I'm trying to normalise the array as follows.

- Pick the first two elements of the array, find the sum and divide them using that sum.
- Do the same for rest of the elements.

It works fine. But when I increase the dimension of the array, time complexity comes into picture. I've given my code below.

```
import pycuda.driver as drv
import pycuda.autoinit
from pycuda.compiler import SourceModule
import numpy as np
mod=SourceModule("""
__global__ void addition(float* a,float* c,float* d)
{
int i=blockIdx.y*blockDim.y+threadIdx.y;
for (i=0;i<=4;++i)
{
int sum=0.0;
for (int j=0;j<=1;++j)
{
sum+=a[2*i+j];
}
c[i]=sum;
}
for (i=0;i<=4;i++)
{
for (int j=0;j<=1;++j)
{
d[2*i+j]=a[2*i+j]/c[i];
}
}
}
""")
addition=mod.get_function("addition")
a=np.array([1,2,3,1,2,3,2,1]).astype(np.float32)
c=np.zeros_like(a)
d=np.zeros_like(a)
addition(drv.In(a),drv.InOut(c),drv.InOut(d),block=(1,8,1))
print d
```

The result of d is [0.33333334 0.66666669 0.75 0.25 0.40000001 0.60000002 0.666666669 0.33333334]. Can anyone suggest some ideas to optimize the code?

`int i=blockIdx.y*blockDim.y+threadIdx.y;`

if you're immediately going to discard it ? – Paul R Nov 14 '12 at 10:40