self adjoint operator 中文意思是什麼
self adjoint operator
解釋
自伴算符-
Multiplicative self - adjoint maps on a non - standard operator algebra which preserve spectrum
一個非標準運算元代數上的保譜乘法自伴映射 -
For the expansion theorems of self - adjoint dirac operator, it is difficult to prove it by using the method of integral equation
對于自伴dirac運算元的特徵展開定理的證明,用積分方程方法有一定的困難。 -
About dirac eigenvalue problem with general two points " liner algebra, corresponding operator of which often is non - self - adjoint operator
對於一般兩點線性(代數)邊界條件下的dirac特徵值問題,相應的運算元一般說是非自伴的。 -
The condition under which the dirac operator is self - adjoint is discussed under the general linear boundary condition between the interval of two points. for the expansion theorem of non - self - adjoint dirac operator, it is unable to use the method of integral equation. but under the linear boundary condition and unlocal boundary condition, the eigenvalue expansion problems of non - self - adjoint operator can still be discussed by using the residue method
對于非自伴dirac運算元的特徵展開定理已無法應用積分方程的方法,本文仍用留數方法對一個兩點非自伴邊界條件和一個非局部邊界條件下產生的非自伴運算元的特徵展開問題進行了討論,分別得到了它們的特徵展開定理。
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