Global and blow-up solutions for quasilinear parabolic equations with a gradient term and nonlinear boundary flux

This work is concerned with positive classical solutions for a quasilinear parabolic equation with a gradient term and nonlinear boundary flux. We find sufficient conditions for the existence of global and blow-up solutions. Moreover, an upper bound for the ‘blow-up time’, an upper estimate of the ‘blow-up rate’ and an upper estimate of the global solution are given. Finally, some application examples are presented.

MSC:35R45, 35K65, 34A12.

In this paper, we consider the quasilinear parabolic equation with a gradient term

subject to the nonlinear boundary flux and initial conditions

Here $D\subset {\mathbb{R}}^N$ ($N\ge 1$) is a bounded domain with a smooth boundary ∂D, $\overline{D}$ is the closure of D, $q={|\mathrm{\nabla }u|}^2$, n is the outer normal vector and T is the maximum existence time of $u(x,t)$. $a(u)b(x)c(t)$, $f(x,u,q,t)$ and $h(x,t)r(u)$ are nonlinear diffusion coefficient, reaction term and boundary flux, respectively. Let ${\mathbb{R}}^{+}=(0,+\mathrm{\infty })$, $\overline{{\mathbb{R}}^{+}}=[0,+\mathrm{\infty })$, and suppose that the function $g(s)\in C^2({\mathbb{R}}^{+})$, $g^{\prime }(s)>0$ for any $s>0$, $a(s)\in C^2({\mathbb{R}}^{+})$, $b(x)\in C^1(\overline{D})$, $c(t)\in C^1({\mathbb{R}}^{+})$, $f(x,u,q,t)\in C^1(\overline{D}\times {\mathbb{R}}^{+}\times \overline{{\mathbb{R}}^{+}}\times \overline{{\mathbb{R}}^{+}})$ is a nonnegative function, $h(x,t)\in C^1(\overline{D}\times (0,T))$, $r(s)\in C^2({\mathbb{R}}^{+})$ is a positive function, and the positive function $u_0(x)\in C^2(\overline{D})$ satisfies the compatibility conditions. Under these assumptions, the classical parabolic equation theory [[1], Section 3] ensures that there exists a unique classical solution $u(x,t)$ to problem (1.1)-(1.3) for some $T>0$, and the solution is positive over $\overline{D}\times [0,T)$. Moreover, by the regularity theorem [[2], Chapter 3], we know $u\in C^3(D\times (0,T))\cap C^2(\overline{D}\times (0,T))$.

Equation (1.1) describes the diffusion of concentration of some Newtonian fluids through porous media or the density of some biological species in many physical phenomena and combustion theories (see [3, 4]). The nonlinear Neumann boundary value condition (1.2) can be physically interpreted as the nonlinear radial law (see, e.g., [5, 6]).

In recent years the questions like blow-up and global solvability for nonlinear evolution equations have been investigated extensively by many authors. In particular, for the parabolic equations with a gradient term, we refer to [7–12]etc. For example, Souplet and Weissler [7] studied the semilinear parabolic equation

subject to the homogeneous Dirichlet boundary condition. By using the comparison principle and constructing a self-similar lower solution, they obtained sufficient conditions for global existence and blow-up solutions. Andreu [8] used a similar method to study the quasilinear parabolic equation

Chen [9] considered the following semilinear parabolic equation:

with the homogeneous Dirichlet boundary condition. By estimating the integral of ratio of one solution to the other, the author proved both global existence and blow-up results. Then he used the same method to study a more generalized equation with a gradient term, see [10].

For the nonlinear parabolic equations with Neumann boundary conditions, Lair and Oxley [11] considered the quasilinear parabolic equation without a gradient term

subject to the homogeneous Neumann boundary conditions, and they obtained the necessary and sufficient conditions for the global existence and blow-up solution by the approximation method. Recently, Ding and Gao [12] investigated an initial boundary value problem of the quasilinear parabolic equation with a gradient term

subject to boundary flux $\frac{\partial u}{\partial n}=r(u)$, and they obtained sufficient conditions for the global existence and blow-up solution, the upper estimate of global solution and blow-up time.

Motivated by the above works, we construct an appropriate auxiliary function and use the Hopf maximum principle to study problem (1.1)-(1.3). The aim of this paper is to obtain sufficient conditions for the existence of blow-up and global solution, an upper bound for the ‘blow-up time’, an upper estimate of the ‘blow-up rate’ and an upper estimate of the global solution and then to give some examples.

We now state and prove the main results of this paper. Firstly, we give sufficient conditions of the existence of a blow-up solution of problem (1.1)-(1.3).

Theorem 1 Let $u\in C^3(D\times (0,T))\cap C^2(\overline{D}\times (0,T))$ be a solution of problem (1.1)-(1.3). Assume that the following conditions hold:

1. (1)

   For any $(x,s,q,t)\in \overline{D}\times \mathbb{R}\times {\mathbb{R}}^{+}\times {\mathbb{R}}^{+}$,

   $$a(s)>0,b(x)>0,c(t)>0,r(s)>0,h(x,t)\ge 0;$$

   (2.1)
2. (2)

   For any $(x,s,q,t)\in \overline{D}\times {\mathbb{R}}^{+}\times {\mathbb{R}}^{+}\times {\mathbb{R}}^{+}$,

   $$\begin{array}{r}{a}^{\prime }(s)\ge 0,h_t(x,t)\ge 0,f_q\ge 0,{\left(\frac{a(s)}{g^{\prime }(s)}\right)}^{\prime }\ge 0,r^{\prime }(s)\ge \frac{a^{\prime }(s)}{a(s)}r(s),\\ r^{″}(s)\ge \frac{a^{\prime }(s)}{a(s)}{r}^{\prime }(s),\end{array}$$

   (2.2)
   $$\begin{array}{r}{c}^{\prime }(t)\ge 0,g^{\prime }(s)>0,f_t(x,s,q,t)\ge \frac{c^{\prime }(t)}{c(t)}f(x,s,q,t),\\ f_s(x,s,q,t)\ge \frac{r^{\prime }(s)}{r(s)}f(x,s,q,t);\end{array}$$

   (2.3)
3. (3)

   For any $x\in \{x\mid f(x,u_0,q_0,0)=0,x\in \overline{D}\}$,

   $$\mathrm{\nabla }(a(u_0)b(x)c(0)\mathrm{\nabla }{u}_0)\ge 0;$$

   (2.4)
4. (4)

   The constant

   $$\beta =\underset{D_1}{min}\left\{\frac{a(u_0)}{g^{\prime }(u_0)r(u_0)}[\mathrm{\nabla }(a(u_0)b(x)c(0)\mathrm{\nabla }{u}_0)+f(x,u_0,q_0,0)]\right\}>0,$$

   (2.5)

where $D_1=\{x\mid f(x,u_0,q_0,0)\ne 0,x\in \overline{D}\}\ne \varphi$, $q_0={|\mathrm{\nabla }{u}_0|}^2$;

1. (5)

   The integration

   $${\int }_{M_0}^{+\mathrm{\infty }}\frac{a(s)}{r(s)}ds<+\mathrm{\infty },\mathit{\text{where }}{M}_0=\underset{\overline{D}}{max}{u}_0(x);$$

   (2.6)

then the solution $u(x,t)$ of system (1.1)-(1.3) must blow up in finite time T and

where $\mathrm{\Phi }(z)={\int }_z^{+\mathrm{\infty }}\frac{a(s)}{r(s)}ds$, $z>0$, and ${\mathrm{\Phi }}^{-1}$ is the inverse function of Φ.

Proof Consider the auxiliary function

We find that

and

Hence, from (2.11) and (2.12) we have

Using (2.10) leads to

Now substituting (2.14) into (2.13) yields

In fact, from (1.1) we see that

Thus combining (2.15) and (2.16), we arrive at

In view of (2.9), we have

If we substitute (2.18) into (2.17), then it is easy to obtain

From assumptions (2.1)-(2.3), it follows that the right-hand side of (2.19) is nonnegative, i.e.,

Then from (2.4) and (2.5) we have

And as we can see, an explicit calculation

holds on $\partial D\times (0,T)$. Thus, by combining (2.20)-(2.22) and using the Hopf maximum principle, we find that the maximum of Ψ on $\partial D\times (0,T)$ is 0, i.e.,

and by (2.9), it gives

Integrating (2.23) over $[0,t]$ at the point $x_0\in \overline{D}$, where $u_0(x_0)=M_0$, yields

This together with assumption (2.6) shows that $u(x,t)$ must blow up in finite time T; moreover,

For each fixed x, integrating inequality (2.23) over $[t,s]$ ($0<t<s<T$) leads to

If we let $s\to T$, then formally

therefore

The proof is completed. □

The result on the global solution is stated as Theorem 2 below.

Theorem 2 Let $u\in C^3(D\times (0,T))\cap C^2(\overline{D}\times (0,T))$ be a solution of problem (1.1)-(1.3). Assume that the following conditions hold:

1. (1)

   For any $(x,s,q,t)\in \overline{D}\times \mathbb{R}\times {\mathbb{R}}^{+}\times {\mathbb{R}}^{+}$,

   $$a(s)>0,b(x)>0,c(t)>0,r(s)>0,h(x,t)\ge 0;$$

   (2.26)
2. (2)

   For any $(x,s,q,t)\in \overline{D}\times {\mathbb{R}}^{+}\times {\mathbb{R}}^{+}\times {\mathbb{R}}^{+}$,

   $$\begin{array}{r}{a}^{\prime }(s)\le 0,h_t(x,t)\le 0,f_q\le 0,{\left(\frac{a(s)}{g^{\prime }(s)}\right)}^{\prime }\le 0,\\ r^{\prime }(s)\ge \frac{a^{\prime }(s)}{a(s)}r(s),r^{″}(s)\le \frac{a^{\prime }(s)}{a(s)}{r}^{\prime }(s),\end{array}$$

   (2.27)
   $$\begin{array}{r}{c}^{\prime }(t)\le 0,g^{\prime }(s)>0,f_t(x,s,q,t)\le \frac{c^{\prime }(t)}{c(t)}f(x,s,q,t),\\ f_s(x,s,q,t)\le \frac{r^{\prime }(s)}{r(s)}f(x,s,q,t);\end{array}$$

   (2.28)
3. (3)

   For any $x\in \{x\mid f(x,u_0,q_0,0)=0,x\in \overline{D}\}$,

   $$\mathrm{\nabla }(a(u_0)b(x)c(0)\mathrm{\nabla }{u}_0)\ge 0;$$

   (2.29)
4. (4)

   The constant

   $$\alpha =\underset{D_1}{max}\left\{\frac{a(u_0)}{g^{\prime }(u_0)r(u_0)}[\mathrm{\nabla }(a(u_0)b(x)c(0)\mathrm{\nabla }{u}_0)+f(x,u_0,q_0,0)]\right\}>0,$$

   (2.30)

where $D_1=\{x\mid f(x,u_0,q_0,0)=0,x\in \overline{D}\}\ne \varphi$, $q_0={|\mathrm{\nabla }{u}_0|}^2$;

1. (5)

   The integration

   $${\int }_{m_0}^{+\mathrm{\infty }}\frac{a(s)}{r(s)}ds<+\mathrm{\infty },\mathit{\text{where }}{m}_0=\underset{\overline{D}}{min}{u}_0(x);$$

   (2.31)

then the solution $u(x,t)$ of system (1.1)-(1.3) must be a global solution and

where $\mathrm{\Psi }(z)={\int }_{m_0}^z\frac{a(s)}{r(s)}ds$, $z>0$, and ${\mathrm{\Psi }}^{-1}$ is the inverse function of Ψ.

Proof Consider the auxiliary function

We first replace Ψ and β in (2.20) with Φ and α, respectively, and under assumptions (2.26)-(2.28), we get

In fact, from (2.29) and (2.30) we can see that

Also, on $\partial D\times (0,T)$, it gives

By combining (2.34)-(2.36) and using the Hopf maximum principle, we find that the minimum of Φ on $\partial D\times (0,T)$ is 0, i.e.,

and by (2.33), we can see that

For each fixed x, integrating (2.37) over $[0,t]$ yields

This together with assumption (2.31) shows that $u(x,t)$ must be a global solution; moreover,

therefore

The proof is completed. □

In what follows, we present several examples to demonstrate the applications of Theorems 1 and 2.

Example 1 Let u be a solution of

where $D=\{x=(x_1,x_2,x_3)\mid {\sum }_{i=1}^3{x}_i^2<1\}$, then we have

It is easy to verify that (2.1)-(2.4) hold. By (2.5), we find

It follows from Theorem 1 that $u(x,t)$ must blow up in finite time T and

and

Example 2 Let u be a solution of

where $D=\{x=(x_1,x_2,x_3)\mid {\sum }_{i=1}^3{x}_i^2<1\}$, then we have

It is easy to verify that (2.26)-(2.29) hold. By (2.30), we find

It follows from Theorem 2 that $u(x,t)$ must be a global solution and

This work is supported by the Natural Science Foundation of Shandong Province of China (ZR2012AM018) and the Fundamental Research Funds for the Central Universities (No. 201362032). The authors would like to deeply thank all the reviewers for their insightful and constructive comments.

Authors and Affiliations

1. School of Mathematical Sciences, Ocean University of China, Qingdao, 266100, P.R. China

   Changjun Li, Lu Sun & Zhong Bo Fang

Corresponding author

Correspondence to Zhong Bo Fang.

Competing interests

The authors declare that they have no competing interests.

Authors’ contributions

All authors contributed equally to the manuscript and read and approved the final manuscript.

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