Suppose a1, b1, c1, and d1 point to heap memory and my numerical code has the following core loop.

const int n = 100000;

for (int j = 0; j < n; j++) {
    a1[j] += b1[j];
    c1[j] += d1[j];
}

This loop is executed 10,000 times via another outer for loop. To speed it up, I changed the code to:

for (int j = 0; j < n; j++) {
    a1[j] += b1[j];
}

for (int j = 0; j < n; j++) {
    c1[j] += d1[j];
}

Compiled on MS Visual C++ 10.0 with full optimization and SSE2 enabled for 32-bit on a Intel Core 2 Duo (x64), the first example takes 5.5 seconds and the double-loop example takes only 1.9 seconds. My question is: (Please refer to the my rephrased question at the bottom)

PS: I am not sure, if this helps:

Disassembly for the first loop basically looks like this (this block is repeated about five times in the full program):

movsd       xmm0,mmword ptr [edx+18h]
addsd       xmm0,mmword ptr [ecx+20h]
movsd       mmword ptr [ecx+20h],xmm0
movsd       xmm0,mmword ptr [esi+10h]
addsd       xmm0,mmword ptr [eax+30h]
movsd       mmword ptr [eax+30h],xmm0
movsd       xmm0,mmword ptr [edx+20h]
addsd       xmm0,mmword ptr [ecx+28h]
movsd       mmword ptr [ecx+28h],xmm0
movsd       xmm0,mmword ptr [esi+18h]
addsd       xmm0,mmword ptr [eax+38h]

Each loop of the double loop example produces this code (the following block is repeated about three times):

addsd       xmm0,mmword ptr [eax+28h]
movsd       mmword ptr [eax+28h],xmm0
movsd       xmm0,mmword ptr [ecx+20h]
addsd       xmm0,mmword ptr [eax+30h]
movsd       mmword ptr [eax+30h],xmm0
movsd       xmm0,mmword ptr [ecx+28h]
addsd       xmm0,mmword ptr [eax+38h]
movsd       mmword ptr [eax+38h],xmm0
movsd       xmm0,mmword ptr [ecx+30h]
addsd       xmm0,mmword ptr [eax+40h]
movsd       mmword ptr [eax+40h],xmm0

The question turned out to be of no relevance, as the behavior severely depends on the sizes of the arrays (n) and the CPU cache. So if there is further interest, I rephrase the question:

Could you provide some solid insight into the details that lead to the different cache behaviors as illustrated by the five regions on the following graph?

It might also be interesting to point out the differences between CPU/cache architectures, by providing a similar graph for these CPUs.

PPS: Here is the full code. It uses TBB Tick_Count for higher resolution timing, which can be disabled by not defining the TBB_TIMING Macro:

#include <iostream>
#include <iomanip>
#include <cmath>
#include <string>

//#define TBB_TIMING

#ifdef TBB_TIMING   
#include <tbb/tick_count.h>
using tbb::tick_count;
#else
#include <time.h>
#endif

using namespace std;

//#define preallocate_memory new_cont

enum { new_cont, new_sep };

double *a1, *b1, *c1, *d1;


void allo(int cont, int n)
{
    switch(cont) {
      case new_cont:
        a1 = new double[n*4];
        b1 = a1 + n;
        c1 = b1 + n;
        d1 = c1 + n;
        break;
      case new_sep:
        a1 = new double[n];
        b1 = new double[n];
        c1 = new double[n];
        d1 = new double[n];
        break;
    }

    for (int i = 0; i < n; i++) {
        a1[i] = 1.0;
        d1[i] = 1.0;
        c1[i] = 1.0;
        b1[i] = 1.0;
    }
}

void ff(int cont)
{
    switch(cont){
      case new_sep:
        delete[] b1;
        delete[] c1;
        delete[] d1;
      case new_cont:
        delete[] a1;
    }
}

double plain(int n, int m, int cont, int loops)
{
#ifndef preallocate_memory
    allo(cont,n);
#endif

#ifdef TBB_TIMING   
    tick_count t0 = tick_count::now();
#else
    clock_t start = clock();
#endif

    if (loops == 1) {
        for (int i = 0; i < m; i++) {
            for (int j = 0; j < n; j++){
                a1[j] += b1[j];
                c1[j] += d1[j];
            }
        }
    } else {
        for (int i = 0; i < m; i++) {
            for (int j = 0; j < n; j++) {
                a1[j] += b1[j];
            }
            for (int j = 0; j < n; j++) {
                c1[j] += d1[j];
            }
        }
    }
    double ret;

#ifdef TBB_TIMING   
    tick_count t1 = tick_count::now();
    ret = 2.0*double(n)*double(m)/(t1-t0).seconds();
#else
    clock_t end = clock();
    ret = 2.0*double(n)*double(m)/(double)(end - start) *double(CLOCKS_PER_SEC);
#endif

#ifndef preallocate_memory
    ff(cont);
#endif

    return ret;
}


void main()
{   
    freopen("C:\\test.csv", "w", stdout);

    char *s = " ";

    string na[2] ={"new_cont", "new_sep"};

    cout << "n";

    for (int j = 0; j < 2; j++)
        for (int i = 1; i <= 2; i++)
#ifdef preallocate_memory
            cout << s << i << "_loops_" << na[preallocate_memory];
#else
            cout << s << i << "_loops_" << na[j];
#endif

    cout << endl;

    long long nmax = 1000000;

#ifdef preallocate_memory
    allo(preallocate_memory, nmax);
#endif

    for (long long n = 1L; n < nmax; n = max(n+1, long long(n*1.2)))
    {
        const long long m = 10000000/n;
        cout << n;

        for (int j = 0; j < 2; j++)
            for (int i = 1; i <= 2; i++)
                cout << s << plain(n, m, j, i);
        cout << endl;
    }
}

(It shows FLOP/s for different values of n.)

enter image description here

  • 3
    Could be the operating system which slows while search the physical memory each time you access it and has something like cache in case of secondary access to the same memblock. – AlexTheo Dec 17 '11 at 20:47
  • 7
    Are you compiling with optimizations? That looks like a lot of asm code for O2... – Luchian Grigore Dec 17 '11 at 20:53
  • 53
    Just to be picky, these two code snippets are not equivalent due to potentially overlapping pointers. C99 has the restrict keyword for such situations. I don't know if MSVC has something similar. Of course, if this were the issue then the SSE code would not be correct. – user510306 Dec 17 '11 at 22:28
  • 7
    This may have something to do with memory aliasing. With one loop, d1[j] may aliase with a1[j], so the compiler may retract from doing some memory optimisations. While that doesn't happen if you separate the writings to memory in two loops. – rturrado Dec 19 '11 at 11:50
  • 8
    @RocketRoy Before you go around accusing people of making stuff up, why don't you actually try paying attention to some of the details? You say in your answer that you can't reproduce it. This question is 5 years old. Have you considered the possibility that processors have improved since then? Look at my answer, it shows that it reproduces big time on Core 2, but less so on Nehalem and later. – Mysticial Nov 23 '16 at 18:31

10 Answers 10

up vote 1565 down vote accepted

Upon further analysis of this, I believe this is (at least partially) caused by data alignment of the four pointers. This will cause some level of cache bank/way conflicts.

If I've guessed correctly on how you are allocating your arrays, they are likely to be aligned to the page line.

This means that all your accesses in each loop will fall on the same cache way. However, Intel processors have had 8-way L1 cache associativity for a while. But in reality, the performance isn't completely uniform. Accessing 4-ways is still slower than say 2-ways.

EDIT : It does in fact look like you are allocating all the arrays separately. Usually when such large allocations are requested, the allocator will request fresh pages from the OS. Therefore, there is a high chance that large allocations will appear at the same offset from a page-boundary.

Here's the test code:

int main(){
    const int n = 100000;

#ifdef ALLOCATE_SEPERATE
    double *a1 = (double*)malloc(n * sizeof(double));
    double *b1 = (double*)malloc(n * sizeof(double));
    double *c1 = (double*)malloc(n * sizeof(double));
    double *d1 = (double*)malloc(n * sizeof(double));
#else
    double *a1 = (double*)malloc(n * sizeof(double) * 4);
    double *b1 = a1 + n;
    double *c1 = b1 + n;
    double *d1 = c1 + n;
#endif

    //  Zero the data to prevent any chance of denormals.
    memset(a1,0,n * sizeof(double));
    memset(b1,0,n * sizeof(double));
    memset(c1,0,n * sizeof(double));
    memset(d1,0,n * sizeof(double));

    //  Print the addresses
    cout << a1 << endl;
    cout << b1 << endl;
    cout << c1 << endl;
    cout << d1 << endl;

    clock_t start = clock();

    int c = 0;
    while (c++ < 10000){

#if ONE_LOOP
        for(int j=0;j<n;j++){
            a1[j] += b1[j];
            c1[j] += d1[j];
        }
#else
        for(int j=0;j<n;j++){
            a1[j] += b1[j];
        }
        for(int j=0;j<n;j++){
            c1[j] += d1[j];
        }
#endif

    }

    clock_t end = clock();
    cout << "seconds = " << (double)(end - start) / CLOCKS_PER_SEC << endl;

    system("pause");
    return 0;
}

Benchmark Results:

EDIT: Results on an actual Core 2 architecture machine:

2 x Intel Xeon X5482 Harpertown @ 3.2 GHz:

#define ALLOCATE_SEPERATE
#define ONE_LOOP
00600020
006D0020
007A0020
00870020
seconds = 6.206

#define ALLOCATE_SEPERATE
//#define ONE_LOOP
005E0020
006B0020
00780020
00850020
seconds = 2.116

//#define ALLOCATE_SEPERATE
#define ONE_LOOP
00570020
00633520
006F6A20
007B9F20
seconds = 1.894

//#define ALLOCATE_SEPERATE
//#define ONE_LOOP
008C0020
00983520
00A46A20
00B09F20
seconds = 1.993

Observations:

  • 6.206 seconds with one loop and 2.116 seconds with two loops. This reproduces the OP's results exactly.

  • In the first two tests, the arrays are allocated separately. You'll notice that they all have the same alignment relative to the page.

  • In the second two tests, the arrays are packed together to break that alignment. Here you'll notice both loops are faster. Furthermore, the second (double) loop is now the slower one as you would normally expect.

As @Stephen Cannon points out in the comments, there is very likely possibility that this alignment causes false aliasing in the load/store units or the cache. I Googled around for this and found that Intel actually has a hardware counter for partial address aliasing stalls:

http://software.intel.com/sites/products/documentation/doclib/stdxe/2013/~amplifierxe/pmw_dp/events/partial_address_alias.html


5 Regions - Explanations

Region 1:

This one is easy. The dataset is so small that the performance is dominated by overhead like looping and branching.

Region 2:

Here, as the data sizes increases, the amount of relative overhead goes down and the performance "saturates". Here two loops is slower because it has twice as much loop and branching overhead.

I'm not sure exactly what's going on here... Alignment could still play an effect as Agner Fog mentions cache bank conflicts. (That link is about Sandy Bridge, but the idea should still be applicable to Core 2.)

Region 3:

At this point, the data no longer fits in L1 cache. So performance is capped by the L1 <-> L2 cache bandwidth.

Region 4:

The performance drop in the single-loop is what we are observing. And as mentioned, this is due to the alignment which (most likely) causes false aliasing stalls in the processor load/store units.

However, in order for false aliasing to occur, there must be a large enough stride between the datasets. This is why you don't see this in region 3.

Region 5:

At this point, nothing fits in cache. So you're bound by memory bandwidth.


2 x Intel X5482 Harpertown @ 3.2 GHz Intel Core i7 870 @ 2.8 GHz Intel Core i7 2600K @ 4.4 GHz

  • 152
    +1: I think this is the answer. Contrary to what all the other answers say, it's not about the single loop variant inherently having more cache misses, it's about the particular alignment of the arrays causing the cache misses. – Oliver Charlesworth Dec 17 '11 at 21:20
  • 27
    This; a false aliasing stall is the most likely explanation. – Stephen Canon Dec 18 '11 at 1:04
  • 7
    @VictorT. I used the code the OP linked to. It generates a .css file which I can open in Excel and make a graph from it. – Mysticial Dec 18 '11 at 3:45
  • 4
    @Nawaz A page is typically 4KB. If you look at the hexadecimal addresses that I print out, the separately allocated tests all have the same modulo 4096. (that is 32-bytes from the start of a 4KB boundary) Perhaps GCC doesn't have this behavior. That could explain why you aren't see the differences. – Mysticial Dec 18 '11 at 6:10
  • 7

OK, the right answer definitely has to do something with the CPU cache. But to use the cache argument can be quite difficult, especially without data.

There are many answers, that led to a lot of discussion, but let's face it: Cache issues can be very complex and are not one dimensional. They depend heavily on the size of the data, so my question was unfair: It turned out to be at a very interesting point in the cache graph.

@Mysticial's answer convinced a lot of people (including me), probably because it was the only one that seemed to rely on facts, but it was only one "data point" of the truth.

That's why I combined his test (using a continuous vs. separate allocation) and @James' Answer's advice.

The graphs below shows, that most of the answers and especially the majority of comments to the question and answers can be considered completely wrong or true depending on the exact scenario and parameters used.

Note that my initial question was at n = 100.000. This point (by accident) exhibits special behavior:

  1. It possesses the greatest discrepancy between the one and two loop'ed version (almost a factor of three)

  2. It is the only point, where one-loop (namely with continuous allocation) beats the two-loop version. (This made Mysticial's answer possible, at all.)

The result using initialized data:

Enter image description here

The result using uninitialized data (this is what Mysticial tested):

Enter image description here

And this is a hard-to-explain one: Initialized data, that is allocated once and reused for every following test case of different vector size:

Enter image description here

Proposal

Every low-level performance related question on Stack Overflow should be required to provide MFLOPS information for the whole range of cache relevant data sizes! It's a waste of everybody's time to think of answers and especially discuss them with others without this information.

  • 17
    +1 Nice analysis. I didn't intend to leave the data uninitialized in the first place. It just happened that the allocator zeroed them anyway. So the initialized data is what matters. I just edited my answer with results on an actual Core 2 architecture machine and they are a lot closer to what you are observing. Another thing is that I tested a range of sizes n and it shows the same performance gap for n = 80000, n = 100000, n = 200000, etc... – Mysticial Dec 18 '11 at 1:48
  • 2
    @Mysticial I think the OS implements page zeroing whenever giving new pages to a process to avoid possible inter process spying. – v.oddou Nov 30 '17 at 5:36

The second loop involves a lot less cache activity, so it's easier for the processor to keep up with the memory demands.

  • 1
    You're saying that the second variant incurs fewer cache misses? Why? – Oliver Charlesworth Dec 17 '11 at 20:49
  • 2
    @Oli: In the first variant, the processor needs to access four memory lines at a time- a[i], b[i], c[i] and d[i] In the second variant, it needs just two. This makes it much more viable to refill those lines whilst adding. – Puppy Dec 17 '11 at 20:50
  • 4
    But so long as the arrays don't collide in cache, each variant requires the exact same number of reads and writes from/to main memory. So the conclusion is (I think) that these two arrays happen to be colliding all the time. – Oliver Charlesworth Dec 17 '11 at 20:52
  • 3
    I don't follow. Per instruction (i.e. per instance of x += y), there are two reads and one write. This is true for either variant. The cache<->CPU bandwidth requirement is therefore the same. So long as there are no conflicts, the cache<->RAM bandwidth requirement is also the same.. – Oliver Charlesworth Dec 17 '11 at 20:55
  • 2
    As noted in stackoverflow.com/a/1742231/102916, the Pentium M's hardware prefetch can track 12 different forward streams (and I would expect later hardware to be at least as capable). Loop 2 is still only reading four streams, so is well within that limit. – Brooks Moses Dec 18 '11 at 21:51

Imagine you are working on a machine where n was just the right value for it only to be possible to hold two of your arrays in memory at one time, but the total memory available, via disk caching, was still sufficient to hold all four.

Assuming a simple LIFO caching policy, this code:

for(int j=0;j<n;j++){
    a[j] += b[j];
}
for(int j=0;j<n;j++){
    c[j] += d[j];
}

would first cause a and b to be loaded into RAM and then be worked on entirely in RAM. When the second loop starts, c and d would then be loaded from disk into RAM and operated on.

the other loop

for(int j=0;j<n;j++){
    a[j] += b[j];
    c[j] += d[j];
}

will page out two arrays and page in the other two every time around the loop. This would obviously be much slower.

You are probably not seeing disk caching in your tests but you are probably seeing the side effects of some other form of caching.


There seems to be a little confusion/misunderstanding here so I will try to elaborate a little using an example.

Say n = 2 and we are working with bytes. In my scenario we thus have just 4 bytes of RAM and the rest of our memory is significantly slower (say 100 times longer access).

Assuming a fairly dumb caching policy of if the byte is not in the cache, put it there and get the following byte too while we are at it you will get a scenario something like this:

  • With

    for(int j=0;j<n;j++){
     a[j] += b[j];
    }
    for(int j=0;j<n;j++){
     c[j] += d[j];
    }
    
  • cache a[0] and a[1] then b[0] and b[1] and set a[0] = a[0] + b[0] in cache - there are now four bytes in cache, a[0], a[1] and b[0], b[1]. Cost = 100 + 100.

  • set a[1] = a[1] + b[1] in cache. Cost = 1 + 1.
  • Repeat for c and d.
  • Total cost = (100 + 100 + 1 + 1) * 2 = 404

  • With

    for(int j=0;j<n;j++){
     a[j] += b[j];
     c[j] += d[j];
    }
    
  • cache a[0] and a[1] then b[0] and b[1] and set a[0] = a[0] + b[0] in cache - there are now four bytes in cache, a[0], a[1] and b[0], b[1]. Cost = 100 + 100.

  • eject a[0], a[1], b[0], b[1] from cache and cache c[0] and c[1] then d[0] and d[1] and set c[0] = c[0] + d[0] in cache. Cost = 100 + 100.
  • I suspect you are beginning to see where I am going.
  • Total cost = (100 + 100 + 100 + 100) * 2 = 800

This is a classic cache thrash scenario.

  • 7
    This is incorrect. A reference to a particular element of an array does not cause the entire array to be paged in from disk (or from non-cached memory); only the relevant page or cache line is paged in. – Brooks Moses Dec 18 '11 at 21:38
  • 1
    @Brooks Moses - If you walk through the whole array, as is happening here, then it will. – OldCurmudgeon Dec 19 '11 at 21:34
  • 1
    Well, yes, but that's what happens over the whole operation, not what happens each time around the loop. You claimed that the second form "will page out two arrays and page in the other two every time around the loop," and that's what I'm objecting to. Regardless of the size of the overall arrays, in the middle of this loop your RAM will be holding a page from each of the four arrays, and nothing will get paged out until well after the loop has finished with it. – Brooks Moses Dec 20 '11 at 2:05
  • In the particular case where n was just the right value for it only to be possible to hold two of your arrays in memory at one time then accessing all elements of four arrays in one loop must surely end up thrashing. – OldCurmudgeon Dec 20 '11 at 10:35
  • 1
    Why are you staying that loop 2 pages in the entirety of a1 and b1 for the first assignment, rather than just the first page of each of them? (Are you assuming 5-byte pages, so a page is half of your RAM? That's not just scaling, that's completely unlike a real processor.) – Brooks Moses Dec 21 '11 at 23:37

It's not because of a different code, but because of caching: RAM is slower than the CPU registers and a cache memory is inside the CPU to avoid to write the RAM every time a variable is changing. But the cache is not big as the RAM is, hence, it maps only a fraction of it.

The first code modifies distant memory addresses alternating them at each loop, thus requiring continuously to invalidate the cache.

The second code don't alternate: it just flow on adjacent addresses twice. This makes all the job to be completed in the cache, invalidating it only after the second loop starts.

  • Why would this cause the cache to continuously be invalidated? – Oliver Charlesworth Dec 17 '11 at 21:22
  • 1
    @OliCharlesworth: Think to the cache as an hard copy of a contiguous range of memory addresses. If you pretend to access an address not part of them, you have to re-load the cache. And if something in the cache had been modified, it has to be written back in RAM, or it will be lost. In the sample code, 4 vector of 100'000 integers (400kBytes) are most likely more than the capacity of the L1 cache (128 or 256K). – Emilio Garavaglia Dec 17 '11 at 21:30
  • 5
    The size of the cache has no impact in this scenario. Each array element is only used once, and after that it doesn't matter if it's evicted. Cache size only matters if you have temporal locality (i.e. you're going to re-use the same elements in the future). – Oliver Charlesworth Dec 17 '11 at 21:36
  • 2
    @OliCharlesworth: If I have to load a new value in a cache, and there is already a value in it that has been modifyed, I have first to write it down, and this makes me wait for the write to happen. – Emilio Garavaglia Dec 18 '11 at 8:43
  • 2
    But in both variants of the OP's code, each value gets modified precisely once. You do so the same number of write-backs in each variant. – Oliver Charlesworth Dec 18 '11 at 11:11

I cannot replicate the results discussed here.

I don't know if poor benchmark code is to blame, or what, but the two methods are within 10% of each other on my machine using the following code, and one loop is usually just slightly faster than two - as you'd expect.

Array sizes ranged from 2^16 to 2^24, using eight loops. I was careful to initialize the source arrays so the += assignment wasn't asking the FPU to add memory garbage interpreted as a double.

I played around with various schemes, such as putting the assignment of b[j], d[j] to InitToZero[j] inside the loops, and also with using += b[j] = 1 and += d[j] = 1, and I got fairly consistent results.

As you might expect, initializing b and d inside the loop using InitToZero[j] gave the combined approach an advantage, as they were done back-to-back before the assignments to a and c, but still within 10%. Go figure.

Hardware is Dell XPS 8500 with generation 3 Core i7 @ 3.4 GHz and 8 GB memory. For 2^16 to 2^24, using eight loops, the cumulative time was 44.987 and 40.965 respectively. Visual C++ 2010, fully optimized.

PS: I changed the loops to count down to zero, and the combined method was marginally faster. Scratching my head. Note the new array sizing and loop counts.

// MemBufferMystery.cpp : Defines the entry point for the console application.
//
#include "stdafx.h"
#include <iostream>
#include <cmath>
#include <string>
#include <time.h>

#define  dbl    double
#define  MAX_ARRAY_SZ    262145    //16777216    // AKA (2^24)
#define  STEP_SZ           1024    //   65536    // AKA (2^16)

int _tmain(int argc, _TCHAR* argv[]) {
    long i, j, ArraySz = 0,  LoopKnt = 1024;
    time_t start, Cumulative_Combined = 0, Cumulative_Separate = 0;
    dbl *a = NULL, *b = NULL, *c = NULL, *d = NULL, *InitToOnes = NULL;

    a = (dbl *)calloc( MAX_ARRAY_SZ, sizeof(dbl));
    b = (dbl *)calloc( MAX_ARRAY_SZ, sizeof(dbl));
    c = (dbl *)calloc( MAX_ARRAY_SZ, sizeof(dbl));
    d = (dbl *)calloc( MAX_ARRAY_SZ, sizeof(dbl));
    InitToOnes = (dbl *)calloc( MAX_ARRAY_SZ, sizeof(dbl));
    // Initialize array to 1.0 second.
    for(j = 0; j< MAX_ARRAY_SZ; j++) {
        InitToOnes[j] = 1.0;
    }

    // Increase size of arrays and time
    for(ArraySz = STEP_SZ; ArraySz<MAX_ARRAY_SZ; ArraySz += STEP_SZ) {
        a = (dbl *)realloc(a, ArraySz * sizeof(dbl));
        b = (dbl *)realloc(b, ArraySz * sizeof(dbl));
        c = (dbl *)realloc(c, ArraySz * sizeof(dbl));
        d = (dbl *)realloc(d, ArraySz * sizeof(dbl));
        // Outside the timing loop, initialize
        // b and d arrays to 1.0 sec for consistent += performance.
        memcpy((void *)b, (void *)InitToOnes, ArraySz * sizeof(dbl));
        memcpy((void *)d, (void *)InitToOnes, ArraySz * sizeof(dbl));

        start = clock();
        for(i = LoopKnt; i; i--) {
            for(j = ArraySz; j; j--) {
                a[j] += b[j];
                c[j] += d[j];
            }
        }
        Cumulative_Combined += (clock()-start);
        printf("\n %6i miliseconds for combined array sizes %i and %i loops",
                (int)(clock()-start), ArraySz, LoopKnt);
        start = clock();
        for(i = LoopKnt; i; i--) {
            for(j = ArraySz; j; j--) {
                a[j] += b[j];
            }
            for(j = ArraySz; j; j--) {
                c[j] += d[j];
            }
        }
        Cumulative_Separate += (clock()-start);
        printf("\n %6i miliseconds for separate array sizes %i and %i loops \n",
                (int)(clock()-start), ArraySz, LoopKnt);
    }
    printf("\n Cumulative combined array processing took %10.3f seconds",
            (dbl)(Cumulative_Combined/(dbl)CLOCKS_PER_SEC));
    printf("\n Cumulative seperate array processing took %10.3f seconds",
        (dbl)(Cumulative_Separate/(dbl)CLOCKS_PER_SEC));
    getchar();

    free(a); free(b); free(c); free(d); free(InitToOnes);
    return 0;
}

I'm not sure why it was decided that MFLOPS was a relevant metric. I though the idea was to focus on memory accesses, so I tried to minimize the amount of floating point computation time. I left in the +=, but I am not sure why.

A straight assignment with no computation would be a cleaner test of memory access time and would create a test that is uniform irrespective of the loop count. Maybe I missed something in the conversation, but it is worth thinking twice about. If the plus is left out of the assignment, the cumulative time is almost identical at 31 seconds each.

  • 1
    The misalignment penalty that you mention here is when an individual load/store that is misaligned (including the unaligned SSE load/stores). But that is not the case here since the performance is sensitive to the relative alignments of the different arrays. There are no misalignments at the instruction level. Every single load/store is properly aligned. – Mysticial Dec 31 '12 at 19:15

It's because the CPU doesn't have so many cache misses (where it has to wait for the array data to come from the RAM chips). It would be interesting for you to adjust the size of the arrays continually so that you exceed the sizes of the level 1 cache (L1), and then the level 2 cache (L2), of your CPU and plot the time taken for your code to execute against the sizes of the arrays. The graph shouldn't be a straight line like you'd expect.

  • 2
    I don't believe there's any interaction between the cache size and the array size. Each array element is only used once, and can then be safely evicted. There may well be an interaction between the cache line size and the array size, though, if it causes the four arrays to conflict. – Oliver Charlesworth Dec 17 '11 at 21:01
  • You're right, it's the wrong example to demonstrate this effect – James Dec 17 '11 at 21:15

The first loop alternates writing in each variable. The second and third ones only make small jumps of element size.

Try writing two parallel lines of 20 crosses with a pen and paper separated by 20 cm. Try once finishing one and then the other line and try another time by writting a cross in each line alternately.

The Original Question

Why is one loop so much slower than two loops?


Assessing The Problem

The OP's code:

const int n=100000;

for(int j=0;j<n;j++){
    a1[j] += b1[j];
    c1[j] += d1[j];
}

And

for(int j=0;j<n;j++){
    a1[j] += b1[j];
}
for(int j=0;j<n;j++){
    c1[j] += d1[j];
}

The Consideration

Considering the OP's original question about the 2 variants of the for loops and his amended question towards the behavior of caches along with many of the other excellent answers and useful comments; I'd like to try and do something different here by taking a different approach about this situation and problem.


The Approach

Considering the two loops and all of the discussion about cache and page filing I'd like to take another approach as to looking at this from a different perspective. One that doesn't involve the cache and page files nor the executions to allocate memory, in fact this approach doesn't even concern the actual hardware or the software at all.


The Perspective

After looking at the code for a while it became quite apparent what the problem is and what is generating it. Lets break this down into an algorithmic problem and look at it from the perspective of using mathematical notations then apply an analogy to the math problems as well as to the algorithms.


What We Do Know

We know is that his loop will run 100,000 times. We also know that a1, b1, c1 & d1 are pointers on a 64-bit architecture. Within C++ on a 32-bit machine all pointers are 4 bytes and on a 64-bit machine they are 8 bytes in size since pointers are of a fixed length. We know that we have 32 bytes in which to allocate for in both cases. The only difference is we are allocating 32 bytes or 2 sets of 2-8bytes on each iteration where in the 2nd case we are allocating 16 bytes for each iteration for both of the independent loops. So both loops still equals 32 bytes in total allocations. With this information let's go ahead and show the general math, algorithm and analogy of it. We do know the amount of times that the same set or group of operations will have to be performed in both cases. We do know the amount of memory that needs to be allocated in both cases. We can asses that the overall work load of the allocations between both cases will be approximately the same.


What We Don't Know

We do not know how long it will take for each case unless if we set a counter and run a bench mark test. However the bench marks were already included from the original question and from some of the answers and comments as well and we can see a significant difference between the two and this is the whole reasoning of this question to this problem and for the answering of it to begin with.


Let's Investigate

It is already apparent that many have already done this by looking at the heap allocations, bench mark tests, looking at RAM, Cache and Page Files. Looking at specific data points and specific iteration indexes was also included and the various conversations about this specific problem has many people starting to question other related things about it. So how do we begin to look at this problem by using mathematical algorithms and applying an analogy to it? We start off by making a couple of assertions! Then we build out our algorithm from there.


Our Assertions:

  • We will let our loop and its iterations be a Summation that starts at 1 and ends at 100000 instead of starting with 0 as in the loops for we don't need to worry about the 0 indexing scheme of memory addressing since we are just interested in the algorithm itself.
  • In both cases we have 4 functions to work with and 2 function calls with 2 operations being done on each function call. So we will set these up as functions and function calls to be F1(), F2(), f(a), f(b), f(c) and f(d).

The Algorithms:

1st Case: - Only one summation but two independent function calls.

Sum n=1 : [1,100000] = F1(), F2();
                       F1() = { f(a) = f(a) + f(b); }
                       F2() = { f(c) = f(c) + f(d);  }

2nd Case: - Two summations but each has its own function call.

Sum1 n=1 : [1,100000] = F1();
                        F1() = { f(a) = f(a) + f(b); }

Sum2 n=1 : [1,100000] = F1();
                        F1() = { f(c) = f(c) + f(d); }

If you noticed F2() only exists in Sum where both Sum1 and Sum2 only contains F1(). This will also be evident later on as well when we begin to conclude that there is sort of an optimization happening from the second algorithm.

The iterations through the first case Sum calls f(a) that will add to its self f(b) then it calls f(c) that will do the same but add f(d) to itself for each 100000 iterations. In the second case we have Sum1 and Sum2 And both act the same as if they were the same function being called twice in a row. In this case we can treat Sum1 and Sum2 as just plain old Sum where Sum in this case looks like this: Sum n=1 : [1,100000] { f(a) = f(a) + f(b); } and now this looks like an optimization where we can just consider it to be the same function.


Summary with Analogy

With what we seen in the second case it almost appears as if there is optimization since both for loops have the same exact signature, but this isn't the real issue. The issue isn't the work that is being done by f(a),f(b),f(c)&f(d) in both cases and the comparison between the two it is the difference in the distance that the Summation has to travel in both cases that gives you the difference in time execution.

Think of the For Loops as being the Summations that does the iterations as being a Boss that is giving orders to two people A & B and that their jobs are to meat C & D respectively and to pick up some package from them and return it. In the analogy here the for loop or summation iterations and condition checks themselves doesn't actually represent the Boss. What actually represents the Boss here is not from the actual mathematical algorithms directly, but from the actual concept of Scope and Code Block within a routine or sub-routine, method, function, translation unit, etc. The first algorithm has 1 scope where the 2nd algorithm has 2 consecutive scopes.

Within the first case on each call slip the Boss goes to A and gives the order and A goes off to fetch B's package then the Boss goes to C and gives the orders to do the same and receive the package from D on each iteration.

Within the second case the Boss works directly with A to go and fetch B's package until all packages are received. Then the Boss works with C to do the same for getting all of D's packages.

Since we are working with an 8 byte pointer and dealing with Heap allocation let's consider this problem here. Let us say that the Boss is 100 feet from A and that A is 500 feet from C. We don't need to worry about how far the Boss is initially from C because of the order of executions. In both cases the Boss initially travels from A first then to B. This analogy isn't to say that this distance is exact; it is just a use test case scenario to show the workings of the algorithms. In many cases when doing heap allocations and working with the cache and page files, these distances between address locations may not vary that much in differences or they can very significantly depending on the nature of the data types and the array sizes.


The Test Cases:

First Case: On first iteration the Boss has to initially go 100 feet to give the order slip to A and A goes off and does his thing, but then the Boss has to travel 500 feet to C to give him his order slip. Then on the next iteration and every other iteration after the Boss has to go back and forth 500 feet between the two.

Second Case: The Boss has to travel 100 feet on the first iteration to A, but after that he is already there and just waits for A to get back until all slips are filled. Then the Boss has to travel 500 feet on the first iteration to C because C is 500 feet from A since this Boss( Summation, For Loop ) is being called right after working with A and then just waits like he did with A until all of C's order slips are done.


The Difference In Distances Traveled

const n = 100000
distTraveledOfFirst = (100 + 500) + ((n-1)*(500 + 500); 
// Simplify
distTraveledOfFirst = 600 + (99999*100);
distTraveledOfFirst = 600 + 9999900;
distTraveledOfFirst =  10000500;
// Distance Traveled On First Algorithm = 10,000,500ft

distTraveledOfSecond = 100 + 500 = 600;
// Distance Traveled On Second Algorithm = 600ft;    

The Comparison of Arbitrary Values

We can easily see that 600 is far less than 10 million. Now this isn't exact, because we don't know the actual difference in distance between which address of RAM or from which Cache or Page File each call on each iteration is going to be due to many other unseen variables, but this is just an assessment of the situation to be aware of and trying to look at it from the worst case scenario.

So by these numbers it would almost look as if Algorithm One should be 99% slower than Algorithm Two; however, this is only the The Boss's part or responsibility of the algorithms and it doesn't account for the actual workers A, B, C, & D and what they have to do on each and every iteration of the Loop. So the bosses job only accounts for about 15 - 40% of the total work being done. So the bulk of the work which is done through the workers has a slight bigger impact towards keeping the ratio of the speed rate differences to about 50-70%


The Observation: - The differences between the two algorithms

In this situation it is the structure of the process of the work being done and it does go to show that Case 2 is more efficient from both that partial optimization of having a similar function declaration and definition where it is only the variables that differ by name. And we also see that the total distance traveled in Case 1 is much farther than it is in Case 2 and we can consider this distance traveled our Time Factor between the two algorithms. Case 1 has considerable more work to do than Case 2 does. This was also seen in the evidence of the ASM that was shown between both cases. Even with what was already said about these cases, it also doesn't account for the fact that in Case 1 the boss will have to wait for both A & C to get back before he can go back to A again on the next iteration and it also doesn't account for the fact that if A or B is taking an extremely long time then both the Boss and the other worker(s) are also waiting at an idle. In Case 2 the only one being idle is the Boss until the worker gets back. So even this has an impact on the algorithm.


Conclusion:

Case 1 is a classic interpolation problem that happens to be an inefficient one. I also think that this was one of the leading reasons of why many machine architectures and developers ended up building and designing multi-core systems with the ability to do multi-threaded applications as well as parallel programming.

So even looking at it from this approach without even involving how the Hardware, OS and Compiler works together to do heap allocations that involves working with RAM, Cache, Page Files, etc.; the mathematics behind it already shows us which of these two is the better solution from using the above analogy where the Boss or the Summations being those the For Loops that had to travel between Workers A & B. We can easily see that Case 2 is at least as 1/2 as fast if not a little more than Case 1 due to the difference in the distanced traveled and the time taken. And this math lines up almost virtually and perfectly with both the Bench Mark Times as well as the Amount of difference in the amount of Assembly Instructions.



The OPs Amended Question(s)

EDIT: The question turned out to be of no relevance, as the behavior severely depends on the sizes of the arrays (n) and the CPU cache. So if there is further interest, I rephrase the question:

Could you provide some solid insight into the details that lead to the different cache behaviors as illustrated by the five regions on the following graph?

It might also be interesting to point out the differences between CPU/cache architectures, by providing a similar graph for these CPUs.


Regarding These Questions

As I have demonstrated without a doubt, there is an underlying issue even before the Hardware and Software becomes involved. Now as for the management of memory and caching along with page files, etc. which all works together in an integrated set of systems between: The Architecture { Hardware, Firmware, some Embedded Drivers, Kernels and ASM Instruction Sets }, The OS{ File and Memory Management systems, Drivers and the Registry }, The Compiler { Translation Units and Optimizations of the Source Code }, and even the Source Code itself with its set(s) of distinctive algorithms; we can already see that there is a bottleneck that is happening within the first algorithm before we even apply it to any machine with any arbitrary Architecture, OS, and Programmable Language compared to the second algorithm. So there already existed a problem before involving the intrinsics of a modern computer.


The Ending Results

However; it is not to say that these new questions are not of importance because they themselves are and they do play a role after all. They do impact the procedures and the overall performance and that is evident with the various graphs and assessments from many who have given their answer(s) and or comment(s). If you pay attention to the analogy of the Boss and the two workers A & B who had to go and retrieve packages from C & D respectively and considering the mathematical notations of the two algorithms in question you can see that without even the involvement of the computer Case 2 is approximately 60% faster than Case 1 and when you look at the graphs and charts after these algorithms have been applied to source code, compiled and optimized and executed through the OS to perform operations on the given hardware you even see a little more degradation between the differences in these algorithms.

Now if the "Data" set is fairly small it may not seem all that bad of a difference at first but since Case 1 is about 60 - 70% slower than Case 2 we can look at the growth of this function as being in terms of the differences in time executions:

DeltaTimeDifference approximately = Loop1(time) - Loop2(time)
//where 
Loop1(time) = Loop2(time) + (Loop2(time)*[0.6,0.7]) // approximately
// So when we substitute this back into the difference equation we end up with 
DeltaTimeDifference approximately = (Loop2(time) + (Loop2(time)*[0.6,0.7])) - Loop2(time)
// And finally we can simplify this to
DeltaTimeDifference approximately = [0.6,0.7]*(Loop2(time)

And this approximation is the average difference between these two loops both algorithmically and machine operations involving software optimizations and machine instructions. So when the data set grows linearly, so does the difference in time between the two. Algorithm 1 has more fetches than algorithm 2 which is evident when the Boss had to travel back and forth the maximum distance between A & C for every iteration after the first iteration while Algorithm 2 the Boss had to travel to A once and then after being done with A he had to travel a maximum distance only one time when going from A to C.

So trying to have the Boss focusing on doing two similar things at once and juggling them back and forth instead of focusing on similar consecutive tasks is going to make him quite angry by the end of the day because he had to travel and work twice as much. Therefor do not lose the scope of the situation by letting your boss getting into an interpolated bottleneck because the boss's spouse and children wouldn't appreciate it.

  • It has been a while since I posted this answer, but I also wanted to add a quick comment that may also help to understand this: In my analogy with the Boss as the for loop or the summations or iterations through a loop, we could also consider this boss to be the combination between the Stack Frame & Stack Pointer that manages the scope and stack variables and memory addressing of the for loops. – Francis Cugler Mar 22 '17 at 4:20

May be old C++ and optimizations. In my computer I obtained almost the same speed:

one loop: 1.577ms two loops: 1.507ms

I run VS2015 on E5-1620 3.5Ghz processor with 16Gb ram

protected by Mysticial Aug 17 '12 at 16:29

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