An adaptive multilevel stochastic approximation scheme for Value-at-Risk computation achieves complexity O(ε^{-2} |ln ε|^{5/2}) by selecting inner samples adaptively at each level.
Nested simulation in portfolio risk measurement
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
verdicts
UNVERDICTED 3representative citing papers
A multilevel stochastic approximation scheme achieves near-optimal complexity of order epsilon^{-2-delta} for VaR and epsilon^{-2}|ln epsilon|^2 for ES in nested risk estimation.
Establishes central limit theorems for the renormalized estimation errors of nested and multilevel stochastic approximation algorithms for VaR and ES, including averaged versions, with numerical illustration.
citing papers explorer
-
Adaptive Multilevel Stochastic Approximation of the Value-at-Risk
An adaptive multilevel stochastic approximation scheme for Value-at-Risk computation achieves complexity O(ε^{-2} |ln ε|^{5/2}) by selecting inner samples adaptively at each level.
-
A Multilevel Stochastic Approximation Algorithm for Value-at-Risk and Expected Shortfall Estimation
A multilevel stochastic approximation scheme achieves near-optimal complexity of order epsilon^{-2-delta} for VaR and epsilon^{-2}|ln epsilon|^2 for ES in nested risk estimation.
-
Asymptotic Error Analysis of Multilevel Stochastic Approximations for the Value-at-Risk and Expected Shortfall
Establishes central limit theorems for the renormalized estimation errors of nested and multilevel stochastic approximation algorithms for VaR and ES, including averaged versions, with numerical illustration.