稠密性不是连续性。
本文研究高阶复合方程基于能量不等式和生成算子的稠密性。
The proof is based on an energy inequality and the density of the range of the operator generated by the studied problem.
利用集合的稠密性和弱近似凸性,进一步刻画函数的预不变凸性。
We research on describing preinvexity of functions in this paper by means of the density and weakly near convexity in the set.
在局部凸空间上利用严有效性的纯量化特征,研究严有效点的截口性质及稠密性质。
Using scalar characterization of a strictly efficient point in Locally convene Spaces, we study the section property and the density of strictly efficiency.
本文讨论了无最小周期的周期函数性质,论证了无最小周期的周期函数的处处不连续性以及这种周期函数的周期构成的集合的稠密性。
In this paper, some properties of the periodic functions without minimum period are shown, the main results are: the functions are discontinuous everywhere and the set of periods is dense.
本文讨论了无最小周期的周期函数性质,论证了无最小周期的周期函数的处处不连续性以及这种周期函数的周期构成的集合的稠密性。
In this paper, some properties of the periodic functions without minimum period are shown, the main results are: the functions are discontinuous everywhere and the set of periods is dense.
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