Unions and ideals of locally strongly porous sets

Abstract

For subsets of R+ = [0,∞) we introduce a notion of coherently porous sets as the sets for which the upper limit in the definition of porosity at a point is attained along the same sequence. We prove that the union of two strongly porous at 0 sets is strongly porous if and only if these sets are coherently porous. This result leads to a characteristic property of the intersection of all maximal ideals containing in the family of strongly porous at 0 subsets of R+. It is also shown that the union of a set A ⊂eq R+ with arbitrary strongly porous at 0 subset of R+ is porous at 0 if and only if A is lower porous at 0.