Pettis integral mathematics , the Pettis integral or Gelfand-Pettis integral , named after Israel M. Gelfand and Billy James Pettis , extends the definition of the Lebesgue integral to vector-valued functions on a measure space , by exploiting duality . The integral was introduced by Gelfand for the case when the measure space is an interval with Lebesgue measure . The integral is also called the weak integral in contrast to the Bochner integral , which is the strong integral.Definition Let f : X → V where is a measure space and V is a topological vector space with a continuous dual space that separates points, e.g. V is a normed space or is a Hausdorff locally convex TVS. f is Pettis integrable if for all and there exists a vector e ∈ V so that:e the Pettis integral of f . Common notations for the Pettis integral includeProperties An immediate consequence of the definition is that Pettis integrals are compatible with continuous, linear operators: If is and linear and continuous and is Pettis integrable, then is Pettis integrable as well and: The standard estimate with respect to a finite measure is contained in the closure of the convex hull of the values scaled by the measure of the integration domain:Hahn-Banach theorem and generalises the mean value theorem for integrals of real-valued functions: If then closed convex sets are simply intervals and for the inequalities Existence Let be a probability space , and let be a topological vector space with a dual space that separates points. Let be a sequence of Pettis-integrable random variables, and write for the Pettis integral of . Note that is a vector in, and is not a scalar value .partial sums the sum converge to a single vector. The weak law of large numbers implies that for every functional. Consequently, in the weak topology on.
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