In this paper, the existence and nonexistence of nonnegative entire large solutions for the quasilinear elliptic equation are established, where , and are nondecreasing and vanish at the origin. The locally H lder con...In this paper, the existence and nonexistence of nonnegative entire large solutions for the quasilinear elliptic equation are established, where , and are nondecreasing and vanish at the origin. The locally H lder continuous functions and are nonnegative. We extend results previously obtained for special cases of and g.展开更多
In this paper, we show the existence and nonexistence of entire positive solutions for a class of singular elliptic system We have that entire large positive solutions fail to exist if f and g are sublinear and b and ...In this paper, we show the existence and nonexistence of entire positive solutions for a class of singular elliptic system We have that entire large positive solutions fail to exist if f and g are sublinear and b and d have fast decay at infinity. However, if f and g satisfy some growth conditions at infinity, and b, d are of slow decay or fast decay at infinity, then the system has infinitely many entire solutions, which are large or bounded.展开更多
In this paper, we are concerned with positive entire solutions to elliptic equations of the form Δu+ f(x,u)= 0 x∈ RN N ≥ 3 where u →f(x,u) is not assumed to be regular near u = 0 and f(x,u) may be more general in...In this paper, we are concerned with positive entire solutions to elliptic equations of the form Δu+ f(x,u)= 0 x∈ RN N ≥ 3 where u →f(x,u) is not assumed to be regular near u = 0 and f(x,u) may be more general involving both singular and sublinear terms. Some sufficient conditions are given with the aid of the barrier method and ODE approach, which guarantee the existence of positive entire solutions that tend to any sufficiently large constants arbitrarily prescribed in advance.展开更多
In this paper, the existence of positive solutions for a class of quasilinear elliptic differential equation systems are established by Schauder-TychonofF fixed point theorem.
We consider the elliptic system △u = p(|x|)u^av^b,△v=q(|x|)u^cv^d on R^n (n≥3) where a, b, c, d are nonnegative constants with max{a,d}≤ 1, and the functions p and q are nonnegative, continuous, and the support of...We consider the elliptic system △u = p(|x|)u^av^b,△v=q(|x|)u^cv^d on R^n (n≥3) where a, b, c, d are nonnegative constants with max{a,d}≤ 1, and the functions p and q are nonnegative, continuous, and the support of min{p(r),q(r)} is not compact. We establish conditions on p and q, along with the exponents a, bf c, d, which ensure the existence of a positive entire solution satisfying lim|x|→∞u(x)=lim|x|→∞v (x)=∞.展开更多
In this note, we consider positive entire large solutions for semilinear elliptic equations Au = p(x)f(u) in R^N with N ≥ 3. More precisely, we are interested in the link between the existence of entire large sol...In this note, we consider positive entire large solutions for semilinear elliptic equations Au = p(x)f(u) in R^N with N ≥ 3. More precisely, we are interested in the link between the existence of entire large solution with the behavior of solution for --△u = p(x) in R^N. Especially for the radial case, we try to give a survey of all possible situations under Keller-Osserman type conditions.展开更多
We study positive solutions to the fractional semi-linear elliptic equation(−∆)σu=K(x)u n+2σn−2σin B2\{0}with an isolated singularity at the origin,where K is a positive function on B2,the punctured ball B2\{0}⊂Rn ...We study positive solutions to the fractional semi-linear elliptic equation(−∆)σu=K(x)u n+2σn−2σin B2\{0}with an isolated singularity at the origin,where K is a positive function on B2,the punctured ball B2\{0}⊂Rn with n>2,σ∈(0,1),and(−∆)σis the fractional Laplacian.In lower dimensions,we show that for any K∈C1(B2),a positive solution u always satisfies that u(x)6 C|x|−(n−2σ)/2 near the origin.In contrast,we construct positive functions K∈C1(B2)in higher dimensions such that a positive solution u could be arbitrarily large near the origin.In particular,these results also apply to the prescribed boundary mean curvature equations on B n+1.展开更多
We consider the problem of whether the equation △u = p(x)f(u) on RN, N ≥ 3, has a positive solution for which lim |x|→∞(x) = ∞ where f is locally Lipschitz continuous, positive, and nondecreasing on (0,o...We consider the problem of whether the equation △u = p(x)f(u) on RN, N ≥ 3, has a positive solution for which lim |x|→∞(x) = ∞ where f is locally Lipschitz continuous, positive, and nondecreasing on (0,oo) and satisfies ∫1∞[F (t)]^- 1/2dt = ∞ where F(t) = ∫0^tf(s)ds. The nonnegative function p is assumed to be asymptotically radial in a certain sense. We show that a sufficient condition to ensure such a solution u exists is that p satisfies ∫0∞ r min|x|=r P (x) dr = ∞. Conversely, we show that a necessary condition for the solution to exist is that p satisfies ∫0∞r1+ε min |x|=rp(x)dr =∞ for all ε〉0.展开更多
In this paper, the nonexistence of positive entire solutions for div(|Du| p-2 Du)q(x)f(u),x∈R N, is established, where p】1,Du=(D 1u,...,D Nu),q∶R N→(0,∞) and f∶(0,∞)→(0,∞) are continuous fun...In this paper, the nonexistence of positive entire solutions for div(|Du| p-2 Du)q(x)f(u),x∈R N, is established, where p】1,Du=(D 1u,...,D Nu),q∶R N→(0,∞) and f∶(0,∞)→(0,∞) are continuous functions.展开更多
By using Karamata regular variation theory and upper and lower solution method,we investigate the existence and the global asymptotic behavior of large solutions to a class of semilinear elliptic equations with nonlin...By using Karamata regular variation theory and upper and lower solution method,we investigate the existence and the global asymptotic behavior of large solutions to a class of semilinear elliptic equations with nonlinear convection terms.In our study,the weight and nonlinearity are controlled by some regularly varying functions or rapid functions,which is very different from the conditions of previous contexts.Our results largely extend the previous works,and prove that the nonlinear convection terms do not affect the global asymptotic behavior of classical solutions when the index of the convection terms change in a certain range.展开更多
This paper is concerned with exact boundary behavior of large solutions to semilinear elliptic equations △u=b(x)f(u)(C0+|▽u|q),x∈Ω,where Ω is a bounded domain with a smooth boundary in RN,C0≥0,q E [0,2),b∈Cloc...This paper is concerned with exact boundary behavior of large solutions to semilinear elliptic equations △u=b(x)f(u)(C0+|▽u|q),x∈Ω,where Ω is a bounded domain with a smooth boundary in RN,C0≥0,q E [0,2),b∈Clocα(Ω) is positive in but may be vanishing or appropriately singular on the boundary,f∈C[0,∞),f(0)=0,and f is strictly increasing on [0,∞)(or f∈C(R),f(s)> 0,■s∈R,f is strictly increasing on R).We show unified boundary behavior of such solutions to the problem under a new structure condition on f.展开更多
We establish the existence, uniqueness and the blow-up rate of the large positive solution of the quasi-linear elliptic problem -△pu=λ(x)u^θ-1-b(x)h(u), in Ω,with boundary condition u = +∞ on δΩ, where ...We establish the existence, uniqueness and the blow-up rate of the large positive solution of the quasi-linear elliptic problem -△pu=λ(x)u^θ-1-b(x)h(u), in Ω,with boundary condition u = +∞ on δΩ, where Ω R^N (N≥2) is a smooth bounded domain, 1 〈 p 〈∞ λ(·) and b(·) are positive weight functions and h(u) ~ uq-1 as u → ∞. Our results extend the previous work [Z. Xie, J. Diff. Equ., 247 (2009), 344-363] from case p = 2, λ is a constant and θ = 2 to case 1 〈 p 〈∞, A is a function and 1 ( 0 〈 θ 〈q 〉 p); and also extends the previous work [Z. Xie, C. Zhao, J. Diff. Equ., 252 (2012), 1776-1788], from case A is a constant and θ = p to case λ is a function and 1 〈 θ 〈 q ( 〉 p). Moreover, we remove the assumption of radial symmetry of the problem and we do not require h(·) is increasing.展开更多
By the Schauder-Tychonoff fixed-point theorem, we inyestigate the existence and asymptotic behavior of positive radial solutions of fully nonlinear elliptic equations in Re. We give some sufficient conditions to guara...By the Schauder-Tychonoff fixed-point theorem, we inyestigate the existence and asymptotic behavior of positive radial solutions of fully nonlinear elliptic equations in Re. We give some sufficient conditions to guarantee the existence of bounded and unbounded radial solutions and consider the nonexistence of positive solution in Rn.展开更多
The existence ofpositive radialsolutions ofthe equation - div(|Du|p- 2Du)= f(u) is studied in annular dom ains in Rn,n≥2. Itisproved thatiff(0)≥0, f is somewhere negativein (0,∞), lim u→0+ f′(u)= 0and lim u→...The existence ofpositive radialsolutions ofthe equation - div(|Du|p- 2Du)= f(u) is studied in annular dom ains in Rn,n≥2. Itisproved thatiff(0)≥0, f is somewhere negativein (0,∞), lim u→0+ f′(u)= 0and lim u→∞(f(u)/up- 1)= ∞, then thereisa largepositiveradialsolution on allannuli.Iff(0)< 0 and satisfiescertain condi- tions, then the equation has no radialsolution ifthe annuliare too wide.展开更多
In this paper, we study the existence of positive entire large and bounded radial positive solutions for the following nonlinear system {Sk1(λ(D2u1))+a1(|x|)|△u1|k1=p1(|x|)f1(u2) for x∈RN,Sk2(λ...In this paper, we study the existence of positive entire large and bounded radial positive solutions for the following nonlinear system {Sk1(λ(D2u1))+a1(|x|)|△u1|k1=p1(|x|)f1(u2) for x∈RN,Sk2(λ(D2u2))+a2(|x|)|△u2|k2=p2(|x|)f2(u1) for x∈RN.Here Ski (λ (D2ui)) is the ki-Hessian operator, a1, p1, f1, a2, p2 and f2 are continuous functions.展开更多
This paper investigates 2-dimensional singular,quasilinear elliptic equations and gives some suffcient conditions ensuring the equations have infinitely many positive entire solutions. The super-subsolution method is ...This paper investigates 2-dimensional singular,quasilinear elliptic equations and gives some suffcient conditions ensuring the equations have infinitely many positive entire solutions. The super-subsolution method is used to prove the existence of such solutions.展开更多
文摘In this paper, the existence and nonexistence of nonnegative entire large solutions for the quasilinear elliptic equation are established, where , and are nondecreasing and vanish at the origin. The locally H lder continuous functions and are nonnegative. We extend results previously obtained for special cases of and g.
文摘In this paper, we show the existence and nonexistence of entire positive solutions for a class of singular elliptic system We have that entire large positive solutions fail to exist if f and g are sublinear and b and d have fast decay at infinity. However, if f and g satisfy some growth conditions at infinity, and b, d are of slow decay or fast decay at infinity, then the system has infinitely many entire solutions, which are large or bounded.
文摘In this paper, we are concerned with positive entire solutions to elliptic equations of the form Δu+ f(x,u)= 0 x∈ RN N ≥ 3 where u →f(x,u) is not assumed to be regular near u = 0 and f(x,u) may be more general involving both singular and sublinear terms. Some sufficient conditions are given with the aid of the barrier method and ODE approach, which guarantee the existence of positive entire solutions that tend to any sufficiently large constants arbitrarily prescribed in advance.
基金Project Supported by the Foundations of Henan Education Committee and Henan Science Technology Committee (984050400).
文摘In this paper, the existence of positive solutions for a class of quasilinear elliptic differential equation systems are established by Schauder-TychonofF fixed point theorem.
文摘We consider the elliptic system △u = p(|x|)u^av^b,△v=q(|x|)u^cv^d on R^n (n≥3) where a, b, c, d are nonnegative constants with max{a,d}≤ 1, and the functions p and q are nonnegative, continuous, and the support of min{p(r),q(r)} is not compact. We establish conditions on p and q, along with the exponents a, bf c, d, which ensure the existence of a positive entire solution satisfying lim|x|→∞u(x)=lim|x|→∞v (x)=∞.
文摘In this note, we consider positive entire large solutions for semilinear elliptic equations Au = p(x)f(u) in R^N with N ≥ 3. More precisely, we are interested in the link between the existence of entire large solution with the behavior of solution for --△u = p(x) in R^N. Especially for the radial case, we try to give a survey of all possible situations under Keller-Osserman type conditions.
文摘We study positive solutions to the fractional semi-linear elliptic equation(−∆)σu=K(x)u n+2σn−2σin B2\{0}with an isolated singularity at the origin,where K is a positive function on B2,the punctured ball B2\{0}⊂Rn with n>2,σ∈(0,1),and(−∆)σis the fractional Laplacian.In lower dimensions,we show that for any K∈C1(B2),a positive solution u always satisfies that u(x)6 C|x|−(n−2σ)/2 near the origin.In contrast,we construct positive functions K∈C1(B2)in higher dimensions such that a positive solution u could be arbitrarily large near the origin.In particular,these results also apply to the prescribed boundary mean curvature equations on B n+1.
文摘We consider the problem of whether the equation △u = p(x)f(u) on RN, N ≥ 3, has a positive solution for which lim |x|→∞(x) = ∞ where f is locally Lipschitz continuous, positive, and nondecreasing on (0,oo) and satisfies ∫1∞[F (t)]^- 1/2dt = ∞ where F(t) = ∫0^tf(s)ds. The nonnegative function p is assumed to be asymptotically radial in a certain sense. We show that a sufficient condition to ensure such a solution u exists is that p satisfies ∫0∞ r min|x|=r P (x) dr = ∞. Conversely, we show that a necessary condition for the solution to exist is that p satisfies ∫0∞r1+ε min |x|=rp(x)dr =∞ for all ε〉0.
文摘In this paper, the nonexistence of positive entire solutions for div(|Du| p-2 Du)q(x)f(u),x∈R N, is established, where p】1,Du=(D 1u,...,D Nu),q∶R N→(0,∞) and f∶(0,∞)→(0,∞) are continuous functions.
基金Supported by Startup Foundation for Docotors of Weifang University(2016BS04)
文摘By using Karamata regular variation theory and upper and lower solution method,we investigate the existence and the global asymptotic behavior of large solutions to a class of semilinear elliptic equations with nonlinear convection terms.In our study,the weight and nonlinearity are controlled by some regularly varying functions or rapid functions,which is very different from the conditions of previous contexts.Our results largely extend the previous works,and prove that the nonlinear convection terms do not affect the global asymptotic behavior of classical solutions when the index of the convection terms change in a certain range.
基金supported by National Natural Science Foundation of China (Grant No. 11571295)
文摘This paper is concerned with exact boundary behavior of large solutions to semilinear elliptic equations △u=b(x)f(u)(C0+|▽u|q),x∈Ω,where Ω is a bounded domain with a smooth boundary in RN,C0≥0,q E [0,2),b∈Clocα(Ω) is positive in but may be vanishing or appropriately singular on the boundary,f∈C[0,∞),f(0)=0,and f is strictly increasing on [0,∞)(or f∈C(R),f(s)> 0,■s∈R,f is strictly increasing on R).We show unified boundary behavior of such solutions to the problem under a new structure condition on f.
基金Acknowledgments Research is partly supported by the National Science Foundation of China (10701066 & 10971087).
文摘We establish the existence, uniqueness and the blow-up rate of the large positive solution of the quasi-linear elliptic problem -△pu=λ(x)u^θ-1-b(x)h(u), in Ω,with boundary condition u = +∞ on δΩ, where Ω R^N (N≥2) is a smooth bounded domain, 1 〈 p 〈∞ λ(·) and b(·) are positive weight functions and h(u) ~ uq-1 as u → ∞. Our results extend the previous work [Z. Xie, J. Diff. Equ., 247 (2009), 344-363] from case p = 2, λ is a constant and θ = 2 to case 1 〈 p 〈∞, A is a function and 1 ( 0 〈 θ 〈q 〉 p); and also extends the previous work [Z. Xie, C. Zhao, J. Diff. Equ., 252 (2012), 1776-1788], from case A is a constant and θ = p to case λ is a function and 1 〈 θ 〈 q ( 〉 p). Moreover, we remove the assumption of radial symmetry of the problem and we do not require h(·) is increasing.
文摘By the Schauder-Tychonoff fixed-point theorem, we inyestigate the existence and asymptotic behavior of positive radial solutions of fully nonlinear elliptic equations in Re. We give some sufficient conditions to guarantee the existence of bounded and unbounded radial solutions and consider the nonexistence of positive solution in Rn.
文摘The existence ofpositive radialsolutions ofthe equation - div(|Du|p- 2Du)= f(u) is studied in annular dom ains in Rn,n≥2. Itisproved thatiff(0)≥0, f is somewhere negativein (0,∞), lim u→0+ f′(u)= 0and lim u→∞(f(u)/up- 1)= ∞, then thereisa largepositiveradialsolution on allannuli.Iff(0)< 0 and satisfiescertain condi- tions, then the equation has no radialsolution ifthe annuliare too wide.
文摘In this paper, we study the existence of positive entire large and bounded radial positive solutions for the following nonlinear system {Sk1(λ(D2u1))+a1(|x|)|△u1|k1=p1(|x|)f1(u2) for x∈RN,Sk2(λ(D2u2))+a2(|x|)|△u2|k2=p2(|x|)f2(u1) for x∈RN.Here Ski (λ (D2ui)) is the ki-Hessian operator, a1, p1, f1, a2, p2 and f2 are continuous functions.
文摘This paper investigates 2-dimensional singular,quasilinear elliptic equations and gives some suffcient conditions ensuring the equations have infinitely many positive entire solutions. The super-subsolution method is used to prove the existence of such solutions.
