Improvements of Plachky-Steinebach theorem

Abstract

We show that the conclusion of Plachky-Steinebach theorem holds true for intervals of the form ]Lr'(λ),y[, where Lr'(λ) is the right derivative (but not necessarily a derivative) of the generalized log-moment generating function L at some λ> 0 and y∈\ ]Lr'(λ),+∞], under the only two following conditions: (a) L'r(λ) is a limit point of the set \L'r(t):t>λ\, (b) L(ti) is a limit for a suitable sequence (ti). By replacing Lr'(λ) by Lr'(λ+), the above result extends verbatim to the case λ=0 (replacing (a) by the right continuity of L at zero when Lr'(0+)=-∞). No hypothesis is made on L]-∞,λ[ (e.g. L]-∞,λ[ may be the constant +∞ when λ=0); λ 0 may be a non-differentiability point of L and moreover a limit point of non-differentiability points of L; λ=0 may be a left and right discontinuity point of L. The map L ]λ,λ+[ may fail to be strictly convex for all >0. If we drop the assumption (b), then the same conclusion holds with upper limits in place of limits. The foregoing is valid for general nets (μα,cα) of Borel probability measures and powers and replacing the intervals ]Lr'(λ+),y[ by ]xα,yα[ or [xα,yα], where (xα,yα) is any net such that (xα) converges to Lr'(λ+) and α yα>Lr'(λ+).