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I am trying to compare computation times of a simple code to compute sum of cubes of integers using both Fortran 90 and C++ since I had heard they are fast on similar levels. I use gfortran and g++ (on Mac OSX) to compile these codes.

Can somebody kindly point out why the Fortran 90 code takes so much more time (49 seconds) than its equivalent C++ code (12 seconds)? Only thing I know that C++ is row major and Fortran is column major but I don't think that is relevant for these codes. How can I make this fortran90 code faster? Any tips will be appreciated. Thanks.

Fortran code and compiling with gfortran -o bb1 code15.f90

program code15 
implicit none

double precision, dimension(:), allocatable :: a
integer (kind=8) :: n,i
real (kind=16) :: ssum
real :: ts1, ts2

call cpu_time(ts1)
n = 1600000000
allocate(a(n))
ssum=0.0

do i=1,n
    a(i)=i
    ssum=ssum+a(i)*a(i)*a(i)
end do

print *, 'final sum ', ssum
deallocate(a) 
call cpu_time(ts2)
print *,'the time taken is ',ts2-ts1

end program

Output is

 final sum    1.63840000204800000399876515667619840E+0036
 the time taken is    48.6228256

C++ code and compiling with g++ -o bb1 code10.cpp

#include <iostream>
#include <time.h>
using namespace std;

main()
{
    long int n,i;
    long double ssum;

    clock_t starttime = clock();
    n=1600000000;
    double *a = new double[n];
    ssum=0;

    for(i=0; i<n; i++)
    {
        a[i]=i+1;
        ssum=ssum+a[i]*a[i]*a[i];
    }

    cout << "final sum " << ssum << endl;
    delete [ ]a;
    cout << "the time taken is "
         << (double)( clock() - starttime ) / (double)CLOCKS_PER_SEC
         << endl;
}

output is

final sum 1.6384e+36
the time taken is 12.0104
share|improve this question
    
Any particular reason to create an array to store n -> n+1? I may be mistaken, but doesn't FORTRAN iterate through all the variables to find what you want? Meaning it would iterate through 1.6 billion variables before finding what you want? –  Cole Johnson Jun 30 at 6:03
    
that is because in fortran array indexing starts with 1, so it is 1,2,3.. but in C++ array indexing starts with 0, so it is 0,1,2,3 –  Guddu Jun 30 at 6:07
3  
There's no point comparing performance without turning on optimisation (e.g. g++ -O2 ...). –  Tony D Jun 30 at 6:12
    
i turned the -O2 flag on gfortran -O2 -o bb1 code15.f90, slightly faster at 43.8 seconds –  Guddu Jun 30 at 6:31
3  
Did you examine assembly code? Does one compiler make use of vectorization? long double is probably an 80-bit floating point number (supported in hardware). What is real (kind=16)? A quadruple precision number? Then its probably done in software (i.e. slower). There is also real (kind=10), I think. –  Markus Mayr Jun 30 at 6:35

1 Answer 1

up vote 6 down vote accepted

I am not a Fortran expert, but it seems that

real (kind=16) :: ssum

declares a quadruple precision (16 byte) floating point number, which is probably emulated in software on your hardware. Your C++ code uses a long double which corresponds to an extended precision (10 byte) floating point number, which can be done by your hardware (and is much faster). Please note that long double is not a 10-byte floating point number on all platforms, it may be the same thing as a double on some platforms, for example. I think this is true for Windows and MSVC. To get an extended precision floating point number in fortran, use:

real (kind=10) :: ssum
share|improve this answer
    
but sizeof(ssum) in my C++ code returns 16 not 10. so is it still 10-byte precision and just taking 16 bytes in memory ? –  Guddu Jun 30 at 7:23
    
@Guddu: Running gcc -dM -E - < /dev/null | grep LDBL on my machine gives #define __LDBL_MANT_DIG__ 64, which is the size of the mantissa in bits. #define __LDBL_MAX_EXP__ 16384, #define __LDBL_MIN_EXP__ (-16381), indicate that 16 bits are used to store the exponent. The size of long double may be larger in order to enforce proper alignment in arrays (e.g. by inserting padding bytes). –  Markus Mayr Jun 30 at 7:32
    
thanks, wiki page on long double was helpful too, it was my misunderstanding that long double gives twice the precision of double –  Guddu Jun 30 at 7:38

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