On Rigid, Hard and Soft Problems and Results in Arithmetic Geometry

机译：在刚性，艰难和软问题上以及算术几何的结果

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Rigid, hard and soft problems and results in arithmetic geometry are presented. "Soft" and "hard" in our paper are limited to the framework of solutions of quadratic forms over rings of integers of local and global fields, the Hardy-Littlewood-Kloosterman method. Next we consider the notion of rigidity. In the framework we give review of some novel results in the aria.

机译：提出了刚性，硬质和软问题，并提出算术几何形状。我们纸上的“软”和“硬”仅限于当地和全球领域整数的二次形式的解决方案的框架，哈迪 - 小木 - 克洛塞曼方法。接下来我们考虑僵硬的概念。在框架中，我们在咏叹调中对一些新颖的成果进行审查。

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《International Conference on Mathematical Methods, Computational Techniques and Intelligent Systems;International Conference on Manufacturing Engineering, Quality and Production Systems;European Conference on Applied Mathematics and Informatics》|2015年||共5页
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NIKOLAJ GLAZUNOV;
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中图分类 TP3-53;
关键词
Diophantine equation; Rigidity; Dirichlet character; Ergodic method; Hermition; Hardy-Littlewood-Kloosterman method; Convolution of measures; Group action; Uniform rigidity; Superrigidity;

机译：渐进式方程;刚性;dirichlet特征;ergodic方法;隐藏;Hardy-littlewood-kloosterman方法;措施卷积;组动作;均匀的刚性;均匀;

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On Rigid, Hard and Soft Problems and Results in Arithmetic Geometry

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