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+ | '''Introduction''' | ||
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+ | The Bayesian decision theory is a valuable approach to solve a pattern classification problem. It is based on quantifying the tradeoffs between various classification decisions using the probability of events occurring and the costs that accompany the decisions. Here, we are assuming that the problems are posed in probalistic terms and all relevant probability values are known (It is important to note that in reality its not always like this). Consider a situation where we have a stack of cards where each card is either a diamond or spade, . We can denote x = x<sub>1</sub> for diamonds, and x = x<sub>2</sub> for spades. Suppose we want to design a system that will be able to predict the next card that will come up. We also know the prior probability P(x<sub>1</sub>) that the next card is diamonds, and some prior probability P(x<sub>1</sub>) that it's spades, and both probabilities sum up to 1 (since we only have two variables). | ||
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Revision as of 20:46, 14 February 2013
Bayes Decision Theory
Introduction
The Bayesian decision theory is a valuable approach to solve a pattern classification problem. It is based on quantifying the tradeoffs between various classification decisions using the probability of events occurring and the costs that accompany the decisions. Here, we are assuming that the problems are posed in probalistic terms and all relevant probability values are known (It is important to note that in reality its not always like this). Consider a situation where we have a stack of cards where each card is either a diamond or spade, . We can denote x = x1 for diamonds, and x = x2 for spades. Suppose we want to design a system that will be able to predict the next card that will come up. We also know the prior probability P(x1) that the next card is diamonds, and some prior probability P(x1) that it's spades, and both probabilities sum up to 1 (since we only have two variables).