18 reputation
4
bio website
location
age
visits member for 11 months
seen Feb 17 at 1:23

Sep
30
awarded  Student
Sep
30
awarded  Teacher
Sep
29
answered Analytical gradient for bisection method nested within objective function
Sep
29
comment Analytical gradient for bisection method nested within objective function
Excellent! The analytic gradient matches numeric gradient approximations (I'll post an answer after I write reproducible code for it). Before I do, one issue I'm curious about: my analytic Hessian (which I am pretty sure is correct) does not match numeric Hessian approximation values. They both give similar standard error estimates, but the raw matrix values look very different (different signs, different orders of magnitude etc). Is it feasible that an analytic Hessian would be different from the optimizer's numeric approximation, or should I assume that my Hessian calculations are incorrect?
Sep
25
comment Analytical gradient for bisection method nested within objective function
Sorry, I can't seem to grasp the application of this solution. Would the gradient function just consist of partial derivatives of G(y,b1,m1,b2,m2) with respect to b1, m1, b2, m2, or is it somehow incorporated into the loglik equation? Also, would the gradient function require iteration via bisection method as well?
Sep
25
asked Analytical gradient for bisection method nested within objective function
Aug
27
comment Efficient nested optimization of several hundred equations in R
Good point, I was inadvertently asking nleqslv() to do the impossible. For very small x values, the solution at these points where the solution would normally exist apparently approaches infinity instead. This issue never manifested with optimization of the absolute value, because the solution approached zero, which worked for my purposes (albeit quite slowly). It seems that adding solution[is.infinite(solution)]=0 to function f takes care of it. I'll need to check to make sure this is a robust solution, but it seems to be the much more efficient answer I was looking for. Thanks!!
Aug
26
awarded  Scholar
Aug
26
accepted Efficient nested optimization of several hundred equations in R
Aug
25
awarded  Editor
Aug
25
revised Efficient nested optimization of several hundred equations in R
added 618 characters in body
Aug
25
comment Efficient nested optimization of several hundred equations in R
This works really well for medium to large values, but I can't seem to get it to work for smaller values. For instance, K <- 500 x1 <- seq(.01,10,.02) x2 <- seq(.001,1,.002) x3 <- seq(.0001,.05,.0001) x4 <- rep(1,500) yields a range of y values from ~.3 to ~1.0. It doesn't seem to be reaching the y values closer to zero. If I lower the starting value to .1, then my values range from ~0.1 to ~1. However, if I lower the starting value to .01, the values range from ~0 to ~0.14. Any thoughts?
Aug
25
asked Efficient nested optimization of several hundred equations in R