TY - JOUR

T1 - Fixed values versus empirical quantiles as thresholds in excess distribution modelling

AU - Gaigall, Daniel

AU - Gerstenberg, Julian

N1 - Publisher Copyright: © 2025 The Authors

PY - 2025/2/8

Y1 - 2025/2/8

N2 - Conditional excess distribution modelling is a widely used technique, in financial and insurance mathematics or survival analysis, for instance. Classical theory considers the thresholds as fixed values. In contrast, the use of empirical quantiles as thresholds offers advantages with respect to the design of the statistical experiment. Either way, the modeller is in a non-standard situation and runs in the risk of improper usage of statistical procedures. From both points of view, statistical planning and inference, a detailed discussion is requested. For this purpose, we treat both methods and demonstrate the necessity taking into account the characteristics of the approaches in practice. In detail, we derive general statements for empirical processes related to the conditional excess distribution in both situations. As examples, estimating the mean excess and the conditional Value-at-Risk are given. We apply our findings for the testing problems of goodness-of-fit and homogeneity for the conditional excess distribution and obtain new results of outstanding interest.

AB - Conditional excess distribution modelling is a widely used technique, in financial and insurance mathematics or survival analysis, for instance. Classical theory considers the thresholds as fixed values. In contrast, the use of empirical quantiles as thresholds offers advantages with respect to the design of the statistical experiment. Either way, the modeller is in a non-standard situation and runs in the risk of improper usage of statistical procedures. From both points of view, statistical planning and inference, a detailed discussion is requested. For this purpose, we treat both methods and demonstrate the necessity taking into account the characteristics of the approaches in practice. In detail, we derive general statements for empirical processes related to the conditional excess distribution in both situations. As examples, estimating the mean excess and the conditional Value-at-Risk are given. We apply our findings for the testing problems of goodness-of-fit and homogeneity for the conditional excess distribution and obtain new results of outstanding interest.

KW - Conditional excess distribution

KW - Empirical quantile

KW - Goodness-of-fit test

KW - Homogeneity test

UR - http://www.scopus.com/inward/record.url?scp=85217259437&partnerID=8YFLogxK

U2 - 10.1016/j.jspi.2025.106276

DO - 10.1016/j.jspi.2025.106276

M3 - Article

AN - SCOPUS:85217259437

VL - 238

JO - Journal of Statistical Planning and Inference

JF - Journal of Statistical Planning and Inference

SN - 0378-3758

M1 - 106276

ER -