- LOCALLY COMPACT PERFECTLY NORMAL SPACES MAY ALL BE PARACOMPACT
- PROBLEMS ARISING FROM BALOGH'S "LOCALLY NICE SPACES UNDER MARTIN'S AXIOM"
- Lindelof spaces which are indestructible, productive, or D
- If it looks and smells like the reals... Franklin D. Tall1
- Set-theoretic Problems Concerning Lindelof Franklin D. Tall1
- Lindelof spaces which are Menger, Hurewicz, Alster, productive, or D
- Productively Lindelof spaces may all be D Franklin D. Tall1
- PFA(S)[S] and the Arhangel'skii-Tall problem Franklin D. Tall1
- PFA(S)[S]: more mutually consistent topological consequences of PFA and V = L
- ON THE HEREDITARY PARACOMPACTNESS OF LOCALLY COMPACT, HEREDITARILY NORMAL SPACES
- j-3 Consistency results in topology, II: Forcing and large cardinals hart v.2003/06/18 Prn:20/06/2003; 8:04 F:hartj03.tex; VTEX/EA p. 1
- MATHEMATICAE An irrational problem
- The real line in elementary submodels of set theory
- Lindelof indestructibility, topological games and selection principles
- j-2 Consistency results in topology, I: Quotable principles hart v.2003/06/18 Prn:23/06/2003; 15:17 F:hartj02.tex; VTEX/EA p. 1
- MATHEMATICAE More reflections on compactness
- Houston Journal of Mathematics c University of Houston
- On a Core Concept of Arhangel'skii Franklin D. Tall1
- Perfectly Normal Non-metrizable Non-Archimedean Spaces are Generalized Souslin Lines
- SOME PROBLEMS AND TECHNIQUES IN SET-THEORETIC FRANKLIN D. TALL1
- PFA(S)[S] and Locally Compact Normal Franklin D. Tall1
- A Useful Model (Notes for 2011 Summer Topology Conference)
- Productive Lindelofness and a class of spaces considered by Z. Frolik
