将这一结果与动力学重正化群理论和直接标度分析得到的结果进行了对比。
The results obtained are compared with that of dynamic renormalization-group theory and scaling analysis.
重正化群方法已成为获得这类问题精确解的一致有效渐近展开式的有用工具。
Renormalization group method is an effective tool to obtain the uniformly valid asymptotic expansion exact solutions of this kind of problems.
介绍了重正化群方程的一种有效的数值解法,并与多项式展开的传统解法作了比较。
An effective numerical solution of renormalization group equations is introduced, and compared with the traditional solution of polynomial expansion.
他们的结果表明:用重正化群方法来处理奇异摄动问题,比用传统的方法更简单更有效。
Their results show that: a group approach to the restructuring of singular perturbations, simpler than using traditional methods more effective.
据此提出了一重正化群弱面模型,并对损伤演化后期的临界破坏现象进行了初步的分析和探讨。
It shows that critical failure in spallation results from a cascade of coalescence of microcracks. In view of this fact, a renormalization group model Of weak surfaces in combinat…
据此提出了一重正化群弱面模型,并对损伤演化后期的临界破坏现象进行了初步的分析和探讨。
It shows that critical failure in spallation results from a cascade of coalescence of microcracks. In view of this fact, a renormalization group model Of weak surfaces in combinat…
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