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| Kalibracja modelu× | Kwantyfikacja niepewności× | |
|---|---|---|
| Dziedzina≠ | Uczenie maszynowe | Symulacja |
| Rodzina≠ | Machine learning | Process / pipeline |
| Rok powstania≠ | 2017 | Seminal modern form: 2002 |
| Twórca≠ | Platt; Guo et al. | Norbert Wiener (polynomial chaos, 1938); extended to Wiener–Askey scheme by Xiu & Karniadakis (2002) |
| Typ≠ | Post-hoc probability correction technique | Computational uncertainty analysis framework |
| Źródło pierwotne≠ | Guo, C., Pleiss, G., Sun, Y., & Weinberger, K. Q. (2017). On calibration of modern neural networks. International Conference on Machine Learning, 1321–1330. link ↗ | Xiu, D. & Karniadakis, G.E. (2002). The Wiener-Askey Polynomial Chaos for Stochastic Differential Equations. SIAM Journal on Scientific Computing, 24(2), 619–644. DOI ↗ |
| Inne nazwy≠ | Classifier Calibration, Probability Calibration, Score Calibration, Model Kalibrasyonu | UQ, polynomial chaos expansion, PCE, Kriging surrogate |
| Pokrewne≠ | 3 | 9 |
| Podsumowanie≠ | Model calibration is a post-hoc technique that adjusts the probability outputs of a trained classifier so that predicted confidence scores match empirical outcome frequencies. A classifier is said to be perfectly calibrated if, among all predictions made with confidence p, exactly a fraction p of them are correct. Systematic miscalibration of modern deep neural networks was rigorously documented by Guo et al. (2017), who showed that networks trained with standard cross-entropy loss tend to be overconfident, and proposed temperature scaling as a simple, effective remedy. | Uncertainty Quantification (UQ) is a computational framework for systematically measuring how uncertainty in the inputs of a model propagates into uncertainty in its outputs. Building on Wiener's polynomial chaos theory (1938) and formalised for general stochastic problems by Xiu and Karniadakis (2002), UQ uses two primary strategies: Polynomial Chaos Expansion (PCE), which represents the model output as a series of orthogonal polynomials matched to the input distributions, and Kriging (Gaussian process) surrogates, which replace an expensive simulation with a fast statistical approximation fitted to a small set of carefully chosen runs. |
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