| 1. | Once the concavity was filled further growth could not take place .
一旦凹陷填满,就不可能继续生长。
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| 2. | Concavity - convexity of functions near extreme points
实解析函数在极值点附近的凹凸性
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| 3. | Proving inequalities by the convexity or concavity of functions
用函数的凸凹性证明不等式
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| 4. | The degree of concavity varies between species , as does the size
凹度因物种而异,大小也各不相同。
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| 5. | Especially , we implement " concavity " methods in the linear damping case , m = 2
特别地,利用凹方法考虑线性阻尼情形即m = 2 。
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| 6. | Orientation and convexity - concavity identification for polygons using extremity vertices sequence
利用极点顺序的多边形顶点凹凸性判别算法
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| 7. | Thereinto the concavity and convexity of functions is important condition in minimax theory
其中函数的凹凸性是极大极小定理的重要条件。
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| 8. | Sometimes different combinations in the concavity and convexity of functions may construct a new theorem
函数凹凸性的不同组合往往可以构成一个新的极大极小定理。
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| 9. | A minimax theorem generally involves three assumption conditions : space structures on sets x and y , the continuity of the functions and the concavity and convexity of functions
一个极大极小定理一般涉及三个假设条件:集合x和y的空间结构,函数的连续性和函数的凹凸性。
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| 10. | With the concavity and integrability of sublinear terms near zero , the symmetry results for a class of sublinear elliptic equations are given by making use of the moving - plane method
本文利用次线性项在零点附近的凹性和可积性,用移动平面法给出了一类次线性椭圆方程正解的对称性
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