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I'm trying to find hard facts that will help my management understand how hard/easy it is to reverse-engineer compiled C code.

Similar questions have been asked before on this site (see e.g. Is it possible to “decompile” a Windows .exe? Or at least view the Assembly? or Possible to decompile DLL written in C?), but the gist of these questions is that decompiling compiled C code is "hard, but not entirely impossible".

In order to facilitate answers that are based in fact, I am including compiled code for a mystery function, and I propose that answers to this question measure the success or failure of the proposed techniques by whether they can determine what this function does. This may be unusual for SO but I think it's the best way to get "good subjective" or factual answers to this engineering question. Therefore, What is your best guess at what this function is doing, and how?

This is the compiled code, compiled on Mac OSX with gcc:

_mystery:
Leh_func_begin1:
    pushq   %rbp
Ltmp0:
    movq    %rsp, %rbp
Ltmp1:
    movsd   LCPI1_0(%rip), %xmm1
    subsd   %xmm0, %xmm1
    pxor    %xmm2, %xmm2
    ucomisd %xmm1, %xmm2
    jbe     LBB1_2
    xorpd   LCPI1_1(%rip), %xmm1
LBB1_2:
    ucomisd LCPI1_2(%rip), %xmm1
    jb      LBB1_8
    movsd   LCPI1_0(%rip), %xmm1
    movsd   LCPI1_3(%rip), %xmm2
    pxor    %xmm3, %xmm3
    movsd   LCPI1_1(%rip), %xmm4
    jmp     LBB1_4
    .align  4, 0x90
LBB1_5:
    ucomisd LCPI1_2(%rip), %xmm1
    jb      LBB1_9
    movapd  %xmm5, %xmm1
LBB1_4:
    movapd  %xmm0, %xmm5
    divsd   %xmm1, %xmm5
    addsd   %xmm1, %xmm5
    mulsd   %xmm2, %xmm5
    movapd  %xmm5, %xmm1
    mulsd   %xmm1, %xmm1
    subsd   %xmm0, %xmm1
    ucomisd %xmm1, %xmm3
    jbe     LBB1_5
    xorpd   %xmm4, %xmm1
    jmp     LBB1_5
LBB1_8:
    movsd   LCPI1_0(%rip), %xmm5
LBB1_9:
    movapd  %xmm5, %xmm0
    popq    %rbp
    ret 
Leh_func_end1:

UPDATE

@Igor Skochinsky is the first to find the right answer: it is indeed a naive implementation of Heron's algorithm for calculating square roots. The original source code is here:

#include <stdio.h>

#define EPS 1e-7

double mystery(double x){
  double y=1.;
  double diff;
  diff=y*y-x;
  diff=diff<0?-diff:diff;
  while(diff>=EPS){
    y=(y+x/y)/2.;
    diff=y*y-x;
    diff=diff<0?-diff:diff;
  }
  return y;
}

int main() {
  printf("The square root of 2 is %g\n", mystery(2.));
}
share|improve this question

closed as not constructive by nos, GManNickG, Dancrumb, Vlad Lazarenko, Nemo Jan 14 '13 at 18:46

As it currently stands, this question is not a good fit for our Q&A format. We expect answers to be supported by facts, references, or expertise, but this question will likely solicit debate, arguments, polling, or extended discussion. If you feel that this question can be improved and possibly reopened, visit the help center for guidance.If this question can be reworded to fit the rules in the help center, please edit the question.

12  
You have 7k+ reputation and address "the site moderators"?? Haven't you worked out how this site works? –  Kerrek SB Jan 13 '13 at 21:53
3  
@djechlin: How is "guess what my assembler does?" ever a valid question? (or was that sarcasm?) –  Oliver Charlesworth Jan 13 '13 at 22:07
2  
@lindelof - I'll give you another example here where 10 lines of inlined functions and C++ templates are compiled into 4-5 machine instructions. What are the odds that anyone can reproduce the original source code? –  Bo Persson Jan 13 '13 at 23:33
2  
In general it is impossible, the original source is absolutely impossible, in rare cases where no optimizer was used and the code was so trivial that you dont need to bother going back to C, then you could reconstruct something that is functionally the same. –  dwelch Jan 14 '13 at 4:26
3  
Think of this as converting a wav file into an mp3, (an image to jpg, a movie to mpeg, etc) a lossy compression. You cannot get back the original signal. The same thing happens in the compiler, information from the source code being compile is lost, is not visible in the output, you cannot go back to the original. Functionally similar C code where possible is no more readable or maintainable than the assembly language, you are better off if you have to make modifications to do it in asm or write C code by hand from an analysis of the asm. –  dwelch Jan 14 '13 at 4:28

3 Answers 3

up vote 11 down vote accepted

Here's the results of decompilation with the Hex-Rays Decompiler after I converted code to x86 (it does not support x64 at the moment), added some data definitions missing in the original post, and assembled it:

//-------------------------------------------------------------------------
// Data declarations

double LCPI1_0 =  1.0; // weak
double LCPI1_1[2] = {  0.0,  0.0 }; // weak
double LCPI1_2 =  1.2; // weak
double LCPI1_3 =  1.3; // weak


//----- (00000000) --------------------------------------------------------
void __usercall mystery(__m128d a1<xmm0>)
{
  __m128d v1; // xmm1@1
  __m128d v2; // xmm1@4
  __int128 v3; // xmm2@4
  __m128d v4; // xmm5@7
  __m128d v5; // xmm1@7

  v1 = (__m128d)*(unsigned __int64 *)&LCPI1_0;
  v1.m128d_f64[0] = LCPI1_0 - a1.m128d_f64[0];
  if ( LCPI1_0 - a1.m128d_f64[0] < 0.0 )
    v1 = _mm_xor_pd(v1, *(__m128d *)LCPI1_1);
  if ( v1.m128d_f64[0] >= LCPI1_2 )
  {
    v2 = (__m128d)*(unsigned __int64 *)&LCPI1_0;
    v3 = *(unsigned __int64 *)&LCPI1_3;
    while ( 1 )
    {
      v4 = a1;
      v4.m128d_f64[0] = (v4.m128d_f64[0] / v2.m128d_f64[0] + v2.m128d_f64[0]) * *(double *)&v3;
      v5 = v4;
      v5.m128d_f64[0] = v5.m128d_f64[0] * v5.m128d_f64[0] - a1.m128d_f64[0];
      if ( v5.m128d_f64[0] < 0.0 )
        v5 = _mm_xor_pd(a1, (__m128d)*(unsigned __int64 *)LCPI1_1);
      if ( v5.m128d_f64[0] < LCPI1_2 )
        break;
      v2 = a1;
    }
  }
}
// 90: using guessed type double LCPI1_0;
// 98: using guessed type double LCPI1_1[2];
// A8: using guessed type double LCPI1_2;
// B0: using guessed type double LCPI1_3;

// ALL OK, 1 function(s) have been successfully decompiled

Clearly, it could use some improvement (XMM support is somewhat basic right now), but I think the basic algorithm is already understandable.

Edit: since it's apparent that only the low double of all XMM registers is used, it seems the function actually works with scalar doubles and not vectors. As for the _mm_xor_pd (xorpd) intrinsic, I think it's just the way the compiler implements sign inversion - by xoring with a predefined constant which has 1s in sign bit positions and 0s everywhere else. With the above in mind, and after some cleanup, I get the following code:

double mystery(double a1)
{
  double v1; // xmm1@1
  double v2; // xmm1@4
  double v3; // xmm2@4
  double v4; // xmm5@7
  double v5; // xmm1@7

  v1 = LCPI1_0 - a1;
  if ( v1 < 0.0 )
    v1 = -v1;
  if ( v1 < LCPI1_2 )
  {
    v4 = LCPI1_0;
  }
  else
  {
    v2 = LCPI1_0;
    v3 = LCPI1_3;
    while ( 1 )
    {
      v4 = a1;
      v4 = (v4 / v2 + v2) * v3;
      v5 = v4;
      v5 = v5 * v5 - a1;
      if ( v5 < 0.0 )
        v5 = -v5;
      if ( v5 < LCPI1_2 )
        break;
      v2 = a1;
    }
  }
  return v4;
}

It produces assembly pretty similar to the original post.

share|improve this answer
    
So, what is your best guess as to what this code is doing? I think you need algorithm recognition on top of low level code recovery. PS: nice job reverse engineering to where you got, +1 in spite of being closed :) –  Ira Baxter Jan 14 '13 at 23:44
    
Looks like the Babylonian method of square root calculation. LCPI1_0 is the initial approximation, LCPI1_2 is epsilon, and LCPI1_3 is the constant 0.5. –  Igor Skochinsky Jan 15 '13 at 10:51
    
@IgorSkochinsky congratulations, you dit it! –  lindelof Jan 15 '13 at 19:09

Reverse engineering / decompiling any code is a matter of the time it takes vs the benefit in doing so; not how hard it is to do.

If you have some secret sauce that you absolutely can't allow to get out, then the only thing you can do is have that secret sauce as a web service which gets called upon as necessary. This way the binaries never leave your corporate walls.

Even obfuscation only goes so far as anything can be traced once a hacker has the compiled binaries on a system they control. Heck, the original PC clones were created by reverse engineering the IBM BIOS.

So, back to the point: Again, it's not a question of how hard something is, it's more a question of whether anyone would want to try... which is based on what perceived value they would get out of it. Whether direct dollars (receiving or saving), competitive advantage or simply bragging rights. Compounding this is the availability of the application: wider distribution equals higher potential for finding it's way into a hackers bucket of things to work on.

If those values exist, then you can be assured that someone will try and they will succeed. Which should lead you to the next question: What if they do? What's the worst outcome?

In some cases it's simply a lost sale, that you may not have gotten anyway. In others it could be the loss of the business.

share|improve this answer

Fundamentally, doing individual machine-instruction "reverse engineering" is pretty easy because machine instructions have extremely well defined semantics. This will give you bad C code, but surely that's not the goal. (Knowing that some binary pattern in a file is a machine instruction is technically Turing-hard, e.g, impossible in some cases; less likely to be so in the case of compiler-generated code).

Beyond that, you are trying infer algorithms and intent. That's extremely hard; where does the knowledge containing all this come from?

You might find my paper on reverse engineering interesting. It suggests a way to encode the necessary knowledge.

There are also commercial tools to do this to some degree. This doesn't go as far as the scheme my paper outlines, but still produces pretty reasonable C code, as I understand it. (I have no specific experience with this tool, but have great respect for the author and his tooling).

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