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It was shown in Bj\"orn--Bj\"orn--Korte ("Minima of quasisuperminimizers", Nonlinear Anal. 155 (2017), 264-284) that

u:=\min\{u_1,u_2\}

is a

\overline{Q}

-quasisuperminimizer if

u_1

and

u_2

are

Q

-quasisuperminimizers and

\overline{Q}=2Q^2/(Q+1)

. Moreover, one-dimensional examples therein show that

\overline{Q}

is close to optimal. In this paper we give similar examples in higher dimensions. The case when

u_1

and

u_2

have different quasisuperminimizing constants is considered as well