| Information | |
|---|---|
| has gloss | eng: In set theory, an Aronszajn tree is an uncountable tree with no uncountable branches and no uncountable levels. For example, every Suslin tree is an Aronszajn tree. More generally, for a cardinal κ, a κ-Aronszajn tree is a tree of height κ such that all levels have size less than κ and all branches have height less than κ (so Aronszajn trees are the same as \aleph_1-Aronszajn trees). They are named for Nachman Aronszajn, who constructed an Aronszajn tree in 1934. |
| lexicalization | eng: Aronszajn tree |
| instance of | e/Tree (set theory) |
Lexvo © 2008-2024 Gerard de Melo. Contact Legal Information / Imprint