On the Global Limiting Absorption Principle for Massless Dirac Operators
Abstract
We prove a global limiting absorption principle on the entire real line for free, massless Dirac operators H0 = α · (-i ∇) for all space dimensions n ∈ N, n ≥ 2. This is a new result for all dimensions other than three, in particular, it applies to the two-dimensional case which is known to be of some relevance in applications to graphene. We also prove an essential self-adjointness result for first-order matrix-valued differential operators with Lipschitz coefficients.
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