摘要
设$L$表示$\ell _{2}\left(%TCIMACRO{\U{2115}}%%BeginExpansion\mathbb{N}%EndExpansion,%%TCIMACRO{\U{2102}}%%BeginExpansion\mathbb{C}%EndExpansion^{2}\right)$中由一阶差分运算符%\begin{equipment*}\left\{\begin{array}{cc}{\bigtriangleup y_{N}^{\left(2\right)}+p生成的离散狄拉克算子_{n} 年_{n} ^{左(1\右)}=\lambda y_{n}^{(1)}}&\\{大三角y_{n-1}^{\左(1\\右){+q_{n} 年_{n} ^{left(2\right)}=\lambda y_{n}^{(2)}},\end{array}\text{}n\in\mathbb{n}\setminuse\left\{k-1,k,k+1\right\}\right。\带边界和脉冲条件的结束{方程*}%\begin{方程**}\开始{数组}{c}y{0}^{(1)}=0\text{},\\\\left(开始{阵列}{c{y{k+1}^{(1){}\\y{k+2}^}(2)}%\end{array}%\right)=\theta\left(结束{数组{c}y{k-1}^{2}^{(1)}%\结束{数组}%\右);\text{}\theta=\left(开始{array}{cc}\theta{1}和结束{2}\\theta{3}&结束{4}%\end{array}%\right),在%TCIMACRO{\U{211d}}%%BeginExpansion\mathbb{R}%EndExpansion%\end}array{%\end equation*}%中的结束{i=1,2,3,4}其中$\left\{p_{n}\right\}_{n\在%TCIMACRO{\U{2115}中}%%BeginExpansion\mathbb{N}%EndExpansion}、$$\left\{q_{N}\right\}_{N\在%TCIMACRO{\U{2115}}%%BeingExpansion\ mathbb}N}%EndExpansion}$中是实数序列,$\lambda=2\sinh\left(\frac{z}{2}\right)$是双曲线特征参数,$\bigtriangleup$是正向运算符。本文给出了在条件%\begin{方程*}\sum\limits_{n=1}^{infty}n\left(\left\vertp_{n}\right\vert+\left\ vertq{n}\right\ vertright)下,$L$的谱性质,如谱、本征值、散射函数及其在特殊情况下的性质
关键词
离散Dirac方程,脉冲条件,双曲特征参数,散射函数,特征值
