K-Theory of an Algebra of Pseudodifferential Operators on a Noncompact Manifold
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Patrícia Hess
phess@ime.usp.br
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Severino T. Melo
toscano@ime.usp.br
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Abstract
Let 𒜠denote the C*-algebra of bounded operators on L2(â„ × ð•Š1) generated by: all multiplications a(M) by functions a ⋲ C∞(ð•Š1), all multiplications b(M) by functions b ⋲ C([−∞,+∞]), all multiplications by 2Ï€-periodic continuous functions, Λ = (1 − Δâ„×ð•Š1 )−1/2, where Δâ„×ð•Š1 is the Laplacian operator on L2(â„ × ð•Š1), and Ï‘tΛ, Ï‘xΛ, for t ⋲ â„ and x⋲ ð•Š1. We compute the K-theory of 𒜠and of its quotient by the ideal of compact operators.
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Published
2009-12-01
How to Cite
[1]
P. Hess and S. T. Melo, “K-Theory of an Algebra of Pseudodifferential Operators on a Noncompact Manifold”, CUBO, vol. 11, no. 5, pp. 51–56, Dec. 2009.
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