First derivatives at the optimum analysis (fdao): An approach to estimate the uncertainty in nonlinear regression involving stochastically independent variables

Abstract

An important problem of optimization analysis surges when parameters such as \θj\j=1,\, … \,,k , determining a function y=f(x\θj\) , must be estimated from a set of observables \ xi,yi\i=1,\, … \,,m . Where \xi\ are independent variables assumed to be uncertainty-free. It is known that analytical solutions are possible if y=f(xθj) is a linear combination of \θj=1,\, … \,,k \. Here it is proposed that determining the uncertainty of parameters that are not linearly independent may be achieved from derivatives ∂ f(x \θj\)∂ θj at an optimum, if the parameters are stochastically independent.