Ways of Destruction

Abstract

We study the following natural strong variant of destroying Borel ideals: P +-destroys I if P adds an I-positive set which has finite intersection with every A∈I V. Also, we discuss the associated variants align* non*(I,+)=&\|Y|:Y⊂eqI+,\; ∀\;A∈I\;∃\;Y∈Y\;|A Y|<ω\\\ cov*(I,+)=&\|C|:C⊂eqI,\; ∀\;Y∈I+\;∃\;C∈C\;|Y C|=ω\ align* of the star-uniformity and the star-covering numbers of these ideals. Among other results, (1) we give a simple combinatorial characterisation when a real forcing PI can +-destroy a Borel ideal J; (2) we discuss many classical examples of Borel ideals, their +-destructibility, and cardinal invariants; (3) we show that the Mathias-Prikry, M(I*)-generic real +-destroys I iff M(I*) +-destroys I iff I can be +-destroyed iff cov*(I,+)>ω; (4) we characterise when the Laver-Prikry, L(I*)-generic real +-destroys I, and in the case of P-ideals, when exactly L(I*) +-destroys I; (5) we briefly discuss an even stronger form of destroying ideals closely related to the additivity of the null ideal.