Inner models from extended logics and the Delta-operation

Abstract

If L is an abstract logic (a.k.a. model theoretic logic), we can define the inner model C(L) by replacing first order logic with L in G\"odel's definition of the inner model L of constructible sets. Set theoretic properties of such inner models C(L) have been investigated recently and a spectrum of new inner models is emerging between L and HOD. The topic of this paper is the effect on C(L) of a slight modification of L i.e. how sensitive is C(L) on the exact definition of L? The -extension (L) of a logic is generally considered a "mild" extension of L. We give examples of logics L for which the inner model C(L) is consistently strictly smaller than the inner model C((L)), and in one case we show this follows from the existence of 0.