SOCA and OGA for HL spaces with strong properties

Abstract

We study open colorings in certain classes of hereditary Lindel\"of (HL) spaces and submetrizable spaces. In particular, we show that the definible version for the Open Graph Axiom (OGA) holds for the class of HL strong Choquet submetrizable spaces extending a well-known result of Feng. Furthermore, we show the consistency of the Open Graph Axiom for regular spaces that have countable spread and it's square also has it, reaching closer to a well known conjecture of Todorcevi\'c: "It is consistent that all regular spaces with countable spread satisfy OGA".