Abstract
A first-order sentence isquasi-modalif its class of models is closed under the modal validity preserving constructions of disjoint unions, inner substructures and bounded epimorphic images.It is shown that all members of the proper class of canonical structures of a modal logicΛhave the same quasi-modal first-order theoryΨΛ. The models of this theory determine a modal logicΛewhich is the largest sublogic ofΛto be determined by an elementary class. The canonical structures ofΛealso haveΨΛas their quasi-modal theory.In addition there is a largest sublogicΛeofΛthat is determined by its canonical structures, and again the canonical structures ofΛehaveΨΛare their quasi-modal theory. Thus. Finally, we show that all finite structures validatingΛare models ofΨΛ, and that ifΛis determined by its finite structures, thenΨΛis equal to the quasi-modal theory of these structures.