A variational problem to calculate probabilities

Abstract

In this paper, we prove the existence and uniqueness of the conditional expectation of an event A given a σ-algebra G as a linear problem in the Lebesgue spaces Lp associated with a probability space through the Riesz Representation Theorems. For the L2 case, we state the Dirichlet's principle. Then, we extend this principle for specific values of p, framing the existence of the conditional expectation as a variational problem. We conclude with a proof of the law of total probability using these tools.

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