In axiomatic set theory, a mathematical discipline, a morass is an infinite combinatorial structure, used to create "large" structures from a "small" number of "small" approximations. They were invented by Ronald Jensen in his proof that cardinal transfer theorems hold under the axiom of constructibility.
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- In axiomatic set theory, a mathematical discipline, a morass is an infinite combinatorial structure, used to create "large" structures from a "small" number of "small" approximations. They were invented by Ronald Jensen in his proof that cardinal transfer theorems hold under the axiom of constructibility.
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- In axiomatic set theory, a mathematical discipline, a morass is an infinite combinatorial structure, used to create "large" structures from a "small" number of "small" approximations. They were invented by Ronald Jensen in his proof that cardinal transfer theorems hold under the axiom of constructibility.
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