An infinite branch in a decidable tree
Abstract
We consider a structure M = N, \Tr,<\ , where the relation Tr(a,x,y) with a parameter a defines a family of trees on N and < is the usual order on N. We show that if the elementary theory of M is decidable then (1) the relation Q( a) "there is an infinite branch in the tree Tr( a,x,y)" is definable in M, and (2) if there is an infinite branch in the tree Tr( a,x,y), then there is a definable in M infinite branch.
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