AbstractIn this paper we provide non-smooth atomic decompositions of 2-microlocal Besov-type and Triebel–Lizorkin-type spaces with variable exponents $$B^{\varvec{w}, \phi }_{p(\cdot ),q(\cdot )}({\mathbb {R}}^n)$$
B
p
(
·
)
,
q
(
·
)
w
,
ϕ
(
R
n
)
and $$F^{\varvec{w}, \phi }_{p(\cdot ),q(\cdot )}({\mathbb {R}}^n)$$
F
p
(
·
)
,
q
(
·
)
w
,
ϕ
(
R
n
)
. Of big importance in general, and an essential tool here, are the characterizations of the spaces via maximal functions and local means, that we also present. These spaces were recently introduced by Wu et al. and cover not only variable 2-microlocal Besov and Triebel–Lizorkin spaces $$B^{\varvec{w}}_{p(\cdot ),q(\cdot )}({\mathbb {R}}^n)$$
B
p
(
·
)
,
q
(
·
)
w
(
R
n
)
and $$F^{\varvec{w}}_{p(\cdot ),q(\cdot )}({\mathbb {R}}^n)$$
F
p
(
·
)
,
q
(
·
)
w
(
R
n
)
, but also the more classical smoothness Morrey spaces $$B^{s, \tau }_{p,q}({\mathbb {R}}^n)$$
B
p
,
q
s
,
τ
(
R
n
)
and $$F^{s,\tau }_{p,q}({\mathbb {R}}^n)$$
F
p
,
q
s
,
τ
(
R
n
)
. Afterwards, we state a pointwise multipliers assertion for this scale.
Commutators of the Bilinear Hardy Operator on Herz Type Spaces with Variable Exponents
