| 单词 | Dirichlet function |
| 释义 |
Dirichlet function
中文百科
狄利克雷函数 Nowhere continuous function(重定向自Dirichlet function)
狄利克雷函数(英语:Dirichlet function)是一个定义在实数范围上、值域为 当
狄利克雷函数的图像关于y轴成轴对称,是一个偶函数;它处处不连续;处处极限不存在;不可积分。这是一个处处不连续的可测函数。 狄利克雷函数也可以表达为一个连续函数串行的双重点极限,如下:
英语百科
Nowhere continuous function 狄利克雷函数(重定向自Dirichlet function)
In mathematics, a nowhere continuous function, also called an everywhere discontinuous function, is a function that is not continuous at any point of its domain. If f is a function from real numbers to real numbers, then f(x) is nowhere continuous if for each point x there is an ε > 0 such that for each δ > 0 we can find a point y such that 0 < |x − y| < δ and |f(x) − f(y)| ≥ ε. Therefore, no matter how close we get to any fixed point, there are even closer points at which the function takes not-nearby values. |
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![[{0,1}]](/Images/godic/202501/09/63b020cac857701f7dad02b6fd6c318f1940.png")
的函数,是处处不连续函数。![x](/Images/godic/202501/09/9dd4e461268c8034f5c8564e155c67a61940.png")
为有理数时,![D(x) = 1](/Images/godic/202501/09/70e72293cf8aed10dd15d9adbc6f72b91940.png")
;![D(x) = 0](/Images/godic/202501/09/ebd95860db9614d7bfcd7cef7d85fda11940.png")
。![D(x)=\lim_{k\to\infty}\left(\lim_{j\to\infty}\left(\cos^{2j}(k!\pi x)\right)\right)](/Images/godic/202501/09/0e1033e5b0487ddf5826cc540a2c92121940.png")
,其中![k](/Images/godic/202501/09/8ce4b16b22b58894aa86c421e8759df31940.png")
和![j](/Images/godic/202501/09/363b122c528f54df4a0446b6bab055151940.png")
为整数