Christopher Chambers, Alan Miller, Ruodu Wang, Qinyu Wu
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Max-stability under first-order stochastic dominance
Max-stability is the property that taking a maximum between two inputs
results in a maximum between two outputs. We investigate max-stability with
respect to first-order stochastic dominance, the most fundamental notion of
stochastic dominance in decision theory. Under two additional standard axioms
of monotonicity and lower semicontinuity, we establish a representation theorem
for functionals satisfying max-stability, which turns out to be represented by
the supremum of a bivariate function. Our characterized functionals encompass
special classes of functionals in the literature of risk measures, such as
benchmark-loss Value at Risk (VaR) and $\Lambda$-quantile.
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