Abstract
We consider two axioms of second-order arithmetic. These axioms assert, in two different ways, that infinite but narrow binary trees always have infinite paths. We show that both axioms are strictly weaker than Weak Konig's Lemma, and incomparable in strength to the dual statement (WWKL) that wide binary trees have paths.
| Original language | English |
|---|---|
| Journal | Journal of Symbolic Logic |
| State | Published - 2009 |