Testing for Outliers with Conformal p-values

Bates, Stephen; Candès, Emmanuel J.; Lei, Lihua; Romano, Yaniv; Sesia, Matteo

doi:10.48550/arxiv.2104.08279

Cited by 17 publications

(68 citation statements)

References 68 publications

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“…Conformal prediction is a generic approach, and much recent work has focused on designing specific conformal procedures to have good performance according to additional desiderata such as small set sizes [16], coverage that is approximately balanced across regions of feature space [17][18][19][20][21][22][23], and errors balanced across classes [16,[24][25][26]. Recent extensions also address topics such as distribution estimation [27], causal inference [28], survival analysis [29], differential privacy [30], outlier detection [31], speeding up the test-time evaluation of complex models [32,33], the few-shot setting [34], and handling of testing distribution shift [35][36][37][38].…”

Section: Related Workmentioning

confidence: 99%

Learn then Test: Calibrating Predictive Algorithms to Achieve Risk Control

Angelopoulos¹,

Bates²,

Candès³

et al. 2021

Preprint

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We introduce Learn then Test, a framework for calibrating machine learning models so that their predictions satisfy explicit, finite-sample statistical guarantees regardless of the underlying model and (unknown) datagenerating distribution. The framework addresses, among other examples, false discovery rate control in multilabel classification, intersection-over-union control in instance segmentation, and the simultaneous control of the type-1 error of outlier detection and confidence set coverage in classification or regression. To accomplish this, we solve a key technical challenge: the control of arbitrary risks that are not necessarily monotonic. Our main insight is to reframe the risk-control problem as multiple hypothesis testing, enabling techniques and mathematical arguments different from those in the previous literature. We use our framework to provide new calibration methods for several core machine learning tasks with detailed worked examples in computer vision.

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Section: Related Workmentioning

confidence: 99%

Learn then Test: Calibrating Predictive Algorithms to Achieve Risk Control

Angelopoulos¹,

Bates²,

Candès³

et al. 2021

Preprint

Self Cite

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“…Finally, we mention that the R-value has a nice interpretation under the conformal inference framework. Section A.3 in the Supplementary Material shows that a variation of our R-value corresponds to the Benjamini-Hochberg (BH) adjusted q-value of the conformal p-values (Bates et al, 2021) under the one-class classification setting. The connection to conformal inference and the BH method, both of which are model-free, provides insights on why the FASI algorithm is assumption-lean and offers exact FSR control in finite samples as claimed in Theorem 1.…”

Section: Why Fasi Work?mentioning

confidence: 99%

A Burden Shared is a Burden Halved: A Fairness-Adjusted Approach to Classification

Rava¹,

Sun²,

James³

et al. 2021

Preprint

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We study fairness in classification, where one wishes to make automated decisions for people from different protected groups. When individuals are classified, the decision errors can be unfairly concentrated in certain protected groups. We develop a fairness-adjusted selective inference (FASI) framework and data-driven algorithms that achieve statistical parity in the sense that the false selection rate (FSR) is controlled and equalized among protected groups. The FASI algorithm operates by converting the outputs from black-box classifiers to R-values, which are intuitively appealing and easy to compute. Selection rules based on R-values are provably valid for FSR control, and avoid disparate impacts on protected groups. The effectiveness of FASI is demonstrated through both simulated and real data.

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“…This approach is however supervised, as it requires OOD datapoints to train the detector which may not generalize to unseen OOD datapoints. Recently, there has been interest in unsupervised detection based on ICAD (Cai and Koutsoukos 2020; Bates et al 2021). Cai and Koutsoukos (2020) propose to use Martingale test (Fedorova et al 2012) on p-values from NCM based on either variational autoencoders (VAE) or deep support vector data description (SVDD) for OOD detection in time series data, where a batch of data is available for detection.…”

Section: Introductionmentioning

confidence: 99%

“…Cai and Koutsoukos (2020) propose to use Martingale test (Fedorova et al 2012) on p-values from NCM based on either variational autoencoders (VAE) or deep support vector data description (SVDD) for OOD detection in time series data, where a batch of data is available for detection. Bates et al (2021) focus on problems that arise in conformal detection when multiple points are tested for OOD-ness. iDECODe proposed for the detection of a single point as OOD is also built on ICAD framework, which guarantees a bounded false detection rate (FDR).…”

Section: Introductionmentioning

confidence: 99%

iDECODe: In-distribution Equivariance for Conformal Out-of-distribution Detection

Kaur¹,

Jha²,

Roy³

et al. 2022

Preprint

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Machine learning methods such as deep neural networks (DNNs), despite their success across different domains, are known to often generate incorrect predictions with high confidence on inputs outside their training distribution. The deployment of DNNs in safety-critical domains requires detection of out-of-distribution (OOD) data so that DNNs can abstain from making predictions on those. A number of methods have been recently developed for OOD detection, but there is still room for improvement. We propose the new method iDECODe, leveraging in-distribution equivariance for conformal OOD detection. It relies on a novel base non-conformity measure and a new aggregation method, used in the inductive conformal anomaly detection framework, thereby guaranteeing a bounded false detection rate. We demonstrate the efficacy of iDECODe by experiments on image and audio datasets, obtaining state-of-the-art results. We also show that iDECODe can detect adversarial examples.

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Testing for Outliers with Conformal p-values

Cited by 17 publications

References 68 publications

Learn then Test: Calibrating Predictive Algorithms to Achieve Risk Control

Learn then Test: Calibrating Predictive Algorithms to Achieve Risk Control

A Burden Shared is a Burden Halved: A Fairness-Adjusted Approach to Classification

iDECODe: In-distribution Equivariance for Conformal Out-of-distribution Detection

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