Using the metadistribution of possible distributions for a given measure, we define a condition u... more Using the metadistribution of possible distributions for a given measure, we define a condition under which it is possible to make a decision based on the observation of random variable, which we call "statistical decidability". We provide a sufficient condition on the metadistribution for the decision to be "statistically decidable" and conjec- ture that decisions based on a metadistribution with non compact support are always "statistically undecidable".
Using the metadistribution of possible distributions for a given measure, we define a condition u... more Using the metadistribution of possible distributions for a given measure, we define a condition under which it is possible to make a decision based on the observation of random variable, which we call "statistical decidability". We provide a sufficient condition on the metadistribution ...
Using the metadistribution of possible distributions for a given measure, we define a condition u... more Using the metadistribution of possible distributions for a given measure, we define a condition under which it is possible to make a decision based on the observation of random variable, which we call "statistical decidability". We provide a sufficient condition on the metadistribution for the decision to be "statistically decidable" and conjec- ture that decisions based on a metadistribution with non compact support are always "statistically undecidable".
Using the metadistribution of possible distributions for a given measure, we define a condition u... more Using the metadistribution of possible distributions for a given measure, we define a condition under which it is possible to make a decision based on the observation of random variable, which we call "statistical decidability". We provide a sufficient condition on the metadistribution ...
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We provide a sufficient condition on the metadistribution for the decision to be "statistically decidable" and conjec- ture that decisions based on a metadistribution with non compact support are always "statistically undecidable".
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We provide a sufficient condition on the metadistribution for the decision to be "statistically decidable" and conjec- ture that decisions based on a metadistribution with non compact support are always "statistically undecidable".