some kind of "find highest bit set" opcode. On x86, for instance, it's `BSR`. Most compilers will have a mechanism to write raw assembler.

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no memory constraints... that says it all, isn't that a fairly theoretical thing, as there will always be memory constraints? –  Tony The Lion May 11 '11 at 9:55
@Tony: If this is a computer science problem, rather than a practical problem, then we often ignore little details such as "memory constraints"! –  Oli Charlesworth May 11 '11 at 9:55
oh ok, that is true! –  Tony The Lion May 11 '11 at 9:57
Sometimes in CS there are memory constraints: a Turing machine must have access to an infinite tape. That's a constraint right there. :P –  R. Martinho Fernandes May 11 '11 at 11:39

An interesting question. What do you mean by not depending on the size of int or the number of bits in a byte? To encounter a different number of bits in a byte, you'll have to use a different machine, with a different set of machine instructions, which may or may not affect the answer.

Anyway, based sort of vaguely on the first solution proposed by Mihran, I get:

``````int
topBit( unsigned x )
{
int r = 1;
if ( x > 1 ) {
if ( frexp( static_cast<double>( x ), &r ) != 0.5 ) {
++ r;
}
}
return r - 1;
}
``````

This works within the constraint that the input value must be exactly representable in a `double`; if the input is `unsigned long long`, this might not be the case, and on some of the more exotic platforms, it might not even be the case for `unsigned`.

The only other constant time (with respect to the number of bits) I can think of is:

``````int
topBit( unsigned x )
{
return x == 0 ? 0.0 : ceil( log2( static_cast<double>( x ) ) );
}
``````

, which has the same constraint with regards to `x` being exactly representable in a `double`, and may also suffer from rounding errors inherent in the floating point operations (although if `log2` is implemented correctly, I don't think that this should be the case). If your compiler doesn't support `log2` (a C++11 feature, but also present in C90, so I would expect most compilers to already have implemented it), then of course, `log( x ) / log( 2 )` could be used, but I suspect that this will increase the risk of a rounding error resulting in a wrong result.

FWIW, I find the O(1) on the number of bits a bit illogical, for the reasons I specified above: the number of bits is just one of the many "constant factors" which depend on the machine on which you run. Anyway, I came up with the following purely integer solution, which is O(lg 1) for the number of bits, and O(1) for everything else:

``````template< int k >
struct TopBitImpl
{
static int const k2 = k / 2;
static unsigned const m = ~0U << k2;
int operator()( unsigned x ) const
{
unsigned r = ((x & m) != 0) ? k2 : 0;
return r + TopBitImpl<k2>()(r == 0 ? x : x >> k2);
}
};

template<>
struct TopBitImpl<1>
{
int operator()( unsigned x ) const
{
return 0;
}
};

int
topBit( unsigned x )
{
+ (((x & (x - 1)) != 0) ? 1 : 0);
}
``````

A good compiler should be able to inline the recursive calls, resulting in close to optimal code.

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I find the `x<y>()(z)` syntax pretty awkward. Making `operator()` a `static` member function would turn that into the IMO more idiomatic `x<y>::f(z)`. Oh, and making `x` a compile-time constant allows a pure compile-time solution. –  sbi May 11 '11 at 17:03
I find the syntax pretty awkward too, but making `operator()` static isn't an option, since the standard requires `operator()` to be non-static. Giving the function a name and making it static would probably be cleaner than what I wrote, but I was too lazy to think of a good name, and there's a long tradition for using `operator()` when you don't have a good name (and sometimes even when you do). –  James Kanze May 12 '11 at 8:45

Ok, since so far nobody has posted a compile-time solution, here's mine. The precondition is that your input value is a compile-time constant. If you have that, it's all done at compile-time.

``````#include <iostream>
#include <iomanip>

// This should really come from a template meta lib, no need to reinvent it here,
// but I wanted this to compile as is.
namespace templ_meta {
// A run-of-the-mill compile-time if.
template<bool Cond, typename T, typename E> struct if_;
template<           typename T, typename E> struct if_<true , T, E> {typedef T result_t;};
template<           typename T, typename E> struct if_<false, T, E> {typedef E result_t;};

// This so we can use a compile-time if tailored for types, rather than integers.
template<int I>
struct int2type {
static const int result = I;
};
}

// This does the actual work.
template< int I, unsigned int Idx = 0>
struct index_of_high_bit {
static const unsigned int result =
templ_meta::if_< I==0
, templ_meta::int2type<Idx>
, index_of_high_bit<(I>>1),Idx+1>
>::result_t::result;
};

// just some testing
namespace {
template< int I >
void test()
{
const unsigned int result = index_of_high_bit<I>::result;
std::cout << std::setfill('0')
<< std::hex << std::setw(2) << std::uppercase << I << ": "
<< std::dec << std::setw(2) << result
<< '\n';
}
}

int main()
{
test<0>();
test<1>();
test<2>();
test<3>();
test<4>();
test<5>();
test<7>();
test<8>();
test<9>();
test<14>();
test<15>();
test<16>();
test<42>();
return 0;
}
``````

'twas fun to do that.

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Wasn't my downvote, but this isn't O(1). I bet it was fun, but it doesn't answer the question. –  Fred Nurk May 12 '11 at 9:44
"Evaluated at compile-time" is not the same thing as O(1), and that's not even getting into assuming the input is available as a compile-time constant is a big stretch, when the question doesn't state that. –  Fred Nurk May 12 '11 at 9:53
Doing the work for a given problem beforehand (for a particular set of inputs, as opposed to generating a generic lookup table), saving the result, and then saying "I can find it in zero time" is misleading, to say the least. –  Fred Nurk May 12 '11 at 10:09
@sbi: Oli's solution requires a general lookup table that can be reused for any input. Your solution requires pre-computing the answer knowing the exact input in advance. These are not the same thing. –  Fred Nurk May 12 '11 at 10:18
@sbi As it is possible to implement "Turing Machine" via template metaprogramming, so theoritically we can solve each problem compile time. You have done it for this problem. Thank you! But actually I might to calculate `n` runtime :) –  Mihran Hovsepyan May 14 '11 at 14:18

It's a question about finding the highest bit set (as lshtar and Oli Charlesworth pointed out). Bit Twiddling Hacks gives a solution which takes about 7 operations for 32 Bit Integers and about 9 operations for 64 Bit Integers.

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After some search in internet I found this 2 versions for 32 bit unsigned integer number. I have tested them and they work. It is clear for me why second one works, but still now I'm thinking about first one...

1.

``````unsigned int RoundUpToNextPowOf2(unsigned int v)
{
unsigned int r = 1;
if (v > 1)
{
float f = (float)v;
unsigned int const t = 1U << ((*(unsigned int *)&f >> 23) - 0x7f);
r = t << (t < v);
}
return r;
}
``````

2.

``````unsigned int RoundUpToNextPowOf2(unsigned int v)
{
v--;
v |= v >> 1;
v |= v >> 2;
v |= v >> 4;
v |= v >> 8;
v |= v >> 16;
v++;
return v;
}
``````

edit: First one in clear as well.

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I don't exactly understand how this works, but clearly it does not fulfill your requirement of `not depended on size of integer and size of byte` –  davka May 11 '11 at 11:10
@davka Actually this will help me because it is possible to write same algo for 64 bit integer and call the one is needed after checking size of integer. –  Mihran Hovsepyan May 11 '11 at 11:12
still you need to assume upper limit on x which is not `not depended on size of integer` any more –  davka May 11 '11 at 11:16
The first actually requires IEEE floating point and 32 bit ints. –  James Kanze May 11 '11 at 14:39
It also gives completely different results than those asked for. –  James Kanze May 11 '11 at 15:04

For a 32 bit int, the following pseudocode will be O(1).

``````highestBit(x)
bit = 1
highest = 0
for i 1 to 32
if x & bit == 1
highest = i
bit = bit * 2
return highest + 1
``````

It doesn't matter how big x is, it always checks all 32 bits. Thus constant time.

If the input can be any integer size, say the input is n digits long. Then any solution reading the input, will read n digits and must be at least O(n). Unless someone comes up solution without reading the input, it is impossible to find a O(1) solution.

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@lshtar this is not O(1). Read the question carefully `O(1) (not depended on size of integer and size of byte)` –  Mihran Hovsepyan May 11 '11 at 10:33
@Mihran - That's the confusing part, you don't want it to depend on the size of the integer, but, you also mean a integer smaller or equal to a `unsigned int`. The pseudo code really does not depend on the size of the integer, assuming it is at most 32 bits. If I do `highestBit(1)` or `highestBit(MAX_INT)` running time is the same. –  Ishtar May 11 '11 at 10:38
this is an interesting way to achieve O(1) algorithms - always run in the worst case number of steps :) –  davka May 11 '11 at 11:12
@Martin: No it isn't. –  Oli Charlesworth May 11 '11 at 12:04
@Oli Charlesworth: Actually it is. But I could not be bothered arguing about. That's we I deleted my comment. But my comment was based actually based on it not being dependent on the value of X. But then I reread the question and it was based on the sizeof(x). Technically its an abuse of O() notation as it its not really designed for this. Techncially big O() is used to measure how an algorithm changes in relation to the amount of data. Here the amount of data is always fixed sizeof(n) is constant. –  Loki Astari May 11 '11 at 17:30
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Some math to transform the expression:

`````` int n = ceil(log(x)/log(2));
``````

This is obviously O(1).

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only if you consider `log(x)` as one operation, which is not –  davka May 11 '11 at 11:03
@davka: Why is log(x) not O(1). –  Loki Astari May 11 '11 at 11:59
@Martin - depends on what you consider as atomic operations in which you measure your algorithm's complexity. It is common to use very basic operations (e.g. arithmetics and memory access) so that the complexity analysis would be independent from a particular hardware. But even if you take all your processor's instruction set as basic ops, still `log(x)` requires computation which is not `O(1)`. The fact that it is written as one library function call does not make it atomic. –  davka May 11 '11 at 12:14
Are the number of instructions for log() dependent on the sizeof x? (apparently not the value of x). –  Loki Astari May 11 '11 at 12:48
@Martin Not in the implementations I've seen. –  James Kanze May 11 '11 at 14:35
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As has been mentioned, the length of the binary representation of x + 1 is the n you're looking for (unless x is in itself a power of two, meaning 10.....0 in a binary representation). I seriously doubt there exists a true solution in O(1), unless you consider translations to binary representation to be O(1).

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we don't need to "tranlate" to binary representation. It is already stored in memory in binary format. –  Mihran Hovsepyan May 11 '11 at 10:13
@Mihran Hovsepyan Of course it is, but how do you get the length of its binary representation in O(1)? Maybe there's some sort of binary operators trick here to find the last (leftmost) '1'... Regardless, if you can assume you know its binary representation, then as mention, it's the length + 1 (or the length itself, if x = 2^k for some natural k) –  Gal May 11 '11 at 10:15
I can get num of bits in `unsigned int` in O(1) but not num of bits of binary representation of integer x. –  Mihran Hovsepyan May 11 '11 at 10:31
aye, forgot about 2's complement representation :) well then, if the number is negative or is 0, the required n equals 0 (or minus infinity, depends on the requirements from n). if the number is positive, just cast it into a unsigned int. –  Gal May 11 '11 at 10:33

Warning : the code is not exactly straightforward and seems rather unmaintainable.

``````  uint64_t v;          // Input value to find position with rank r.
unsigned int r;      // Input: bit's desired rank [1-64].
unsigned int s;      // Output: Resulting position of bit with rank r [1-64]
uint64_t a, b, c, d; // Intermediate temporaries for bit count.
unsigned int t;      // Bit count temporary.

// Do a normal parallel bit count for a 64-bit integer,
// but store all intermediate steps.
// a = (v & 0x5555...) + ((v >> 1) & 0x5555...);
a =  v - ((v >> 1) & ~0UL/3);
// b = (a & 0x3333...) + ((a >> 2) & 0x3333...);
b = (a & ~0UL/5) + ((a >> 2) & ~0UL/5);
// c = (b & 0x0f0f...) + ((b >> 4) & 0x0f0f...);
c = (b + (b >> 4)) & ~0UL/0x11;
// d = (c & 0x00ff...) + ((c >> 8) & 0x00ff...);
d = (c + (c >> 8)) & ~0UL/0x101;
t = (d >> 32) + (d >> 48);
// Now do branchless select!
s  = 64;
// if (r > t) {s -= 32; r -= t;}
s -= ((t - r) & 256) >> 3; r -= (t & ((t - r) >> 8));
t  = (d >> (s - 16)) & 0xff;
// if (r > t) {s -= 16; r -= t;}
s -= ((t - r) & 256) >> 4; r -= (t & ((t - r) >> 8));
t  = (c >> (s - 8)) & 0xf;
// if (r > t) {s -= 8; r -= t;}
s -= ((t - r) & 256) >> 5; r -= (t & ((t - r) >> 8));
t  = (b >> (s - 4)) & 0x7;
// if (r > t) {s -= 4; r -= t;}
s -= ((t - r) & 256) >> 6; r -= (t & ((t - r) >> 8));
t  = (a >> (s - 2)) & 0x3;
// if (r > t) {s -= 2; r -= t;}
s -= ((t - r) & 256) >> 7; r -= (t & ((t - r) >> 8));
t  = (v >> (s - 1)) & 0x1;
// if (r > t) s--;
s -= ((t - r) & 256) >> 8;
s = 65 - s;
``````
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You can use precalculated tables.

If your number is in [0,255] interval, simple table look up will work.

If it's bigger, then you may split it by bytes and check them from high to low.

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This runs in O(log N) time, where N is the maximum size of `x`. –  Oli Charlesworth May 11 '11 at 9:56
In `<cmath>` there are logarithm functions that will perform this computation for you.
`ceil(log(x) / log(2));`