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Isoperimetric monotony of the L p -norm of the warping function of a plane simply connected domain of functions u and u -1 are monotone with respect to the parameter p. This monotony also gives isoperimetric
Isoperimetric monotony of the L p -norm of the warping function of a plane simply connected domain of functions u and u -1 are monotone with respect to the parameter p. This monotony also gives isoperimetric
Isoperimetric properties of Euclidean boundary moments of a simply connected domain to the domain boundary. We prove an isoperimetric inequality generalizing theorems derived by the Schwarz
Isoperimetric inequalities for conformal moments of plane domains to derive isoperimetric inequalities for geometric functionals which are closely related to the torsional
Isoperimetric inequality for torsional rigidity in multidimensional domains. The extremal domains are ellipsoids of a special kind. Thus, we obtain a generalization of the isoperimetric
Isoperimetric inequalities for Lp-norms of the stress function of a multiply connected plane domainIsoperimetric inequalities for Lp-norms of the stress function of a multiply connected plane domain
Bilateral isoperimetric inequalities for boundary moments of plane domainsBilateral isoperimetric inequalities for boundary moments of plane domains
Isoperimetric properties of Euclidean boundary moments of a simply connected domain to the domain boundary. We prove an isoperimetric inequality generalizing theorems derived by the Schwarz
Isoperimetric inequalities for Lp-norms of the stress function of a multiply connected plane domainIsoperimetric inequalities for Lp-norms of the stress function of a multiply connected plane domain
Bilateral isoperimetric inequalities for boundary moments of plane domainsBilateral isoperimetric inequalities for boundary moments of plane domains
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