1 Introduction
The object of the paper is to study the following quasilinear problem with homogeneous Dirichlet boundary condition
(1)
−
Δ
p
u
+
Δ
q
u
=
f
(
x
,
u
,
∇
u
)
in
Ω
,
u
=
0
on
∂
Ω
on a bounded domain
Ω
⊂
ℝ
N
with the boundary
∂
Ω
. In the left-hand side of (1), we have the sum
−
Δ
p
+
Δ
q
of the negative p-Laplacian
Δ
p
and of the q-Laplacian
Δ
q
with
1
<
q
<
p
<
+
∞
. The operator
−
Δ
p
+
Δ
q
has a completely different behavior in comparison to the operator
−
Δ
p
−
Δ
q
, which is the (negative)
(
p
,
q
)
-Laplacian. Note that in
−
Δ
p
+
Δ
q
there is competition between
−
Δ
p
and
−
Δ
q
taking their difference and thus destroying the ellipticity in contrast to what happens in the case of
−
Δ
p
−
Δ
q
. The right-hand side
f
(
x
,
u
,
∇
u
)
of equation (1) is a so-called convection term meaning that it depends on the point
x
∈
Ω
in the domain, on the solution u and on its gradient
∇
u
. The convection term is expressed through the Nemytskii operator associated with a Carathéodory function
f
:
Ω
×
ℝ
×
ℝ
N
→
ℝ
, i.e.,
f
(
x
,
s
,
ξ
)
is measurable in
x
∈
Ω
for all
(
s
,
ξ
)
∈
ℝ
×
ℝ
N
and is continuous in
(
s
,
ξ
)
∈
ℝ
×
ℝ
N
for a.e.
x
∈
Ω
. The function f will be subject to appropriate growth conditions (H1)–(H2) in Section 2.
Such a problem without any available ellipticity but with a variational structure that prevents to have convection was studied for the first time in [1]. Specifically, in [1] the following particular variational version of (1) was investigated:
(2)
−
Δ
p
u
+
Δ
q
u
=
g
(
x
,
u
)
in
Ω
,
u
=
0
on
∂
Ω
,
with a Carathéodory function
g
:
Ω
×
ℝ
→
ℝ
. In order to highlight the core of the problem we have skipped the nonsmooth formulation in [1]. The difference between problems (1) and (2) consists in the fact that the reaction term
f
(
x
,
u
,
∇
u
)
of (1) depends on the gradient
∇
u
which is excluded in (2). This is an essential feature because the (somewhat) variational approach in [1] for (2) cannot be implemented for (1).
We briefly discuss some major characteristics of problem (1). Here we continue the study in [1] setting forth a nonvariational counterpart. The main aspect for the relevance of this work in comparison with the existing literature is the lack of ellipticity for the operator
−
Δ
p
+
Δ
q
in the principal part of (1). As pointed out in [1], taking a nonzero
u
0
∈
W
0
1
,
p
(
Ω
)
and a number
λ
>
0
it turns out that
〈
−
Δ
p
(
λ
u
0
)
+
Δ
q
(
λ
u
0
)
,
λ
u
0
〉
=
λ
p
∇
u
0
p
p
−
λ
q
∇
u
0
q
q
is not of constant sign, being positive for
λ
sufficiently large and negative otherwise, thus the ellipticity is lost. For this reason we call the operator
−
Δ
p
+
Δ
q
the competing
(
p
,
q
)
-Laplacian. We also note that the left-hand side of the equation in (1) is in the divergence form
−
Δ
p
u
+
Δ
q
u
=
−
div
(
a
(
|
∇
u
|
)
)
with
a
(
t
)
=
t
p
−
2
−
t
q
−
2
for all
t
>
0
. A minimal condition of ellipticity for an operator in divergence form
−
div
(
a
(
|
∇
u
|
)
)
(see, e.g., [2]) is to have, among other things,
a
(
t
)
>
0
for all
t
>
0
, which is not satisfied in the case of
a
(
t
)
=
t
p
−
2
−
t
q
−
2
.
Another important aspect of problem (1) is the presence of the convection term
f
(
x
,
u
,
∇
u
)
. It represents a real challenge with respect to [1] treating (2) because any variational method is inapplicable to (1). In [1] it was possible to build for (2) a variational approach through Ekeland’s variational principle on finite dimensional spaces despite the lack of ellipticity. This is not anymore possible for (1), so here we proceed totally different using nonvariational arguments. A systematic study of nonvariational methods applied to elliptic problems can be found in [3]. However, such methods cannot be directly implemented in the case of problem (1) taking into account the lack of needed ellipticity. We overcome this difficulty by resolving finite dimensional approximated problems and then passing to the limit in an appropriate sense.
Moreover, in problem (1) there is a lack of any monotonicity property for the driving operator
−
Δ
p
+
Δ
q
. This is the reason why the surjectivity theorem for pseudomonotone operators (see, e.g., [4, p. 40]) cannot be applied. A striking difference between the operators
−
Δ
p
−
Δ
q
and
−
Δ
p
+
Δ
q
is that the operator
−
Δ
p
−
Δ
q
is strictly monotone and continuous, so pseudomonotone, whereas this fails for
−
Δ
p
+
Δ
q
. Let us note that even the linear continuous operator
Δ
on
H
0
1
(
Ω
)
=
W
0
1
,
2
(
Ω
)
is not pseudomonotone. For any sequence
u
n
⇀
u
in
H
0
1
(
Ω
)
with
lim
sup
n
→
∞
〈
Δ
u
n
,
u
n
−
u
〉
≤
0
, the pseudomonotonicity of
Δ
would mean that
lim
inf
n
→
∞
〈
Δ
u
n
,
u
n
−
v
〉
≥
〈
Δ
u
,
u
−
v
〉
whenever
v
∈
H
0
1
(
Ω
)
, in particular (with
v
=
0
),
lim
inf
n
→
∞
〈
Δ
u
n
,
u
n
〉
≥
〈
Δ
u
,
u
〉
. Note that
lim
sup
n
→
∞
〈
Δ
u
n
,
u
n
−
u
〉
≤
0
is always true being equivalent to
lim
inf
n
→
∞
∇
u
n
L
2
(
Ω
)
2
≥
∥
∇
u
∥
L
2
(
Ω
)
2
that holds thanks to the weak lower semicontinuity of the norm. Besides,
lim
inf
n
→
∞
〈
Δ
u
n
,
u
n
〉
≥
〈
Δ
u
,
u
〉
is equivalent to
lim
sup
n
→
∞
∇
u
n
L
2
(
Ω
)
2
≤
∥
∇
u
∥
L
2
(
Ω
)
2
, which entails the strong convergence
u
n
→
u
since the space
H
0
1
(
Ω
)
is uniformly convex. Thus, we reach the contradiction that every weakly convergent sequence is strongly convergent, which proves the claim.
Due to the deficit of ellipticity, monotonicity and variational structure, there are no available techniques to handle problem (1). A fundamental idea of the paper is to seek a solution to (1) as a limit of finite dimensional approximations. To this end, we develop a finite dimensional fixed point approach and then generate a passing to the limit process to get generalized solutions. Our assumptions on the convection term
f
(
x
,
u
,
∇
u
)
are general and verifiable comprising solely conditions (H1)–(H2). Under a stronger assumption instead of (H1) and with (H2) as it is we are able to prove the existence of a generalized solution in a stronger sense. Finally, we observe that the same procedure applied to a problem driven by the ordinary
(
p
,
q
)
-Laplacian
−
Δ
p
−
Δ
q
and under the same hypotheses leads to the existence of a weak solution.
The rest of the paper consists of sections regarding mathematical background and hypotheses, approximate solutions and existence of generalized solutions to problem (1).
2 Mathematical background and hypotheses
In a Banach space, the strong convergence is denoted by → and the weak convergence by
⇀
. The Euclidean norm on the Euclidean space
ℝ
m
for any
m
≥
1
is denoted by
|
⋅
|
, while the standard scalar product is denoted by
⋅
. For every real number
r
>
1
, we set
r
′
=
r
/
(
r
−
1
)
(the Hölder conjugate of r). In particular, for
1
<
q
<
p
<
+
∞
we have
p
′
=
p
/
(
p
−
1
)
<
q
′
=
q
/
(
q
−
1
)
.
Given a bounded domain
Ω
⊂
ℝ
N
, the Sobolev spaces
W
0
1
,
p
(
Ω
)
and
W
0
1,
q
(
Ω
)
are endowed with the norms
∥
∇
(
⋅
)
∥
L
p
(
Ω
)
and
∥
∇
(
⋅
)
∥
L
q
(
Ω
)
, respectively, where
∥
⋅
∥
L
r
(
Ω
)
stands for the usual
L
r
-norm. The dual spaces of
W
0
1
,
p
(
Ω
)
and
W
0
1
,
q
(
Ω
)
are denoted
W
−
1
,
p
′
(
Ω
)
and
W
−
1
,
q
′
(
Ω
)
, respectively. In order to avoid repetitive arguments, we assume that
N
>
p
. The case
N
≤
p
is simpler and can be handled along the same lines. Under the assumption
N
>
p
, the critical exponent is
p
⁎
=
N
p
/
(
N
−
p
)
with the conjugate
(
p
⁎
)
′
=
p
⁎
/
(
p
⁎
−
1
)
.
We recall that the negative p-Laplacian
−
Δ
p
:
W
0
1
,
p
(
Ω
)
→
W
−
1
,
p
′
(
Ω
)
is expressed as
〈
−
Δ
p
u
,
v
〉
=
∫
Ω
|
∇
u
(
x
)
|
p
−
2
∇
u
(
x
)
⋅
∇
v
(
x
)
d
x
for
all
u
,
v
∈
W
0
1
,
p
(
Ω
)
.
It is a strictly monotone and continuous operator, so pseudomonotone. The only linear case is when
p
=
2
giving rise to the ordinary Laplacian. Similarly, we have the negative q-Laplacian
−
Δ
q
:
W
0
1
,
q
(
Ω
)
→
W
−
1
,
q
′
(
Ω
)
. Due to the assumption
1
<
q
<
p
<
+
∞
there is a continuous embedding
W
0
1
,
p
(
Ω
)
↪
W
0
1
,
q
(
Ω
)
. Consequently, the differential operator
−
Δ
p
+
Δ
q
in the left-hand side of (1) is well defined on
W
0
1
,
p
(
Ω
)
.
Next, we turn to the nonlinear term
f
(
x
,
u
,
∇
u
)
in the right-hand side of equation (1). Such a term depending on the function u and on its gradient
∇
u
is often called convection. It prevents to settle a variational structure for problem (1). Our hypotheses on the convection term are as follows:
(H1) There exist a nonnegative function
σ
∈
L
(
p
⁎
)
′
(
Ω
)
and constants
b
≥
0
and
c
≥
0
such that
f
(
x
,
s
,
ξ
)
≤
σ
(
x
)
+
b
|
s
|
p
⁎
−
1
+
c
|
ξ
|
p
−
1
for
a
.e
.
x
∈
Ω
,
all
s
∈
ℝ
,
ξ
∈
ℝ
N
.
(H2) There exist constants
c
0
<
1
,
c
1
>
0
and
α
∈
[1,
p
)
such that
f
(
x
,
s
,
ξ
)
s
≤
c
0
|
ξ
|
p
+
c
1
(
|
s
|
α
+
1
)
for
a
.e
.
x
∈
Ω
,
all
s
∈
ℝ
,
ξ
∈
ℝ
N
.
We provide a simple example of function verifying
(
H
1)
−
(
H
2)
.
Example 2.1
The function
f
:
Ω
×
ℝ
×
ℝ
N
→
ℝ
given by
f
(
x
,
s
,
ξ
)
=
|
s
|
α
−
2
s
+
s
1
+
s
2
(
|
ξ
|
p
−
1
+
h
(
x
)
)
for
all
(
x
,
s
,
ξ
)
∈
Ω
×
ℝ
×
ℝ
N
,
with a constant
α
∈
[
1
,
p
)
and some
h
∈
L
∞
(
Ω
)
satisfies conditions (H1)–(H2).
The next lemma will be useful in the sequel.
Lemma 2.2
Under assumption (H1) one has the estimate
∫
Ω
f
(
x
,
u
,
∇
u
)
v
d
x
≤
C
∥
σ
∥
L
(
p
⁎
)
′
(
Ω
)
+
∥
u
∥
L
p
⁎
(
Ω
)
p
⁎
−
1
+
∥
∇
u
∥
L
p
(
Ω
)
p
−
1
∥
∇
v
∥
L
p
(
Ω
)
for all
u
,
v
∈
W
0
1,
p
(
Ω
)
, with a constant
C
>
0
.
Proof
Assumption
(
H
1)
and Hölder’s inequality lead to
∫
Ω
f
(
x
,
u
,
∇
u
)
v
d
x
≤
∫
Ω
|
σ
|
|
v
|
d
x
+
b
∫
Ω
|
u
|
p
⁎
−
1
|
v
|
d
x
+
c
∫
Ω
|
∇
u
|
p
−
1
|
v
|
d
x
≤
∥
σ
∥
L
(
p
⁎
)
′
(
Ω
)
∥
v
∥
L
p
⁎
(
Ω
)
+
b
∥
u
∥
L
p
⁎
(
Ω
)
p
⁎
−
1
∥
v
∥
L
p
⁎
(
Ω
)
+
c
∥
∇
u
∥
L
p
(
Ω
)
p
−
1
∥
v
∥
L
p
(
Ω
)
,
∀
u
,
v
∈
W
0
1
,
p
(
Ω
)
.
Now it suffices to invoke the Sobolev embedding theorem for obtaining the stated conclusion.□
We introduce the notion of solution to problem (1) whose existence can be established under hypotheses (H1)–(H2).
Definition 2.3
Assume that hypothesis (H1) is verified. A function
u
∈
W
0
1
,
p
(
Ω
)
is said to be a generalized solution to problem (1) if there exists a sequence
{
u
n
}
n
≥
1
in
W
0
1
,
p
(
Ω
)
such that
u
n
⇀
u
in
W
0
1
,
p
(
Ω
)
as
n
→
∞
;
−
Δ
p
u
n
+
Δ
q
u
n
−
f
(
⋅
,
u
n
(
⋅
)
,
∇
u
n
(
⋅
)
)
⇀
0
in
W
−
1
,
p
′
(
Ω
)
as
n
→
∞
;
lim
n
→
∞
〈
−
Δ
p
u
n
,
u
n
−
u
〉
+
〈
Δ
q
u
n
,
u
n
−
u
〉
−
∫
Ω
f
(
x
,
u
n
(
x
)
,
∇
u
n
(
x
)
)
(
u
n
(
x
)
−
u
(
x
)
)
d
x
=
0
.
Lemma 2.2 ensures that Definition 2.3 is correctly formulated.
Lemma 2.2 shows that the Nemytskii operator
N
f
:
W
0
1
,
p
(
Ω
)
→
W
−
1
,
p
′
(
Ω
)
corresponding to the Carathéodory function
f
:
Ω
×
ℝ
×
ℝ
N
→
ℝ
, namely
N
f
(
w
)
=
f
(
⋅
,
w
(
⋅
)
,
∇
w
(
⋅
)
)
,
∀
w
∈
W
0
1
,
p
(
Ω
)
,
is well defined. Moreover, again by Lemma 2.2, there exists a constant
C
>
0
such that the following estimate holds
(3)
∥
N
f
(
w
)
∥
W
−
1
,
p
′
(
Ω
)
≤
C
∥
σ
∥
L
(
p
⁎
)
′
(
Ω
)
+
∥
w
∥
L
p
⁎
(
Ω
)
p
⁎
−
1
+
∥
∇
w
∥
L
p
(
Ω
)
p
−
1
,
∀
w
∈
W
0
1
,
p
(
Ω
)
.
We focus a bit more on the integral term
∫
Ω
f
(
x
,
u
n
(
x
)
,
∇
u
n
(
x
)
)
(
u
n
(
x
)
−
u
(
x
)
)
d
x
strengthening the growth condition in (H1).
(
H
1
)
'
There exist constants
c
1
≥
0
,
c
2
≥
0
,
r
∈
[
1
,
p
⁎
)
,
r
1
∈
[
1
,
p
⁎
)
,
r
2
∈
[
1
,
p
)
and a nonnegative function
σ
∈
L
r
′
(
Ω
)
such that
|
f
(
x
,
s
,
ξ
)
|
≤
σ
(
x
)
+
c
1
|
s
|
p
⁎
r
1
′
+
c
2
|
ξ
|
p
r
2
'
for
a
.e
.
x
∈
Ω
,
all
s
∈
ℝ
,
ξ
∈
ℝ
N
.
Remark 2.4
Condition
(
H
1
)
′
implies condition
(
H
1)
because if
r
1
∈
[
1
,
p
⁎
)
and
r
2
∈
[
1
,
p
)
, then
r
1
′
>
(
p
⁎
)
′
and
r
2
′
>
p
′
, which yields
p
⁎
r
1
′
<
p
⁎
(
p
⁎
)
′
=
p
⁎
−
1
and
p
r
2
′
<
p
p
′
=
p
−
1
.
With
(
H
1
)
′
in place of
(
H
1
)
we consider the existence of a solution to problem (1) in a stronger sense.
Definition 2.5
A function
u
∈
W
0
1
,
p
(
Ω
)
is said to be a strong generalized solution to problem (1) if there exists a sequence
{
u
n
}
n
≥
1
in
W
0
1
,
p
(
Ω
)
such that (a) and (b) in Definition 2.3 are satisfied together with (c)′
(
c
)
′
lim
n
→
∞
〈
−
Δ
p
u
n
+
Δ
q
u
n
,
u
n
−
u
〉
=
0
.
Our existence results for generalized and strong generalized solutions are given in Theorems 4.1 and 4.2 of Section 4.
We end this section with the following consequence of Brouwer’s fixed point theorem that will be an essential tool in our approach. For a proof we refer to [5, p. 37].
Lemma 2.6
Let X be a finite dimensional space with the norm
∥
⋅
∥
X
and let
A
:
X
→
X
⁎
be a continuous mapping. Assume that there is a constant
R
>
0
such that
〈
A
(
v
)
,
v
〉
≥
0
f
o
r
a
l
l
v
∈
X
w
i
t
h
∥
v
∥
X
=
R
.
Then there exists
u
∈
X
with
∥
u
∥
X
≤
R
satisfying
A
(
u
)
=
0
.
3 Finite dimensional approximate solutions
Since the Banach space
W
0
1
,
p
(
Ω
)
with
1
<
p
<
+
∞
is separable, there exists a Galerkin basis of
W
0
1
,
p
(
Ω
)
, which means a sequence
{
X
n
}
n
≥
1
of vector subspaces of
W
0
1
,
p
(
Ω
)
satisfying
⋃
n
=
1
∞
X
n
¯
=
W
0
1
,
p
(
Ω
)
.
Fix a Galerkin basis
{
X
n
}
n
≥
1
of
W
0
1
,
p
(
Ω
)
. The notation
|
Ω
|
stands for the Lebesgue measure of
Ω
.
Proposition 3.1
Assume that conditions
(
H
1
)
−
(
H
2
)
are fulfilled. Then for each
n
≥
1
there exists
u
n
∈
X
n
such that
(4)
〈
−
Δ
p
u
n
+
Δ
q
u
n
,
v
〉
=
∫
Ω
f
(
x
,
u
n
(
x
)
,
∇
u
n
(
x
)
)
v
(
x
)
d
x
f
o
r
a
l
l
v
∈
X
n
.
Proof
For each
n
≥
1
we introduce the mapping
A
n
:
X
n
→
X
n
⁎
by
〈
A
n
(
u
)
,
v
〉
=
〈
−
Δ
p
u
+
Δ
q
u
,
v
〉
−
∫
Ω
f
(
x
,
u
(
x
)
,
∇
u
(
x
)
)
v
(
x
)
d
x
for
all
u
,
v
∈
X
n
.
On the basis of assumption
(H2)
, Hölder’s inequality and Sobolev embedding theorem we find the estimate
〈
A
n
(
v
)
,
v
〉
=
∫
Ω
(
|
∇
v
|
p
−
|
∇
v
|
q
−
f
(
x
,
v
,
∇
v
)
v
)
d
x
≥
∫
Ω
(
(
1
−
c
0
)
|
∇
v
|
p
−
|
∇
v
|
q
−
c
1
(
|
v
|
α
+
1
)
)
d
x
≥
(
1
−
c
0
)
∥
∇
v
∥
L
p
(
Ω
)
p
−
|
Ω
|
p
−
q
p
∥
∇
v
∥
L
p
(
Ω
)
q
−
c
˜
1
∥
∇
v
∥
L
p
(
Ω
)
α
+
1
,
∀
v
∈
X
n
,
with a constant
c
˜
1
>
0
. Using that
p
>
q
,
p
>
α
and
c
0
<
1
we conclude that
〈
A
n
(
v
)
,
v
〉
≥
0
whenever
v
∈
X
n
with
∥
∇
v
∥
L
p
(
Ω
)
=
R
provided
R
>
0
is sufficiently large. Lemma 2.6 can thus be applied for
X
=
X
n
and
A
=
A
n
. Therefore, there exists
u
n
∈
X
n
solving the equation
A
n
(
u
n
)
=
0
, which is just (4). The proof is complete.□
Corollary 3.2
Assume that conditions
(
H
1
)
–
(
H
2
)
are fulfilled. Then the sequence
{
u
n
}
n
≥
1
, with
u
n
∈
X
n
constructed in Proposition 3.1, is bounded in
W
0
1
,
p
(
Ω
)
.
Proof
Insert
v
=
u
n
in (4). Through hypothesis
(
H
2)
, Hölder’s inequality and Sobolev embedding theorem, it gives
∇
u
n
L
p
(
Ω
)
p
=
∇
u
n
L
q
(
Ω
)
q
+
∫
Ω
f
(
x
,
v
,
∇
u
n
)
u
n
d
x
≤
|
Ω
|
p
−
q
p
∇
u
n
L
p
(
Ω
)
q
+
c
0
∇
u
n
L
p
(
Ω
)
p
+
c
˜
1
∇
u
n
L
p
(
Ω
)
α
+
1
,
with a constant
c
˜
1
>
0
, or
(
1
−
c
0
)
∇
u
n
L
p
(
Ω
)
p
≤
|
Ω
|
p
−
q
p
∇
u
n
L
p
(
Ω
)
q
+
c
˜
1
∇
u
n
L
p
(
Ω
)
α
+
1
.
Recalling that
p
>
q
,
p
>
α
and
c
0
<
1
we achieve the desired conclusion.□
4 Existence of generalized solutions
The statement below constitutes our existence result for generalized solutions to problem (1).
Theorem 4.1
Assume that conditions
(
H
1
)
–
(
H
2
)
hold. Then there exists a generalized solution to problem (1) in the sense of Definition 2.3.
Proof
By Corollary 3.2, we know that the sequence
{
u
n
}
n
≥
1
constructed in Proposition 3.1 is bounded in
W
0
1
,
p
(
Ω
)
. Since the space
W
0
1
,
p
(
Ω
)
is reflexive, along a relabeled subsequence we have that
(5)
u
n
⇀
u
in
W
0
1
,
p
(
Ω
)
for some
u
∈
W
0
1
,
p
(
Ω
)
.
From estimate (3) we infer that the Nemytskii operator
N
f
:
W
0
1
,
p
(
Ω
)
→
W
−
1
,
p
′
(
Ω
)
is bounded (in the sense that it maps bounded sets into bounded sets). Taking into account (5) it holds
(6)
{
N
f
(
u
n
)
}
n
≥
1
is
a
bounded
sequence
in
W
−
1
,
p
′
(
Ω
)
.
Since
−
Δ
p
+
Δ
q
:
W
0
1
,
p
(
Ω
)
→
W
−
1
,
p
′
(
Ω
)
is also a bounded operator, by (6) it follows that the sequence
{
−
Δ
p
u
n
+
Δ
q
u
n
−
N
f
(
u
n
)
}
n
≥
1
is bounded in
W
−
1,
p
′
(
Ω
)
. Thanks to the reflexivity of
W
−
1
,
p
′
(
Ω
)
, we can pass to a relabeled subsequence finding that
(7)
−
Δ
p
u
n
+
Δ
q
u
n
−
N
f
(
u
n
)
⇀
η
in
W
−
1
,
p
′
(
Ω
)
for some
η
∈
W
−
1
,
p
′
(
Ω
)
.
Let
v
∈
⋃
n
≥
1
X
n
. There is an integer
m
≥
1
such that
v
∈
X
m
. Applying Proposition 3.1, we see that equality (4) holds true for all
n
≥
m
. Letting
n
→
∞
in (4) entails
〈
η
,
v
〉
=
0
for
all
v
∈
⋃
n
≥
1
X
n
.
We deduce that
η
=
0
because
⋃
n
≥
1
X
n
is dense in
W
0
1
,
p
(
Ω
)
(see requirement (iii) in the definition of Galerkin basis in Section 3). Consequently, (7) becomes
(8)
−
Δ
p
u
n
+
Δ
q
u
n
−
N
f
(
u
n
)
⇀
0
in
W
−
1
,
p
′
(
Ω
)
.
Set
v
=
u
n
in (4), which provides
(9)
∇
u
n
L
p
(
Ω
)
p
=
∇
u
n
L
q
(
Ω
)
q
+
∫
Ω
f
(
x
,
u
n
(
x
)
,
∇
u
n
(
x
)
)
u
n
(
x
)
d
x
,
∀
n
≥
1
.
On the other hand, by (8) we get
(10)
〈
−
Δ
p
u
n
+
Δ
q
u
n
−
N
f
(
u
n
)
,
u
〉
→
0
as
n
→
∞
.
Combining (9) and (10) it turns out
(11)
lim
n
→
∞
〈
−
Δ
p
u
n
+
Δ
q
u
n
−
N
f
(
u
n
)
,
u
n
−
u
〉
=
0
.
If we gather (5), (8) and (11), we obtain that
u
∈
W
0
1
,
p
(
Ω
)
is a generalized solution to problem (1) in the sense of Definition 2.3. The proof is thus complete.□
Next we state our second existence result.
Theorem 4.2
Assume that conditions
(
H
1
)
'
–
(
H
2
)
hold. Then there exists a strong generalized solution to problem (1) in the sense of Definition 2.5.
Proof
In view of Remark 2.4 we are allowed to use all the formulas in the proof of Theorem 4.1. By
(
H
1
)
′
we are able to write
∫
Ω
f
(
x
,
u
n
,
∇
u
n
)
(
u
n
−
u
)
d
x
≤
∫
Ω
|
f
(
x
,
u
n
,
∇
u
n
)
|
|
u
n
−
u
|
d
x
≤
∫
Ω
σ
(
x
)
+
c
1
|
u
n
|
p
⁎
r
′
1
+
c
2
∇
u
n
p
r
′
2
|
u
n
−
u
|
d
x
.
Through the preceding estimate, in conjunction with Hölder’s inequality, we arrive at
(12)
∫
Ω
f
(
x
,
u
n
,
∇
u
n
)
(
u
n
−
u
)
d
x
≤
∥
σ
∥
L
r
′
(
Ω
)
∥
u
n
−
u
∥
L
r
(
Ω
)
+
c
1
∥
u
n
∥
L
p
⁎
(
Ω
)
p
⁎
r
′
1
∥
u
n
−
u
∥
L
r
1
(
Ω
)
+
c
2
∇
u
n
L
p
(
Ω
)
p
r
′
2
∥
u
n
−
u
∥
L
r
2
(
Ω
)
,
∀
n
≥
1
.
The boundedness of
{
u
n
}
n
≥
1
in
W
0
1
,
p
(
Ω
)
(see (5)) implies that
{
u
n
}
n
≥
1
is bounded in
L
p
⁎
(
Ω
)
and
{
∇
u
n
}
n
≥
1
is bounded in
(
L
p
(
Ω
)
)
N
. Then (12) renders
(13)
∫
Ω
f
(
x
,
u
n
,
∇
u
n
)
(
u
n
−
u
)
d
x
≤
M
(
∥
u
n
−
u
∥
L
r
(
Ω
)
+
∥
u
n
−
u
∥
L
r
1
(
Ω
)
+
∥
u
n
−
u
∥
L
r
2
(
Ω
)
)
,
∀
n
≥
1
,
with a constant
M
>
0
.
By the Rellich-Kondrachov theorem we know that
r
∈
[
1
,
p
⁎
)
,
r
1
∈
[
1
,
p
⁎
)
,
r
2
∈
[
1
,
p
)
in
(
H
1
)
′
and (5) ensure the strong convergence
u
n
→
u
in
L
r
(
Ω
)
,
L
r
1
(
Ω
)
and
L
r
2
(
Ω
)
as
n
→
∞
. Then from (13) we derive
(14)
lim
n
→
∞
∫
Ω
f
(
x
,
u
n
,
∇
u
n
)
(
u
n
−
u
)
d
x
=
0
.
On the basis of (11) and (14) we find that
(15)
lim
n
→
∞
〈
−
Δ
p
u
n
+
Δ
q
u
n
,
u
n
−
u
〉
=
0
.
Altogether (5), (8) and (15) show that u is a strong generalized solution to equation (1), thus completing the proof.□
Finally, we note that contrary to what happens for problem (1), our notion of strong generalized solution in the case of the problem
(16)
−
Δ
p
u
−
Δ
q
u
=
f
(
x
,
u
,
∇
u
)
in
Ω
,
u
=
0
on
∂
Ω
coincides with the classical notion of weak solution. Specifically, under hypothesis
(
H
1
)
′
, a function
u
∈
W
0
1
,
p
(
Ω
)
is by definition a strong generalized solution to problem (16) if there exists a sequence
{
u
n
}
n
≥
1
in
W
0
1
,
p
(
Ω
)
such that
u
n
⇀
u
in
W
0
1
,
p
(
Ω
)
as
n
→
∞
,
(17)
−
Δ
p
u
n
−
Δ
q
u
n
−
f
(
⋅
,
u
n
(
⋅
)
,
∇
u
n
(
⋅
)
)
⇀
0
in
W
−
1
,
p
′
(
Ω
)
as
n
→
∞
and
(18)
lim
n
→
∞
〈
−
Δ
p
u
n
−
Δ
q
u
n
,
u
n
−
u
〉
=
0
.
We claim that
u
∈
W
0
1
,
p
(
Ω
)
is a strong generalized solution to problem (16) if and only if it is a weak solution to problem (16), that is,
(19)
〈
−
Δ
p
u
−
Δ
q
u
,
v
〉
=
∫
Ω
f
(
x
,
u
(
x
)
,
∇
u
(
x
)
)
v
(
x
)
d
x
for
all
v
∈
W
0
1
,
p
(
Ω
)
.
Indeed, if
u
∈
W
0
1
,
p
(
Ω
)
is a weak solution to problem (16), then posing
u
n
=
u
it is clear that u is a strong generalized solution to problem (16). Conversely, assume that
u
∈
W
0
1
,
p
(
Ω
)
is a strong generalized solution to problem (16). Hence, there exists a sequence
u
n
⇀
u
in
W
0
1
,
p
(
Ω
)
as
n
→
∞
for which (17) and (18) hold. From (18), the monotonicity of
−
Δ
q
and the weak convergence
u
n
⇀
u
in
W
0
1
,
p
(
Ω
)
it follows that
lim
sup
n
→
∞
〈
−
Δ
p
u
n
,
u
n
−
u
〉
≤
lim
n
→
∞
〈
−
Δ
p
u
n
−
Δ
q
u
n
,
u
n
−
u
〉
=
0
.
As the operator
−
Δ
p
on
W
0
1
,
p
(
Ω
)
fulfills the
(
S
+
)
-property (see, e.g., [4, p. 45]), we infer the strong convergence
u
n
→
u
in
W
0
1
,
p
(
Ω
)
. Then the continuity of the operators
−
Δ
p
:
W
0
1
,
p
(
Ω
)
→
W
−
1
,
p
′
(
Ω
)
,
−
Δ
q
:
W
0
1
,
q
(
Ω
)
→
W
−
1
,
q
′
(
Ω
)
and
N
f
:
W
0
1
,
p
(
Ω
)
→
W
−
1
,
p
′
(
Ω
)
enables us to deduce from (17) the validity of (19), thus u is a weak solution to problem (16).
Remark 4.3
Proceeding as in the proof of Theorem 4.2 one obtains under Assumptions
(
H
1
)
′
–
(
H
2
)
that there exists a strong generalized solution to problem (16). Thereby, in view of what has been said in the preceding comments, under Assumptions
(
H
1
)
′
–
(
H
2
)
there exists a weak solution to problem (16).
