Strongly coupled Schroedinger operators in Lp(Rd;Cm)
Abstract
We consider systems of elliptic equations, possibly coupled up to the second-order, on the Lp(Rd;Cm)-scale. Under suitable assumptions we prove that the minimal realization in Lp(Rd;Cm)$ generates a strongly continuous analytic semigroup. We also prove the consistency of the semigroup on the Lp-scale and some spectral results.
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