El Límite Inferior de Evidencia (ELBO) es un concepto fundamental en el campo de modelado probabilístico and variational inference. It serves as a crucial función objetivo that helps in approximating complex posterior distributions, which are often intractable to compute directly.
The ELBO is defined as the logarithm of the evidence (or marginal likelihood) of the observed data, lower-bounded by the Divergencia de Kullback-Leibler between the approximate posterior distribution and the true posterior distribution. Mathematically, it can be expressed as:
ELBO = E_q[log(p(x|z))] – KL(q(z|x) || p(z))
En esta ecuación:
- E_q[log(p(x|z))] represents the expected log-likelihood of the observed data given the latent variables, weighted by the approximate posterior distribution.
- KL(q(z|x) || p(z)) is the Kullback-Leibler divergence that measures the difference between the approximate posterior q(z|x) and the prior distribution p(z).
The purpose of maximizing the ELBO is to improve the quality of the variational approximation, making it closer to the true posterior distribution. This is essential in many machine learning applications, particularly in aprendizaje profundo bayesiano y modelos generativos como Autoencoders Variacionales (VAEs).
By effectively optimizing the ELBO, practitioners can leverage variational inference to make efficient inferences about hidden variables in complex models, leading to better rendimiento del modelo y predicciones más precisas.