Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

Full Re-Write/Update for clarity (and your sanity, its abit too long) ... (Old Post)

For an assignment, I need to find the levels (L1,L2,...) and size of each cache. Given hints and what I found so far: I think the idea is to create arrays of different sizes and read them. Timing these operations:

sizes = [1k, 4k, 256K, ...]
foreach size in sizes 
    create array of `size`

    start timer
    for i = 0 to n // just keep accessing array
        arr[(i * 16) % arr.length]++ // i * 16 supposed to modify every cache line ... see link
    record/print time

UPDATED (28 Sept 6:57PM UTC+8)

See also full source

Ok now following @mah's advice, I might have fixed the SNR ratio problem ... and also found a method of timing my code (wall_clock_time from a lab example code)

However, I seem to be getting incorrect results: I am on a Intel Core i3 2100: [SPECS]

  • L1: 2 x 32K
  • L2: 2 x 256K
  • L3: 3MB

The results I got, in a graph:

lengthMod: 1KB to 512K

enter image description here

The base of the 1st peak is 32K ... reasonable ... the 2nd is 384K ... why? I'm expecting 256?

lengthMod: 512k to 4MB

enter image description here

Then why might this range be in a mess?

I also read about prefetching or interference from other applications, so I closed as many things as possible while the script is running, it appears consistently (through multiple runs) that the data of 1MB and above is always so messy?

share|improve this question
You've added multiple questions, which makes it difficult to answer in SO format since this isn't really a discussion board. 1) the size of arr is not 262144, it's 1M * sizeof(int) -- the array size (1024*1024) is the number if ints it holds, not the number of bytes. 2) you're correct; the code you're copying assumes 16 bytes per entry. 3) there is a mod operator, but and'ing is much faster, and reliable for powers of 2. 4) you can declare a single buffer (largest size) but use varying amounts of it. –  mah Sep 26 '12 at 11:12
5) correct, other processes on your system will taint your results, so either run many trials or remove other processes. finally) little difference because of the poor signal-to-noise ratio I described. If you run on machine with poor memory access speeds you will get more useful results. I'll post another answer below with something else you can try to improve this... –  mah Sep 26 '12 at 11:14
@mah, do you mean my latest update? I've updated recently to simplify the question, by quite a lot? –  Jiew Meng Sep 26 '12 at 11:14
our updates were done at roughly the same time; I was commenting while you were updating so I had not seen your reduction :) See my answer update below to address your size/time correlation problem, but for more clarification: do not change the array size, leave it at 1M (or at least leave it larger than the largest cache size). Your changes for sizes you're testing can be to the lengthMod variable only; just make sure it's always a power of two minus one. So, for 1k set it to (1 * 1024) - 1; for 4j set it to (4 * 1024) - 1; etc. –  mah Sep 26 '12 at 11:27
Regarding the wall-clock time, you should read this thread about the different clocks available in C and use a better clock: stackoverflow.com/questions/12392278/… –  Douglas B. Staple Sep 28 '12 at 18:18

6 Answers 6

up vote 7 down vote accepted

The time it takes to measure your time (that is, the time just to call the clock() function) is many many (many many many....) times greater than the time it takes to perform arr[(i*16)&lengthMod]++. This extremely low signal-to-noise ratio (among other likely pitfalls) makes your plan unworkable. A large part of the problem is that you're trying to measure a single iteration of the loop; the sample code you linked is attempting to measure a full set of iterations (read the clock before starting the loop; read it again after emerging from the loop; do not use printf() inside the loop).

If your loop is large enough you might be able to overcome the signal-to-noise ratio problem.

As to "what element is being incremented"; arr is an address of a 1MB buffer; arr[(i * 16) & lengthMod]++; causes (i * 16) * lengthMod to generate an offset from that address; that offset is the address of the int that gets incremented. You're performing a shift (i * 16 will turn into i << 4), a logical and, an addition, then either a read/add/write or a single increment, depending on your CPU).

Edit: As described, your code suffers from a poor SNR (signal to noise ratio) due to the relative speeds of memory access (cache or no cache) and calling functions just to measure the time. To get the timings you're currently getting, I assume you modified the code to look something like:

int main() {
    int steps = 64 * 1024 * 1024;
    int arr[1024 * 1024];
    int lengthMod = (1024 * 1024) - 1;
    int i;
    double timeTaken;
    clock_t start;

    start = clock();
    for (i = 0; i < steps; i++) {
        arr[(i * 16) & lengthMod]++;
    timeTaken = (double)(clock() - start)/CLOCKS_PER_SEC;
    printf("Time for %d: %.12f \n", i, timeTaken);

This moves the measurement outside the loop so you're not measuring a single access (which would really be impossible) but rather you're measuring steps accesses.

You're free to increase steps as needed and this will have a direct impact on your timings. Since the times you're receiving are too close together, and in some cases even inverted (your time oscillates between sizes, which is not likely caused by cache), you might try changing the value of steps to 256 * 1024 * 1024 or even larger.

NOTE: You can make steps as large as you can fit into a signed int (which should be large enough), since the logical and ensures that you wrap around in your buffer.

share|improve this answer
Ok, I updated my post "In response to @mah" –  Jiew Meng Sep 26 '12 at 5:34
FYI, updated my post with full source (Github Gist), see UPDATE (An Attempt) –  Jiew Meng Sep 26 '12 at 10:26
Ok thanks for your update. Perhaps I am not really understanding well the SNR thing. When I run ur code varying the length mod seems to work as expected. Next step is plotting a graph. Then I will need someway of automating getting values for different lengthMod. Thats the reason why I have a for loop. Its actually not to record the time per operation but the time for 1 "size" (1K, 4K, ...) of steps accesses. See https://gist.github.com/3787223#file_try.c. I will get all access time ~0.64s why is that? The inner loop is the 1 doing work –  Jiew Meng Sep 26 '12 at 14:00
If all else fails, I could make my program accept a execution option cin to specify the lengthMod? –  Jiew Meng Sep 26 '12 at 14:01
The SNR aspect is... lets say it takes 25ns to access memory in the cache, 200ns to access memory not in the cache. These are very small amounts of time, and your clock resolution is quite small - in the order of 1ms which means your measurements can be off by millions of memory access cycles. For that reason, you must measure multiple millions of test cycles at once instead. In your code, increase steps to do this for a single cache size test, and use lengthMod as the variable to define which size test you run. You can use cin for that, but it would be better to trial several automatically. –  mah Sep 26 '12 at 14:07

After 10 minutes of searching the Intel instruction manual and another 10 minutes of coding I came up with this (for Intel based processors):

void i386_cpuid_caches () {
    int i;
    for (i = 0; i < 32; i++) {

        // Variables to hold the contents of the 4 i386 legacy registers
        uint32_t eax, ebx, ecx, edx; 

        eax = 4; // get cache info
        ecx = i; // cache id

        __asm__ (
            "cpuid" // call i386 cpuid instruction
            : "+a" (eax) // contains the cpuid command code, 4 for cache query
            , "=b" (ebx)
            , "+c" (ecx) // contains the cache id
            , "=d" (edx)
        ); // generates output in 4 registers eax, ebx, ecx and edx 

        // taken from http://download.intel.com/products/processor/manual/325462.pdf Vol. 2A 3-149
        int cache_type = eax & 0x1F; 

        if (cache_type == 0) // end of valid cache identifiers

        char * cache_type_string;
        switch (cache_type) {
            case 1: cache_type_string = "Data Cache"; break;
            case 2: cache_type_string = "Instruction Cache"; break;
            case 3: cache_type_string = "Unified Cache"; break;
            default: cache_type_string = "Unknown Type Cache"; break;

        int cache_level = (eax >>= 5) & 0x7;

        int cache_is_self_initializing = (eax >>= 3) & 0x1; // does not need SW initialization
        int cache_is_fully_associative = (eax >>= 1) & 0x1;

        // taken from http://download.intel.com/products/processor/manual/325462.pdf 3-166 Vol. 2A
        // ebx contains 3 integers of 10, 10 and 12 bits respectively
        unsigned int cache_sets = ecx + 1;
        unsigned int cache_coherency_line_size = (ebx & 0xFFF) + 1;
        unsigned int cache_physical_line_partitions = ((ebx >>= 12) & 0x3FF) + 1;
        unsigned int cache_ways_of_associativity = ((ebx >>= 10) & 0x3FF) + 1;

        // Total cache size is the product
        size_t cache_total_size = cache_ways_of_associativity * cache_physical_line_partitions * cache_coherency_line_size * cache_sets;

            "Cache ID %d:\n"
            "- Level: %d\n"
            "- Type: %s\n"
            "- Sets: %d\n"
            "- System Coherency Line Size: %d bytes\n"
            "- Physical Line partitions: %d\n"
            "- Ways of associativity: %d\n"
            "- Total Size: %zu bytes (%zu kb)\n"
            "- Is fully associative: %s\n"
            "- Is Self Initializing: %s\n"
            , i
            , cache_level
            , cache_type_string
            , cache_sets
            , cache_coherency_line_size
            , cache_physical_line_partitions
            , cache_ways_of_associativity
            , cache_total_size, cache_total_size >> 10
            , cache_is_fully_associative ? "true" : "false"
            , cache_is_self_initializing ? "true" : "false"

Reference: http://download.intel.com/products/processor/manual/325462.pdf 3-166 Vol. 2A

This is much more reliable then measuring cache latencies as it is pretty much impossible to turn off cache prefetching on a modern processor. If you require similar info for a different processor architecture you will have to consult the respective manual.

Edit: Added cache type descriptor. Edit2: Added Cache Level indicator. Edit3: Added more documentation.

share|improve this answer
Erm ... I am not so familiar with C, tho I have programming background. So it will be nice to have some comments. Are u reading an BIOS codes or system config? Thats not allowed in this assignment :( –  Jiew Meng Oct 2 '12 at 23:06
This is the engineers answer, love it :). If the information is there, why not just look it up –  user1443778 Oct 3 '12 at 7:17
No, this does not interact with the BIOS in any way, it only uses the CPU. This code queries the CPU directly for it's specifications, similar to reading it's serial number. I will add a couple comments to the code later today. –  Sergey L. Oct 3 '12 at 9:44
As promised I have commented my code and added some more informative output. –  Sergey L. Oct 3 '12 at 13:21

I know this! (In reality it is very complicated because of pre-fetching)

 for (times = 0; times < Max; time++) /* many times*/
     for (i=0; i < ArraySize; i = i + Stride)
           dummy = A[i]; /* touch an item in the array */

Changing stride allows you to test the properties of caches. By looking at a graph you will get your answers.

Look at slides 35-42 http://www.it.uu.se/edu/course/homepage/avdark/ht11/slides/11_Memory_and_optimization-1.pdf

Erik Hagersten is a really good teacher (and also really competent, was lead architect at sun at one point) so take a look at the rest of his slides for more great explanations!

share|improve this answer
I tried this, but I notice that as ArraySize increases, so does the time. Probably because if Stride is constant, the number of inner loop increases as ArraySize increases. Also, I updated my question ... see UPDATE (An Attempt) –  Jiew Meng Sep 26 '12 at 10:27
First property is cache-line size (e.g. 64B), if the stride is less then 64B you will get a cache hit at least every second access. Then we want to see the L1 cache size (e.g. 64KB) so here we need to look at the number of strides for each inner loop. So lets say we have a 1024K ArraySize and Stride=128B then number of inner loops is: 16384. With the known cache line size we know this will take 512K to store and will not fit in L1 cache. Remember LRU and line size. –  user1443778 Sep 27 '12 at 2:13
It is important that you actually run the outer loop many times (millions of times!!!!) and get the average time for each loop. We are interested in properties in the limit not the transient process of starting up the program etc. –  user1443778 Sep 27 '12 at 2:16

To answer your question of weird numbers above 1MB, it's pretty simple; cache eviction policies having to do with branch prediction, and the fact that the L3 cache is shared between the cores.

A core i3 has a very interesting cache structure. Actually any modern processor does. You should read about them on wikipedia; there are all sorts of ways for it to decide "well, I probably won't need this..." then it can say "I'll put it in the victim cache" or any number of things. L1-2-3 cache timings can be very complex based on a large number of factors and the individual design decisions made.

On top of that, all these decisions and more (see wikipedia articles on the subject) have to be synchronized between the two cores' caches. The methods to synchronize the shared L3 cache with separate L1 and L2 caches can be ugly, they can involve back-tracking and re-doing calculations or other methods. It's highly unlikely you'll ever have a completely free second core and nothing competing for L3 cache space and thus causing synchronization weirdness.

In general if you are working on data, say, convoluting a kernel, you want to make sure it fits within L1 cache and shape your algorithm around that. L3 cache isn't really meant for working on a data set the way you're doing it (though it is better than main memory!)

I swear if I was the one having to implement cache algorithms I'd go insane.

share|improve this answer

For the benchmarking with varying strides, you could try lat_mem_rd from lmbench package, it's open-source: http://www.bitmover.com/lmbench/lat_mem_rd.8.html

I had posted my port for Windows to http://habrahabr.ru/post/111876/ -- it's quite lengthy to be copypasted here. That's from two years ago, I didn't test it with modern CPUs.

share|improve this answer

For windows, you can use the GetLogicalProcessorInformation method.

For linux, you may use sysconf(). You can find valid arguments for sysconf in /usr/include/unistd.h or /usr/include/bits/confname.h

share|improve this answer
They are not allowed to use system config information for this assignment and sysconf does not give you cache information the last time I checked. –  Sergey L. Oct 5 '12 at 10:29
It does. Call it with _SC_LEVEL(1_I|1_D|2_|3_|4_)CACHE_(SIZE | ASSOC | LINESIZE). Edit: This is why I included the include-files where these values are defined. –  Mark Oct 8 '12 at 9:07

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.