Meanwhile, the solutions to the problem and solvability conditions are obtained, and we extend the solution space from analytic function space into the meromorphic function space.
同时,给出了其解的表达式和可解条件,并将原来求解空间从解析函数空间推广到亚纯函数空间。
Some solvability conditions of periodic solutions are obtained for a class of first order(superquadratic) non-autonomous Hamiltonian systems in light of the minimax methods of critical point theory.
运用临界点理论中的极小、极大方法得到一类超二次哈密顿系统的周期解的存在性的存在性定理。
The results presented would be not only a mathematical conditions, but also a topological conditions for subnetwork solvability.
本文不仅给出了可解性的数学表达式条件,而且给出了等效的拓扑条件。
In the last section, namely 3.4, we mainly discuss how Abelian subgroups influent the solvability of finite groups, so we obtain some sufficient conditions of solvable groups.
本文第四部分3.4,主要讨论了交换子群对有限群可解性的影响,得到了有限群可解的若干充分条件。
From this, we obtain some sufficient conditions for hypoellipticity and local solvability of those operators.
由此得出了判别重特征线性偏微分算子亚椭园性和局部可解性的若干充分条件。
From this, we obtain some sufficient conditions for hypoellipticity and local solvability of those operators.
由此得出了判别重特征线性偏微分算子亚椭园性和局部可解性的若干充分条件。
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