冯•诺依曼效用的理论意义在于给古典的基数效用论注入了新的生机,其存在的问题是效用指数的客观性受到广泛质疑。
Its theoretical significance lies in the fact that it injects new vitality into classical cardinal approach, but there is widespread doubt about the objectivity of its utility index.
由于冯。诺依曼式计算机的理论基础是数理逻辑,现今的计算机处理数理问题无比成功。
Due to the rationale of Von Neumann computer are based on mathematical logic, it did a wonderful job when dealing with mathematics problem.
通过引入静电场的标量位函数,将电场强度的矢量泊松方程转化为位势的椭圆型偏微分方程的诺依曼边值问题。
And the problem is converted to the typical Neumann boundary value problem for the elliptic equations by inducing the scalar potential function.
通过引入静电场的标量位函数,将电场强度的矢量泊松方程转化为位势的椭圆型偏微分方程的诺依曼边值问题。
And the problem is converted to the typical Neumann boundary value problem for the elliptic equations by inducing the scalar potential function.
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