Krivine's Function Calculus and Bochner integration
Abstract: We prove that Krivine's Function Calculus is compatible with integration. Let $(\Omega,\Sigma,\mu)$ be a finite measure space, $X$ a Banach lattice, $x\in Xn$, and $f\colon\mathbb Rn\times\Omega\to\mathbb R$ a function such that $f(\cdot,\omega)$ is continuous and positively homogeneous for every $\omega\in\Omega$, and $f(s,\cdot)$ is integrable for every $s\in\mathbb Rn$. Put $F(s)=\int f(s,\omega)d\mu(\omega)$ and define $F(x)$ and $f(x,\omega)$ via Krivine's Function Calculus. We prove that under certain natural assumptions $F(x)=\int f(x,\omega)d\mu(\omega)$, where the right hand side is a Bochner integral.
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