I have to work within some libraries and no matter what i do i keep getting the following error with this code.

passing `const amko::problem::launch' as 'this'argument of 'const double amko::problem::launch::ratio(double, double)' discards qualifiers

```
namespace amko { namespace problem {
launch::launch():base( 0.0, 20.0, 1 ) {}
base_ptr launch::clone() const
{
return base_ptr(new launch(*this));
}
const double launch::ratio( const double a, const double b)
{
const double area = a*b;
const double circumference = 2*a+2*b;
const double ratio = circumference/area;
return ratio;
}
void launch::objfun_impl(fitness_vector &f, const decision_vector &xv) const
{
amko_assert(f.size() == 1 && xv.size() == get_dimension());
const double x = xv[0];
const double y = launch::ratio(x,5);
f[0] = y;
}
```

while the following piece of code worked just fine.

```
namespace amko { namespace problem {
initialValueProblem::initialValueProblem():base( 0.0, 20.0, 1 ) {}
base_ptr initialValueProblem::clone() const
{
return base_ptr(new initialValueProblem(*this));
}
Eigen::VectorXd initialValueProblem::computeDerivative( const double time, const Eigen::VectorXd& state )
{
Eigen::VectorXd stateDerivative( 1 );
stateDerivative( 0 ) = state( 0 ) - std::pow( time, 2.0 ) + 1.0;
return stateDerivative;
}
void initialValueProblem::objfun_impl(fitness_vector &f, const decision_vector &xv) const
{
amko_assert(f.size() == 1 && xv.size() == get_dimension());
const double x = xv[0];
double intervalStart = 0.0;
double intervalEnd = 10.0;
double stepSize = 0.1;
Eigen::VectorXd initialState_;
initialState_.setZero( 1 );
initialState_( 0 ) = x;
numerical_integrators::EulerIntegratorXd integrator( boost::bind( &initialValueProblem::computeDerivative,
const_cast<initialValueProblem*>( this ), _1, _2 ), intervalStart, initialState_ );
Eigen::VectorXd finalState = integrator.integrateTo( intervalEnd, stepSize );
f[0] = fabs( finalState( 0 ) - 11009.9937484598 );
}
```

Thank you!

minimaltest-case. – Oliver Charlesworth Mar 16 '12 at 17:59everyday. Come on! – mfontanini Mar 16 '12 at 18:14’ as ‘this’ argument of ‘’ discards qualifiers – Bo Persson Mar 16 '12 at 21:25