Quadratic functionals and nondegeneracy of boundary value problems on a geometric graph

Zavgorodnij M. G.

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Quadratic functionals and nondegeneracy of boundary value problems on a geometric graph

机译：几何图上边值问题的二次函数和非退化

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Quadratic functionals defined on the space of functions differentiable on a geometric graph are considered. Analogs of the Lagrange and Dubois-Raymond lemmas are proved. Necessary extremum conditions for these quadratic functionals are obtained. A boundary value problem with conditions posed locally at the vertices of a geometric graph is shown to be selfadjoint if and only if it is generated by a quadratic functional. A subclass of quadratic energy functionals is singled out. The space of solutions of the homogeneous boundary value problem generated by a quadratic energy functional is described, and nondegeneracy criteria for such boundary value problems are derived.

机译：考虑在几何图上可微分的函数空间上定义的二次函数。 Lagrange和Dubois-Raymond引理的类似物得到了证明。获得了这些二次函数的必要极值条件。当且仅当由二次函数生成时，才表明具有局部位于几何图形顶点处的条件的边值问题是自伴的。二次能量泛函的子类被挑出来。描述了由二次能量函数产生的齐次边值问题的解的空间，并推导了此类边值问题的非简并性准则。

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《Differential equations: A translation of differensial'nye uraveniya》 |2016年第1期|共10页
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Zavgorodnij M. G.;
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中图分类微分方程、积分方程;
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机译：几何图上边值问题的二次函数和非退化
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机译：具有二次代价的双曲型方程最优边值控制的Riccati方程解的结构。

Quadratic functionals and nondegeneracy of boundary value problems on a geometric graph

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