How does strong convexity behave under Minkowski sums?

I'm going for the largest strong convexity constant, since any smaller value also works.

If $A$ is $alpha$-strongly convex and $B$ is $beta$-strongly convex, then $A+B$ is $gamma:=max{alpha,beta}$-strongly convex.

Proof: Let $a_1,a_2in A$, let $b_1,b_2in B$, and let $etain[0,1]$. For notational simplicity, I will set $a:=eta a_1+(1-eta)a_2$ and $b:=eta b_1+(1-eta)b_2$. Now suppose that $z$ is in the ball centered at $eta(a_1+b_1) + (1-eta)(a_2+b_2)=a+b$ with radius $eta(1-eta)gamma$. It suffices to show that $zin A+B$. By the construction of $gamma$ and definition of $z$, either

begin{equation} |a+b-z|=|a - left(z - bright)| leq eta(1-eta)gamma=eta(1-eta)max{alpha,beta} =eta(1-eta)alpha, tag{1} end{equation} or, begin{equation} |a+b-z|=|b - left(z - aright)|leq eta(1-eta)beta. tag{2} end{equation}

If (1) holds, then $z-b$ is in the ball centered at $a$ with the proper radius. Since $A$ is strongly convex, this implies $z-bin A$ and hence $zin A+bsubset A+B$. Likewise, if (2) holds, then $z-a$ is in the ball centered at $b$ with the proper radius. Since $B$ is strongly convex, we find $z-ain B$ and hence $zin B+asubset A+B$.