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Global structure of sign-changing solutions for discrete Dirichlet problems
Open Mathematics ( IF 1.7 ) Pub Date : 2020-01-01 , DOI: 10.1515/math-2020-0180 Liping Wei 1 , Ruyun Ma 1
Open Mathematics ( IF 1.7 ) Pub Date : 2020-01-01 , DOI: 10.1515/math-2020-0180 Liping Wei 1 , Ruyun Ma 1
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Abstract Let T > 1 T\gt 1 be an integer, T ≔ [ 1 , T ] Z = { 1 , 2 , … , T } , T ˆ ≔ { 0 , 1 , … , T + 1 } {\mathbb{T}}:= {{[}1,T]}_{{\mathbb{Z}}}=\{1,2,\ldots ,T\},\hspace{.0em}\hat{{\mathbb{T}}}:= \{0,1,\ldots ,T+1\} . In this article, we are concerned with the global structure of the set of sign-changing solutions of the discrete second-order boundary value problem { Δ 2 u ( x − 1 ) + λ h ( x ) f ( u ( x ) ) = 0 , x ∈ T , u ( 0 ) = u ( T + 1 ) = 0 , \left\{\begin{array}{l}{\mathrm{\Delta}}^{2}u(x-1)+\lambda h(x)f(u(x))=0,\hspace{1em}x\in {\mathbb{T}},\\ u(0)=u(T+1)=0,\end{array}\right. where λ > 0 \lambda \gt 0 is a parameter, f ∈ C ( ℝ , ℝ ) f\in C({\mathbb{R}},{\mathbb{R}}) satisfies f ( 0 ) = 0 , s f ( s ) > 0 f(0)=0,\hspace{.1em}sf(s)\gt 0 for all s ≠ 0 s\ne 0 and h : T ˆ → [ 0 , + ∞ ) h:\hat{{\mathbb{T}}}\to {[}0,+\infty ) . By using the directions of a bifurcation, we obtain existence and multiplicity of sign-changing solutions of the above problem for λ \lambda lying in various intervals in ℝ {\mathbb{R}} . Moreover, we point out that these solutions change their sign exactly k − 1 k-1 times, where k ∈ { 1 , 2 , … , T } k\in \{1,2,\ldots ,T\} .
中文翻译:
离散狄利克雷问题符号变换解的全局结构
摘要 令 T > 1 T\gt 1 为整数,T ≔ [ 1 , T ] Z = { 1 , 2 , … , T } , T ˆ ≔ { 0 , 1 , … , T + 1 } {\mathbb{ T}}:= {{[}1,T]}_{{\mathbb{Z}}}=\{1,2,\ldots ,T\},\hspace{.0em}\hat{{\mathbb {T}}}:= \{0,1,\ldots ,T+1\} . 在本文中,我们关注离散二阶边值问题 { Δ 2 u ( x − 1 ) + λ h ( x ) f ( u ( x ) ) 的符号变化解集的全局结构= 0 , x ∈ T , u ( 0 ) = u ( T + 1 ) = 0 , \left\{\begin{array}{l}{\mathrm{\Delta}}^{2}u(x-1 )+\lambda h(x)f(u(x))=0,\hspace{1em}x\in {\mathbb{T}},\\ u(0)=u(T+1)=0, \end{数组}\对。其中 λ > 0 \lambda \gt 0 是一个参数, f ∈ C ( ℝ , ℝ ) f\in C({\mathbb{R}},{\mathbb{R}}) 满足 f ( 0 ) = 0 , sf ( s ) > 0 f(0)=0,\hspace{.1em}sf(s)\gt 0 for all s ≠ 0 s\ne 0 and h : T ˆ → [ 0 , + ∞ ) h:\ hat{{\mathbb{T}}}\to {[}0,+\infty ) 。通过使用分岔的方向,我们获得了上述问题的符号变化解的存在性和多重性,其中 λ \lambda 位于 ℝ {\mathbb{R}} 中的不同区间。此外,我们指出这些解恰好改变了它们的符号 k − 1 k-1 次,其中 k ∈ { 1 , 2 , … , T } k\in \{1,2,\ldots ,T\} 。
更新日期:2020-01-01
中文翻译:
离散狄利克雷问题符号变换解的全局结构
摘要 令 T > 1 T\gt 1 为整数,T ≔ [ 1 , T ] Z = { 1 , 2 , … , T } , T ˆ ≔ { 0 , 1 , … , T + 1 } {\mathbb{ T}}:= {{[}1,T]}_{{\mathbb{Z}}}=\{1,2,\ldots ,T\},\hspace{.0em}\hat{{\mathbb {T}}}:= \{0,1,\ldots ,T+1\} . 在本文中,我们关注离散二阶边值问题 { Δ 2 u ( x − 1 ) + λ h ( x ) f ( u ( x ) ) 的符号变化解集的全局结构= 0 , x ∈ T , u ( 0 ) = u ( T + 1 ) = 0 , \left\{\begin{array}{l}{\mathrm{\Delta}}^{2}u(x-1 )+\lambda h(x)f(u(x))=0,\hspace{1em}x\in {\mathbb{T}},\\ u(0)=u(T+1)=0, \end{数组}\对。其中 λ > 0 \lambda \gt 0 是一个参数, f ∈ C ( ℝ , ℝ ) f\in C({\mathbb{R}},{\mathbb{R}}) 满足 f ( 0 ) = 0 , sf ( s ) > 0 f(0)=0,\hspace{.1em}sf(s)\gt 0 for all s ≠ 0 s\ne 0 and h : T ˆ → [ 0 , + ∞ ) h:\ hat{{\mathbb{T}}}\to {[}0,+\infty ) 。通过使用分岔的方向,我们获得了上述问题的符号变化解的存在性和多重性,其中 λ \lambda 位于 ℝ {\mathbb{R}} 中的不同区间。此外,我们指出这些解恰好改变了它们的符号 k − 1 k-1 次,其中 k ∈ { 1 , 2 , … , T } k\in \{1,2,\ldots ,T\} 。
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