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Random diophantine equations of additive type

Using the circle method in combination with lattice point counting arguments, we show that for almost all homogeneous diophantine equations of additive type and degree $k$ in more than $4k$ variables, the Local-Global principle holds true. Moreover, our approach shows that almost all such equations having a non-trivial integer solution have a very small such solution, the bound being close to the best possible one.

preprint2010arXivOpen access

Jörg Brüdern Rainer Dietmann

math.NT

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Jörg Brüdern Rainer Dietmann

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