I am developing some engineering simulations. This involves implementing some long equations such as this equation to calculate stress in a rubber like material:

```
T = (
mu * (
pow(l1 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a
* (
pow(l1 * l2 * l3, -0.1e1 / 0.3e1)
- l1 * l2 * l3 * pow(l1 * l2 * l3, -0.4e1 / 0.3e1) / 0.3e1
) * pow(l1 * l2 * l3, 0.1e1 / 0.3e1) / l1
- pow(l2 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a / l1 / 0.3e1
- pow(l3 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a / l1 / 0.3e1
) / a
+ K * (l1 * l2 * l3 - 0.1e1) * l2 * l3
) * N1 / l2 / l3
+ (
mu * (
- pow(l1 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a / l2 / 0.3e1
+ pow(l2 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a
* (
pow(l1 * l2 * l3, -0.1e1 / 0.3e1)
- l1 * l2 * l3 * pow(l1 * l2 * l3, -0.4e1 / 0.3e1) / 0.3e1
) * pow(l1 * l2 * l3, 0.1e1 / 0.3e1) / l2
- pow(l3 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a / l2 / 0.3e1
) / a
+ K * (l1 * l2 * l3 - 0.1e1) * l1 * l3
) * N2 / l1 / l3
+ (
mu * (
- pow(l1 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a / l3 / 0.3e1
- pow(l2 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a / l3 / 0.3e1
+ pow(l3 * pow(l1 * l2 * l3, -0.1e1 / 0.3e1), a) * a
* (
pow(l1 * l2 * l3, -0.1e1 / 0.3e1)
- l1 * l2 * l3 * pow(l1 * l2 * l3, -0.4e1 / 0.3e1) / 0.3e1
) * pow(l1 * l2 * l3, 0.1e1 / 0.3e1) / l3
) / a
+ K * (l1 * l2 * l3 - 0.1e1) * l1 * l2
) * N3 / l1 / l2;
```

I use Maple to generate the C++ code to avoid mistakes (and save time with tedious algebra). As this code is executed thousands (if not millions) of times, the performance is a concern. Unfortunately the math only simplifies so far; the long equations are unavoidable.

**What approach can I take to optimize this implementation?** I'm looking for high-level strategies that I should be applying when implementing such equations, not necessarily specific optimizations for the example shown above.

I'm compiling using g++ with `--enable-optimize=-O3`

.

Update:

I know there are a lot of repeated expressions, I am using the assumption that the compiler would handle these; my tests so far suggest it does.

`l1, l2, l3, mu, a, K`

are all positive real numbers (not zero).

I have replaced `l1*l2*l3`

with an equivalent variable: `J`

. This did help improve performance.

Replacing `pow(x, 0.1e1/0.3e1)`

with `cbrt(x)`

was a good suggestion.

This will be run on CPUs, In the near future this would likely run better on GPUs, but for now that option is not available.

`pow(l1 * l2 * l3, -0.1e1 / 0.3e1)`

with a variable... You need to benchmark your code to be sure whether it runs fast or slow, though. – SingerOfTheFall Oct 2 '15 at 12:36the Code Review site doesn't get enough sciomp eyes- sounds like a chicken-and-egg problem, and a mindset that isn't helping CR to get any more of such eyes. Same applies to the idea of turning down the scicomp beta sitebecause it's beta- if everyone thought like that, the only site to grow would be Stack Overflow. – Mathieu Guindon Oct 3 '15 at 21:58