Separating cardinal characteristics of the strong measure zero ideal
Abstract
Let SN be the σ-ideal of the strong measure zero sets of reals. We present general properties of forcing notions that allow to control of the additivity of SN after finite support iterations. This is applied to force that the four cardinal characteristics associated with SN are pairwise different: \[add(SN)<cov(SN)<non(SN)<cof(SN).\] Furthermore, we construct a forcing extension satisfying the above and Cicho\'n's maximum (i.e.\ that the non-dependent values in Cicho\'n's diagram are pairwise different).
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