Chains and antichains in partial orderings |
| |
| Authors: | Valentina S. Harizanov Carl G. JockuschJr. Julia F. Knight |
| |
| Affiliation: | (1) Department of Mathematics, George Washington University, Washington, DC 20052, USA;(2) Department of Mathematics, University of Illinois at Urbana-Champaign, 1409 W. Green St, Urbana, IL 61801, USA;(3) Department of Mathematics, University of Notre Dame, Notre Dame, IN 46556, USA |
| |
| Abstract: | ![]()
We study the complexity of infinite chains and antichains in computable partial orderings. We show that there is a computable partial ordering which has an infinite chain but none that is  or  , and also obtain the analogous result for antichains. On the other hand, we show that every computable partial ordering which has an infinite chain must have an infinite chain that is the difference of two  sets. Our main result is that there is a computably axiomatizable theory K of partial orderings such that K has a computable model with arbitrarily long finite chains but no computable model with an infinite chain. We also prove the corresponding result for antichains. Finally, we prove that if a computable partial ordering  has the feature that for every  , there is an infinite chain or antichain that is  relative to  , then we have uniform dichotomy: either for all copies  of  , there is an infinite chain that is  relative to  , or for all copies  of  , there is an infinite antichain that is  relative to  . |
| |
| Keywords: | Mathematics Subject Classification (2000) 03D55 03C57 03D45 06A06 |
| 本文献已被 SpringerLink 等数据库收录! |
|
