I’m trying to use the Optim package in Julia to optimize an objective function with 19 variables, and the following inequality constraints:
0 <= x[1]/3 - x[2] <= 1/3
5 <= 1/x[3] + 1/x[4] <= 6
I’m trying to use either IPNewton() or NewtonTrustRegion , so I need to supply both a Jacobian and Hessian for the constraints. My question is: what is the correct way to write the Jacobian and Hessian functions?
I believe the constraint function would be
function con_c!(c,x)
c[1] = x[1]/3 - x[2]
c[2] = 1/x[3] + 1/x[4]
c
end
Would the Jacobian function be
function con_jacobian!(J,x)
#first constraint:
J[1,1] = 1/3
J[1,2] = -1.0
#second constraint:
J[2,3] = -1/(x[3])^2
J[2,4] = -1/(x[4])^2
J
end
? (I assume all other indices of J are automatically set to zero?)
My main question: What would the Hessian function be? This is where I’m most confused. My understanding was that we take Hessians of scalar-valued functions. So do we have to enter multiple Hessians, one for each constraint function (2 in my case)?
I’ve looked at the multiple constraints example given here https://github.com/JuliaNLSolvers/ConstrainedOptim.jl , but I’m still confused. In the example, it looks like they are adding together two Hessian matrices…? Would greatly appreciate some help.
FD: I posted this question on Discourse two days ago but didn't receive a single response, which is why I'm posting it here.
