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[[Category:2010 Spring ECE 662 mboutin]] | [[Category:2010 Spring ECE 662 mboutin]] | ||
− | = | + | =Details of Lecture 2, [[ECE662]] Spring 2010= |
+ | In the second lecture, we discussed the difference between finite and infinite feature spaces. We saw that, when the feature space of a decision problem is finite, then one does not necessarily need to use the decision theory techniques we will covered in [[ECE662]]. More specifically, if the feature space is relatively small, then one may be able to pre-compute the decisions for all possible feature values, and store the results in a look-up-table. | ||
− | + | In the case of infinite feature spaces, we discuss the use of [[Lecture_2_-_Decision_Hypersurfaces_OldKiwi|hypersurfaces]] in the feature space as a means of defining the separation between classes. | |
− | + | ||
+ | Previous: [[Lecture1ECE662S10|Lecture 1]] | ||
+ | Next: [[Lecture3ECE662S10|Lecture 3]] | ||
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+ | [[OutlineECE662S10|Back to course outline]] | ||
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[[ 2010 Spring ECE 662 mboutin|Back to 2010 Spring ECE 662 mboutin]] | [[ 2010 Spring ECE 662 mboutin|Back to 2010 Spring ECE 662 mboutin]] | ||
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+ | [[ECE662|Back to ECE662]] |
Latest revision as of 08:03, 12 April 2010
Details of Lecture 2, ECE662 Spring 2010
In the second lecture, we discussed the difference between finite and infinite feature spaces. We saw that, when the feature space of a decision problem is finite, then one does not necessarily need to use the decision theory techniques we will covered in ECE662. More specifically, if the feature space is relatively small, then one may be able to pre-compute the decisions for all possible feature values, and store the results in a look-up-table.
In the case of infinite feature spaces, we discuss the use of hypersurfaces in the feature space as a means of defining the separation between classes.
Previous: Lecture 1
Next: Lecture 3