Maximal width learning of binary functions

Anthony, MartinORCID logo; and Ratsaby, Joel (2006) Maximal width learning of binary functions. Technical Report. Centre for Discrete and Applicable Mathematics, London School of Economics and Political Science, London, UK.
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This paper concerns learning binary-valued functions defined on IR, and investigates how a particular type of ‘regularity’ of hypotheses can be used to obtain better generalization error bounds. We derive error bounds that depend on the sample width (a notion similar to that of sample margin for real-valued functions). This motivates learning algorithms that seek to maximize sample width.
Item Type Report (Technical Report)
Departments Mathematics
Date Deposited 10 Oct 2008 10:45
URI https://researchonline.lse.ac.uk/id/eprint/13809

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