Commuting self-adjoint extensions of symmetric operators defined from the partial derivatives

Abstract

We consider the problem of finding commuting self-adjoint extensions of the partial derivatives (1/i)(∂/∂ xj):j=1,...,d with domain Cc∞() where the self-adjointness is defined relative to L2(), and is a given open subset of Rd. The measure on is Lebesgue measure on Rd restricted to . The problem originates with I.E. Segal and B. Fuglede, and is difficult in general. In this paper, we provide a representation-theoretic answer in the special case when =I×2 and I is an open interval. We then apply the results to the case when is a d-cube, Id, and we describe possible subsets of Rd such that e(i2πλ x) restricted to Id:λ∈ is an orthonormal basis in L2(Id).

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