Research in Statistics (Dec 2024)
Algebraic likelihood maximization avoiding the log-likelihood function and differentiation
Abstract
The fact that the graph of the exponential function exp is always at or above the straight line through the origin with slope exp(1) is well-known and can be easily proved using differential calculus. We provide a simple algebraic proof of that fact and use that fact to construct a template for maximizing the likelihood function that avoids the log-likelihood function and differentiation in a number of examples, including the two-parameter normal distribution family.
Keywords
