Purpose – The purpose of this paper is to investigate beliefs about and attitudes toward online advertising (ATOA) among Chinese consumers and the relationship between belief factors, ATOA, and consumers' behavioral responses to online advertising.Design/methodology/approach – Data were collected from students of a large metropolitan university in China. A total of 202 questionnaires provided usable data and were analyzed using AMOS.Findings – Five belief factors that underlie Chinese consumers' ATOA were identified: entertainment, information seeking, credibility, economy, and value corruption. Information seeking, economy and value corruption were significant predictors of ATOA. ATOA was found to be a significant positive predictor of ad clicking and online shopping frequency.Practical implications – Global marketers would benefit from understanding how consumers from a booming emerging market perceive the internet as a source of advertising. Thus, the study will enable businesses and organizations to u...

Examining beliefs and attitudes toward online advertising among Chinese consumers

Existence of positive solutions for a class of p&q elliptic problems with critical growth on RN

Generalized eigenvalue problems for (p,q)-Laplacian with indefinite weight

In this paper, our main purpose is to establish the existence of multiple solutions of a p – q -Laplacian equation with convex and Sobolev critical nonlinearity by some standard variational methods, whose key is to construct homotopies between Ω and levels of the functional I θ , and some analytical techniques.

Multiplicity of positive solutions to a p–q-Laplacian equation involving critical nonlinearity

Existence of least energy positive, negative and nodal solutions for a class of p&q-problems with potentials vanishing at infinity

The nonlinear elliptic eigenvalue problem
 , where
 and
 are studied. The key ingredient is a special constrained minimization method.

/pdf/a-class-of-laplacian-type-equation-with-potentials-3gonj9b14x.pdf

A Class of --Laplacian Type Equation with Potentials Eigenvalue Problem in

We consider the problem
 where
 is not identically zero. Under the condition that
 satisfies (H), we show that there exists
 such that the above-mentioned equation admits at least one solution for all
 . This extends the results of Laplace equation to the case of
 -Laplace equation.

/pdf/entire-bounded-solutions-for-a-class-of-quasilinear-elliptic-9q3pdozdfo.pdf

Entire Bounded Solutions for a Class of Quasilinear Elliptic Equations

This paper is devoted to studying a nonlocal parabolic equation with logarithmic nonlinearity $u\log |u|-\fint_{\Omega } u\log |u|\,dx$
 in a bounded domain, subject to homogeneous Neumann boundary value condition. By using the logarithmic Sobolev inequality and energy estimate methods, we get the results under appropriate conditions on blow-up and non-extinction of the solutions, which extend some recent results.

/pdf/blow-up-and-non-extinction-for-a-nonlocal-parabolic-equation-25sebscens.pdf

Blow-up and non-extinction for a nonlocal parabolic equation with logarithmic nonlinearity

The existence of at least three weak solutions is established for a class of quasilinear elliptic systems involving the p(x)-Laplace operator with Neumann boundary condition. The technical approach is mainly based on a three critical points theorem due to Ricceri. MSC: 35D05; 35J60; 58E05.

/pdf/three-solutions-for-a-class-of-quasilinear-elliptic-systems-2gd1to3j0s.pdf

Three solutions for a class of quasilinear elliptic systems involving the p(x)-Laplace operator

In this paper, we deal with the following quasilinear attraction–repulsion model: $$ \textstyle\begin{cases} u_{t}=\nabla \cdot (D(u)\nabla u)-\nabla \cdot ( S(u)\chi (v)\nabla v)+ \nabla \cdot ( F(u)\xi (w)\nabla w)+f(u), &x\in \varOmega , t>0, \\ v_{t}=\Delta v+\beta u-\alpha v, &x\in \varOmega ,t>0, \\ 0=\Delta w+\gamma u-\delta w, &x\in \varOmega , t>0, \\ u(x,0)=u_{0}(x), \quad\quad v(x,0)= v_{0}(x), &x\in \varOmega \end{cases} $$
 with homogeneous Neumann boundary conditions in a smooth bounded domain $\varOmega \subset R^{n}$
 (
 $n\geq 2$
 ). Let the chemotactic sensitivity $\chi (v)$
 be a positive constant, and let the chemotactic sensitivity $\xi (w)$
 be a nonlinear function. Under some assumptions, we prove that the system has a unique globally bounded classical solution.

/pdf/boundedness-in-a-quasilinear-attraction-repulsion-chemotaxis-2hc5jvwzr9.pdf

Zuodong Yang

Papers

A Class of --Laplacian Type Equation with Potentials Eigenvalue Problem in

Entire Bounded Solutions for a Class of Quasilinear Elliptic Equations

Blow-up and non-extinction for a nonlocal parabolic equation with logarithmic nonlinearity

Three solutions for a class of quasilinear elliptic systems involving the p(x)-Laplace operator

Boundedness in a quasilinear attraction–repulsion chemotaxis system with nonlinear sensitivity and logistic source