The Halpern--L\"auchli Theorem at singular cardinals and failures of weak versions

Abstract

This paper continues a line of investigation of the Halpern--L\"auchli Theorem at uncountable cardinals. We prove in ZFC that the Halpern--L\"auchli Theorem for one tree of height holds whenever is strongly inaccessible and the coloring takes less than colors. We prove consistency of the Halpern--L\"auchli Theorem for finitely many trees of height , where is a strong limit cardinal of countable cofinality. On the other hand, we prove failure of weak forms of Halpern--\ for trees of height , whenever is a strongly inaccessible, non-Mahlo cardinal or a singular strong limit cardinal with cofinality the successor of a regular cardinal. We also prove failure in L of a weak version for all strongly inaccessible, non-weakly compact cardinals.