一个证明包含离散参数的特殊函数不等式的程序

Proceedings of the 2005 international symposium on Symbolic and algebraic computation Pub Date : 2005-07-24 DOI:10.1145/1073884.1073907

S. Gerhold, Manuel Kauers

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引用次数: 45

摘要

我们定义了一类特殊函数不等式，其中包含了许多经典的例子，如Cauchy-Schwarz不等式，并引入了一个基于归纳法和柱面代数分解的证明过程。我们给出了一系列可以用我们的方法完成的重要示例。它们中的大多数之前都没有被自动证明过。一些困难的众所周知的不等式，如Askey-Gasper不等式和Vietoris不等式也在我们的类中，但我们不知道我们的证明过程是否为它们终止。

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A procedure for proving special function inequalities involving a discrete parameter

We define a class of special function inequalities that contains many classical examples, such as the Cauchy-Schwarz inequality, and introduce a proving procedure based on induction and Cylindrical Algebraic Decomposition. We present an array of non-trivial examples that can be done by our method. Most of them have not been proven automatically before. Some difficult well-known inequalities such as the Askey-Gasper inequality and Vietoris's inequality lie in our class as well, but we do not know if our proving procedure terminates for them.

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Proceedings of the 2005 international symposium on Symbolic and algebraic computation

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