We give conditions that ensure that an operator satisfying a Piestch domination in a given setting also satisfies a Piestch domination in a different setting. From this we derive that a bounded multilinear operator
T
T
is Lipschitz
p
p
-summing if and only if the mapping
f
T
(
x
1
⊗
⋯
⊗
x
n
)
≔
T
(
x
1
,
…
,
x
n
)
f_T(x_1\otimes \cdots \otimes x_n)≔T(x_1,\ldots , x_n)
is Lipschitz
p
p
-summing. The results are based on the projective tensor norm. An example with the Hilbert tensor norm is provided to show that the statement may not hold when a reasonable cross-norm other than the projective tensor norm is considered.