x > -1 vs x >= 0, is there a performance difference

I have heard a teacher drop this once, and it has been bugging me ever since. Let's say we want to check if the integer x is bigger than or equal to 0. There are two ways to check this:

if (x > -1){
//do stuff
}

and

if (x >= 0){
//do stuff
}

According to this teacher > would be slightly faster then >=. In this case it was Java, but according to him this also applied for C, c++ and other languages. Is there any truth to this statement?

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And the type of x is...? – Jon Skeet Jan 25 '13 at 11:26
... 'the integer x' ? – Grant Thomas Jan 25 '13 at 11:27
Been asked for sure. – Alexey Frunze Jan 25 '13 at 11:27
@Cheiron: Think about what this means if x is a uint type... – Jon Skeet Jan 25 '13 at 11:29
The expressions make no sense with unsigned types: the first is never true, and the second always true. – James Kanze Jan 25 '13 at 11:33

There's no difference in any real-world sense.

Let's take a look at some code generated by various compilers for various targets.

• I'm assuming a signed int operation (which seem the intent of the OP)
• I've limited by survey to C and to compilers that I have readily at hand (admittedly a pretty small sample - GCC, MSVC and IAR)
• basic optimizations enabled (-O2 for GCC, /Ox for MSVC, -Oh for IAR)
• using the following module:

void my_puts(char const* s);

void cmp_gt(int x)
{
if (x > -1) {
my_puts("non-negative");
}
else {
my_puts("negative");
}
}

void cmp_gte(int x)
{
if (x >= 0) {
my_puts("non-negative");
}
else {
my_puts("negative");
}
}

And here's what each of them produced for the comparison operations:

MSVC 11 targeting ARM:

// if (x > -1) {...
00000        |cmp_gt| PROC
00000 f1b0 3fff    cmp         r0,#0xFFFFFFFF
00004 dd05         ble         |\$LN2@cmp_gt|

// if (x >= 0) {...
00024      |cmp_gte| PROC
00024 2800         cmp         r0,#0
00026 db05         blt         |\$LN2@cmp_gte|

MSVC 11 targeting x64:

// if (x > -1) {...
cmp_gt  PROC
00000 83 f9 ff     cmp     ecx, -1
00003 48 8d 0d 00 00                  // speculative load of argument to my_puts()
00 00        lea     rcx, OFFSET FLAT:\$SG1359
0000a 7f 07        jg  SHORT \$LN5@cmp_gt

// if (x >= 0) {...
cmp_gte PROC
00000 85 c9        test    ecx, ecx
00002 48 8d 0d 00 00                  // speculative load of argument to my_puts()
00 00        lea     rcx, OFFSET FLAT:\$SG1367
00009 79 07        jns     SHORT \$LN5@cmp_gte

MSVC 11 targeting x86:

// if (x > -1) {...
_cmp_gt PROC
00000 83 7c 24 04 ff   cmp     DWORD PTR _x\$[esp-4], -1
00005 7e 0d        jle     SHORT \$LN2@cmp_gt

// if (x >= 0) {...
_cmp_gte PROC
00000 83 7c 24 04 00   cmp     DWORD PTR _x\$[esp-4], 0
00005 7c 0d        jl  SHORT \$LN2@cmp_gte

GCC 4.6.1 targeting x64

// if (x > -1) {...
cmp_gt:
.seh_endprologue
test    ecx, ecx
js  .L2

// if (x >= 0) {...
cmp_gte:
.seh_endprologue
test    ecx, ecx
js  .L5

GCC 4.6.1 targeting x86:

// if (x > -1) {...
_cmp_gt:
mov eax, DWORD PTR [esp+4]
test    eax, eax
js  L2

// if (x >= 0) {...
_cmp_gte:
mov edx, DWORD PTR [esp+4]
test    edx, edx
js  L5

GCC 4.4.1 targeting ARM:

// if (x > -1) {...
cmp_gt:
.fnstart
.LFB0:
cmp r0, #0
blt .L8

// if (x >= 0) {...
cmp_gte:
.fnstart
.LFB1:
cmp r0, #0
blt .L2

IAR 5.20 targeting an ARM Cortex-M3:

// if (x > -1) {...
cmp_gt:
80B5 PUSH     {R7,LR}
.... LDR.N    R1,??DataTable1  ;; `?<Constant "non-negative">`
0028 CMP      R0,#+0
01D4 BMI.N    ??cmp_gt_0

// if (x >= 0) {...
cmp_gte:
80B5 PUSH     {R7,LR}
.... LDR.N    R1,??DataTable1  ;; `?<Constant "non-negative">`
0028 CMP      R0,#+0
01D4 BMI.N    ??cmp_gte_0

If you're still with me, here are the differences of any note between evaluating (x > -1) and (x >= 0) that show up:

• MSVC targeting ARM uses cmp r0,#0xFFFFFFFF for (x > -1) vs cmp r0,#0 for (x >= 0). The first instruction's opcode is two bytes longer. I suppose that may introduce some additional time, so we'll call this an advantage for (x >= 0)
• MSVC targeting x86 uses cmp ecx, -1 for (x > -1) vs test ecx, ecx for (x >= 0). The first instruction's opcode is one byte longer. I suppose that may introduce some additional time, so we'll call this an advantage for (x >= 0)

Note that GCC and IAR generated identical machine code for the two kinds of comparison (with the possible exception of which register was used). So according to this survey, it appears that (x >= 0) has an ever-so-slight chance of being 'faster'. But whatever advantage the minimally shorter opcode byte encoding might have (and I stress might have) will be certainly completely overshadowed by other factors.

I'd be surprised if you found anything different for the jitted output of Java or C#. I doubt you'd find any difference of note even for a very small target like an 8 bit AVR.

In short, don't worry about this micro-optimization. I think my write up here has already spent more time than will be spent by any difference in the performance of these expressions accumulated across all the CPUs executing them in my lifetime. If you have the capability to measure the difference in performance, please apply your efforts to something more important like studying the behavior of sub-atomic particles or something.

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And what if just before the comparation you need to calcule x?.... For example, the VERY common --x ? – qPCR4vir Jan 25 '13 at 22:45
I wouldn't expect that to have any significant impact on the ability of the compiler to generate equivalent code for the > -1 or >= 0 operations. – Michael Burr Jan 25 '13 at 23:07
These code snippets don't really illustrate the fact that the 0-comparison comes for free (on ARM at least) if x has just been calculated immediately prior, whereas the -1 comparison would require an explicit extra instruction. – Graham Borland Jan 28 '13 at 9:45
@GrahamBorland: Note that most of the ARM examples here treated x > -1 exactly the same as x >= 0 (ie., they noticed that the expressions are equivalent). I would expect them to do the same if x were calculated - at the moment I don't have a system to test that assumption on. On the other hand, the MSVC ARM compiler treats them slightly differently, and I'm able to test the MS ARM compiler. It still performs an explicit comparison for both the -1 and the 0 tests if x is calculated (there is still a cmp r3,#0 or cmp r3,#0xffffffff after the calculation is made). – Michael Burr Jan 28 '13 at 10:45
@MichaelBurr it actually doesn't surprise me at all that the MS compiler fails to spot this obvious optimization. :) – Graham Borland Jan 28 '13 at 10:54

It is very much dependent on the underlying architecture, but any difference will be minuscule.

If anything, I'd expect (x >= 0) to be slightly faster, as comparison with 0 comes for free on some instruction sets (such as ARM).

Of course, any sensible compiler will choose the best implementation regardless of which variant is in your source.

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@Thilo That's possibly true on some architectures (in which case, I would expect the compiler to make the change itself). On others (such as Intel), the two are exactly identical in time. – James Kanze Jan 25 '13 at 11:31
Assuming a dumb compiler, right? – R. Martinho Fernandes Jan 25 '13 at 11:31
Edited to mention that compilers will choose the best anyway. – Graham Borland Jan 25 '13 at 11:33
Agreed; programmers shouldn't need to worry about this level of detail unless they're programming the architectures. – Aram Kocharyan Jan 25 '13 at 11:43
I'd like to add the reason why >= 0 would be faster than > -1. This is due to assembly always comparing to 0. If the second value is not 0, the first value would be added (or subtracted) by the second value, after that possible comparison would be e, lt, le, gt, ge, ne (equals, less than, less than or equals, greater than, greather than or equals, not equals). Of course the added addition/subtraction would require additional cpu cycles. – Destrictor Jan 26 '13 at 1:09

Your teacher has been reading some really old books. It used to be the case with some architectures lacking the greater than or equal instruction that evaluating > required fewer machine cycles than >=, but these platforms are rare these days. I suggest going for readability, and using >= 0.

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But lets say we have a non PC architecture such as Arduino. Would it make a difference there? – Cheiron Jan 25 '13 at 11:35
@Cheiron: And the compiler is a million years old and can not spot the optimization. – Loki Astari Jan 25 '13 at 11:41
@Cheiron Even ATMEL's 8-bit AVRs have the BRGE (branch if greater than or equal) and BRSH (branch if same or higher) instructions, so you'd see no difference. – dasblinkenlight Jan 25 '13 at 11:43

A bigger concern here is premature optimisation. Many consider writing readable code more important than writing efficient code [1, 2]. I would apply these optimisations as a last stage in a low level library once the design has been proven to work.

You shouldn't be constantly considering making minuscule optimisations in your code at the cost of readability, since it'll make reading and maintaing the code harder. If these optimisations need to take place, abstract them into lower level functions so you're still left with code that's easier to read for humans.

As a crazy example, consider someone who writes their programs in assembly to someone who's willing to forgo that extra efficiency and use Java for its benefits in design, ease of use and maintainability.

As a side note, if you're using C, perhaps writing a macro which uses the slightly more efficient code is a more feasible solution, since it will achieve efficiency, readability and maintainability more than scattered operations.

And of course the tradeoffs of efficiency and readability depend on your application. If that loop is running 10000 times a second then it's a possibly bottleneck and you may want to invest time in optimising it, but if it's a single statement that's called occasionally it's probably not worth it for the minute gain.

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Yes, there is a difference, you should see the bytecode.

for

if (x >= 0) {
}

the bytecode is

IFLT L1

for

if (x > -1) {
}

the bytecode is

ICONST_M1
IF_ICMPLE L3

version 1 is faster, because it uses a special zero operand operation

iflt : jump if less than zero

But it is possible to see the difference only running JVM in interpret-only mode java -Xint ..., eg this Test

int n = 0;
for (;;) {
long t0 = System.currentTimeMillis();
int j = 0;
for (int i = 100000000; i >= n; i--) {
j++;
}
System.out.println(System.currentTimeMillis() - t0);
}

shows 690 ms for n = 0 and 760 ms for n = 1. (I used 1 instead of -1 because it's easier to demonstrate, the idea stays the same)

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Did you turn on optimizations? Will the JIT not optimize it away? – Loki Astari Jan 25 '13 at 11:43
Wow, the teacher was wrong on the "which one is faster", too :) – dasblinkenlight Jan 25 '13 at 11:47
for(int x = 10000000; x >= 0; x--) { }<-- this test wont work. Random noises will be longer than difference. – bigGuy Jan 25 '13 at 11:55
try my test with java -Xint Test, it works and shows some difference – Evgeniy Dorofeev Jan 25 '13 at 12:10
Benchmarking with -Xint is meaningless. – Michael Burr Jan 25 '13 at 18:19

In fact I believe the second version should be slightly faster as it requires a single bit check(assuming you compare at zero as you show above). However such optimizations never really show as most compilers will optimize such calls.

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">=" is single operation, just like ">". Not 2 separate operations with OR.

But >=0 is probably faster, because computer need to check only one bit (negative sign).

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We would also have to see how x gets its value (data flow analysis). The compiler might already know the result without checking anything. – Bo Persson Jan 25 '13 at 11:52

According to this teacher > would be slightly faster then >=. In this case it was Java, but according to him this also applied for C, c++ and other languages. Is there any truth to this statement?

Your teacher is fundamentally wrong. Not only why chance are than comparing with 0 can be sligly fast, but because this sort of local optimization are well done by your compiler / interpreter, and you can mess all trying to help. Definitively not a good thing to teach.

You can read: this or this

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Sorry to barge in on this conversation about performance.

Before I digress, let's note that the JVM has special instructions for handling not only zero, but also constants one through three. With this said, it's likely that the ability of the architecture to handle zero is long lost behind more than compiler optimization, but also bytecode to machine code translation and the such.

I remember from my x86 assembler language days that there were instructions in the set for both greater than (ja) and greater than or equal to (jae). You would do one of these:

; x >= 0
mov ax, [x]
mov bx, 0
cmp ax, bx
jae above

; x > -1
mov ax, [x]
mov bx, -1
cmp ax, bx
ja  above

These alternatives take the same amount of time, because the instructions are identical or similar, and they consume a predictable number of clock cycles. See, for example, this. ja and jae may indeed check a different number of arithmetic registers, but that check is dominated by the need for the instruction to take a predictable time. This in turn is needed to keep the CPU architecture manageable.

But I did come here to digress.

The answers before me tend to be pertinent, and also indicative that you're gonna be in the same ballpark insofar as performance is concerned, regardless of which approach you choose.

Which leaves you with choosing based on other criteria. And this is where I wanted to make a note. When testing indices, prefer the tight bound style check, chiefly x >= lowerBound, to the x > lowerBound - 1. The argument is bound to be contrived, but it boils down to readability, as here all else truly is equal.

Since conceptually you're testing against a lower bound, x >= lowerBound is the canonical test that elicits the most adapted cognition from readers of your code. x + 10 > lowerBound + 9, x - lowerBound >= 0, and x > -1 are all roundabout ways to test against a lower bound.

Again, sorry to barge in, but I felt like this was important beyond the academics of things. I always think in these terms and let the compiler worry about the minute optimizations that it thinks it can get out of fiddling with the constants and the strictness of the operators.

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First of all it highly depends on hardware platform. For modern PCs and ARM SoCs difference rely mostly on compiler optimisations. But for CPUs without FPU, signed math would be disaster.

For example simple 8-bit CPUs such as Intel 8008, 8048,8051, Zilog Z80, Motorola 6800 or even modern RISC PIC or Atmel microcontollers do all math via ALU with 8-bit registers and have basically only carry flag bit and z (zero value indicator) flag bits . All serious math is done via libraries, and expression

BYTE x;
if (x >= 0)

would definitely win, using JZ or JNZ asm instructions without very costly library calls.

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