P-adic analysis

P-adic analysis (p-adic analysis) is a branch of mathematics that deals with the mathematical analysis of functions of p-adic numbers.

Related Topics:
Mathematics - Mathematical analysis - P-adic number

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The theory of complex-valued numerical functions on the p-adic numbers is just part of the theory of locally compact groups. The usual meaning taken for p-adic analysis is the theory of p-adic-valued functions on spaces of interest.

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P-adic analysis is mainly applied in number theory, where it has a significant role in diophantine geometry and diophantine approximation. Some applications have required the development of p-adic functional analysis and spectral theory. In many ways p-adic analysis is less subtle than classical analysis, since the ultrametric inequality means, for example, that convergence of infinite series of p-adic numbers is much simpler. Topological vector spaces over p-adic fields show distinctive features; for example aspects relating to convexity and the Hahn-Banach theorem are different.

Related Topics:
Number theory - Diophantine geometry - Diophantine approximation - Functional analysis - Spectral theory - Classical analysis - Ultrametric inequality - Infinite series - Topological vector space - Convexity - Hahn-Banach theorem

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