# Interval Predictions

## Main.IntervalPredictions History

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Let the outcome space $\Omega$ be a linearly ordered space (such as the real line $\mathbb{R}$). An ''interval prediction'' for an outcome $\omega\in\Omega$ is an interval $[a,b]\subseteq\Omega$, where $a,b\in\Omega$. This kind of predictions is studied in [[conformal prediction]] and is the subject of [[Open/competitive on-line interval prediction]].

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Let the outcome space $\Omega$ be a linearly ordered space (such as the real line $\mathbb{R}$). An ''interval prediction'' for an outcome $\omega\in\Omega$ is an interval ${[a,b]} \subseteq \Omega$, where $a,b\in\Omega$. This kind of predictions is studied in [[conformal prediction]] and is the subject of [[Open/competitive on-line interval prediction]].

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Let the outcome space $\Omega$ be a linearly ordered space (such as the real line $\mathbb{R}$). An ''interval prediction'' for an outcome $\omega\in\Omega$ is an interval $[a,b]\subseteq\Omega$, where $a,b\in\Omega$. This kind of predictions is studied in [[conformal prediction]] and is the subject of [[Open/competitive on-line interval prediction]].

For other kinds of predictions, see [[game of prediction]]. In particular, [[region predictions]] are more general than interval predictions.

For other kinds of predictions, see [[game of prediction]]. In particular, [[region predictions]] are more general than interval predictions.