Discrete stopping times in the lattice of continuous functions
Abstract
A functional calculus for an order complete vector lattice E was developed by Grobler in 2014 using the Daniell integral. We show that if one represents the universal completion of E as C∞(K), then the Daniell functional calculus for continuous functions is exactly the pointwise composition of functions in C∞(K). This representation allows an easy deduction of the various properties of the functional calculus. Afterwards, we study discrete stopping times and stopped processes in C∞(K). We obtain a representation that is analogous to what is expected in probability theory.
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