Extension Theory and Krein-type Resolvent Formulas for Nonsmooth Boundary Value Problems
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Extension Theory and Krein-type Resolvent Formulas for Nonsmooth Boundary Value Problems. / Abels, Helmut; Grubb, Gerd; Wood, Ian Geoffrey.
I: Journal of Functional Analysis, Bind 266, Nr. 7, 2014, s. 4037-4100.Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt
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TY - JOUR
T1 - Extension Theory and Krein-type Resolvent Formulas for Nonsmooth Boundary Value Problems
AU - Abels, Helmut
AU - Grubb, Gerd
AU - Wood, Ian Geoffrey
PY - 2014
Y1 - 2014
N2 - The theory of selfadjoint extensions of symmetric operators, and more generally the theory of extensions of dual pairs, was implemented some years ago for boundary value problems for elliptic operators on smooth bounded domains. Recently, the questions have been taken up again for nonsmooth domains. In the present work we show that pseudodifferential methods can be used to obtain a full characterization, including Kreĭn resolvent formulas, of the realizations of nonselfadjoint second-order operators on <img height="16" border="0" style="vertical-align:bottom" width="40" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022123614000342-si1.gif">C32+ε domains; more precisely, we treat domains with <img height="26" border="0" style="vertical-align:bottom" width="31" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022123614000342-si2.gif">Bp,232-smoothness and operators with <img height="20" border="0" style="vertical-align:bottom" width="23" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022123614000342-si3.gif">Hq1-coefficients, for suitable p>2(n−1)p>2(n−1) and q>nq>n. The advantage of the pseudodifferential boundary operator calculus is that the operators are represented by a principal part and a lower-order remainder, leading to regularity results; in particular we analyze resolvents, Poisson solution operators and Dirichlet-to-Neumann operators in this way, also in Sobolev spaces of negative order.
AB - The theory of selfadjoint extensions of symmetric operators, and more generally the theory of extensions of dual pairs, was implemented some years ago for boundary value problems for elliptic operators on smooth bounded domains. Recently, the questions have been taken up again for nonsmooth domains. In the present work we show that pseudodifferential methods can be used to obtain a full characterization, including Kreĭn resolvent formulas, of the realizations of nonselfadjoint second-order operators on <img height="16" border="0" style="vertical-align:bottom" width="40" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022123614000342-si1.gif">C32+ε domains; more precisely, we treat domains with <img height="26" border="0" style="vertical-align:bottom" width="31" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022123614000342-si2.gif">Bp,232-smoothness and operators with <img height="20" border="0" style="vertical-align:bottom" width="23" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022123614000342-si3.gif">Hq1-coefficients, for suitable p>2(n−1)p>2(n−1) and q>nq>n. The advantage of the pseudodifferential boundary operator calculus is that the operators are represented by a principal part and a lower-order remainder, leading to regularity results; in particular we analyze resolvents, Poisson solution operators and Dirichlet-to-Neumann operators in this way, also in Sobolev spaces of negative order.
U2 - 10.1016/j.jfa.2014.01.016
DO - 10.1016/j.jfa.2014.01.016
M3 - Journal article
VL - 266
SP - 4037
EP - 4100
JO - Journal of Functional Analysis
JF - Journal of Functional Analysis
SN - 0022-1236
IS - 7
ER -
ID: 102114363