Abstract
We show how to identify the distributions of the error components in the two-way dyadic model $y_{ij}=c+\alpha_i+\eta_j+\varepsilon_{ij}$. To this end, we extend the lemma of Kotlarski (1967), mimicking the arguments of Evdokimov and White (2012). We allow the characteristic functions of the error components to have real zeros, as long as they do not overlap with zeros of their first derivatives.
Related Papers
Identifying the Smallest Adversarial Load Perturbations that Render DC-OPF Infeasible2025-07-10Alpay Algebra V: Multi-Layered Semantic Games and Transfinite Fixed-Point Simulation2025-07-10Distributed Lyapunov Functions for Nonlinear Networks2025-06-25A Regret Perspective on Online Selective Generation2025-06-16Optimization over Sparse Support-Preserving Sets: Two-Step Projection with Global Optimality Guarantees2025-06-10Learning event-triggered controllers for linear parameter-varying systems from data2025-06-10Robust Transceiver Design for RIS Enhanced Dual-Functional Radar-Communication with Movable Antenna2025-06-09Gumbel-max List Sampling for Distribution Coupling with Multiple Samples2025-06-05