On the fast approximation of point clouds using Chebyshev polynomials

Weisbrich, Sven; Malissiovas, Georgios; Neitzel, Frank

doi:10.1515/jag-2021-0010

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Aggregateshapley(x V G)1

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2022

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“…Remark Even though Y can be arbitrarily chosen based on the maximum depth of the tree D, it is shown that Chebyshev points are near-optimal in numerical stability [11]. In our Linear TreeShap implementation, we used the Chebyshev points of the second kind.…”

Section: Aggregateshapley(x V G)mentioning

confidence: 99%

Linear TreeShap

Yu¹,

Chen²,

Bifet³

et al. 2022

Preprint

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Decision trees are well-known due to their ease of interpretability. To improve accuracy, we need to grow deep trees or ensembles of trees. These are hard to interpret, offsetting their original benefits. Shapley values have recently become a popular way to explain the predictions of tree-based machine learning models. It provides a linear weighting to features independent of the tree structure. The rise in popularity is mainly due to TreeShap, which solves a general exponential complexity problem in polynomial time. Following extensive adoption in the industry, more efficient algorithms are required. This paper presents a more efficient and straightforward algorithm: Linear TreeShap. Like TreeShap, Linear TreeShap is exact and requires the same amount of memory.

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Section: Aggregateshapley(x V G)mentioning

confidence: 99%