Concrete algebraic cohomology for the group (â„, +) or how to solve the functional equation ð‘“(ð‘¥+ð‘¦) - ð‘“(ð‘¥) - ð‘“(ð‘¦) = ð‘”(ð‘¥, ð‘¦)

Mihai Prunescu mihai.prunescu@math.uni-freiburg.de

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Abstract

The functional equation ð‘“(ð‘¥+ð‘¦) - ð‘“(ð‘¥) - ð‘“(ð‘¦) = ð‘”(ð‘¥, ð‘¦) has a solution ð‘“ that belongs to C⁰(â„) if and only if the symmetric cocycle ð‘” belongs to C⁰(â„²). If the symmetric cocyle ð‘” is recursively approximable, there exists a solution ð‘“ which is recursively approximable also. If ð‘” belongs to C¹(â„²) then there exists an integral expression in ð‘” for a solution ð‘“ that belongs to C¹(â„), and the same happens for the classes C^k, C^âˆž, analytic and polynomial.

Keywords

Algebraic Cohomology , functional equation , analytic properties

Mihai Prunescu Hornecker softwareentwicklung, Freiburg, Germany - Institute of Mathematics of the Romanian Academy, Bucharest, Romania.

Pages: 39–45
Date Published: 2007-12-01
Vol. 9 No. 3 (2007): CUBO, A Mathematical Journal

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Published

2007-12-01

How to Cite

[1]

M. Prunescu, “Concrete algebraic cohomology for the group (â„, +) or how to solve the functional equation ð‘“(ð‘¥+ð‘¦) - ð‘“(ð‘¥) - ð‘‘(ð‘¦) = ð‘’(ð‘¥, ð‘¦)”, CUBO, vol. 9, no. 3, pp. 39–45, Dec. 2007.

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Vol. 9 No. 3 (2007): CUBO, A Mathematical Journal

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