Fredholm theory connected with a Douglis-Nirenberg system of   differential equations over $\mathbb{R}^n$

M. Faierman

arXiv:1612.08655·math.AP·December 28, 2016

Fredholm theory connected with a Douglis-Nirenberg system of differential equations over $\mathbb{R}^n$

M. Faierman

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Abstract

We consider a spectral problem over $R^{n}$ for a Douglis-Nirenberg system of differential operators under limited smoothness assumptions and under the assumption of parameter-ellipticity in a closed sector $L$ in the complex plane with vertex at the origin. We pose the problem in an $L_{p}$ Sobolev-Bessel potential space setting, $1 < p < \infty$ , and denote by $A_{p}$ the operator induced in this setting by the spectral problem. We then derive results pertaining to the Fredholm theory for $A_{p}$ for values of the spectral parameter $λ$ lying in $L$ as well as results pertaining to the invariance of the Fredholm domain of $A_{p}$ with $p$ .

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TopicsAdvanced Mathematical Modeling in Engineering · Nonlinear Partial Differential Equations · Advanced Harmonic Analysis Research