Add to ORKG© 2018 Russian Academy of Sciences (DoM), London Mathematical Society, Turpion Ltd. Functionals whose values are defined as sharp constants in Rellich inequalities are investigated for polyharmonic operators in plane domains. The weight function is taken to be a power of the distance of a point to the boundary of the domain. Estimates are obtained for arbitrary domains, as is a test for these constants to be positive, and precise values are found for convex domains and for domains close to convex in a certain sense. The case when the weight function is taken to be a power of the coefficient in the Poincaré metric is also treated. Bibliography: 28 titles
summary:Hardy and Rellich type inequalities with an additional term are proved for compactly support...
summary:Hardy and Rellich type inequalities with an additional term are proved for compactly support...
© 2018, Pleiades Publishing, Ltd. We determine some special functionals as sharp constants in integr...
© 2018 Russian Academy of Sciences (DoM), London Mathematical Society, Turpion Ltd. Functionals whos...
© Avkhadiev F.G. 2017. We prove the lower bounds for the functions introduced as the maximal constan...
© Avkhadiev F.G. 2017. We prove the lower bounds for the functions introduced as the maximal constan...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2018, Allerton Press, Inc. On domains of Euclidean spaces we consider inequalities for test functi...
© 2018, Pleiades Publishing, Ltd. We determine some special functionals as sharp constants in integr...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2016 Elsevier Inc.For test functions supported in a domain of the Euclidean space we consider the ...
© 2018, © 2018 Informa UK Limited, trading as Taylor & Francis Group. For a plane domain we study ...
AbstractWe consider Hardy–Rellich inequalities and discuss their possible improvement. The procedure...
summary:Hardy and Rellich type inequalities with an additional term are proved for compactly support...
summary:Hardy and Rellich type inequalities with an additional term are proved for compactly support...
© 2018, Pleiades Publishing, Ltd. We determine some special functionals as sharp constants in integr...
© 2018 Russian Academy of Sciences (DoM), London Mathematical Society, Turpion Ltd. Functionals whos...
© Avkhadiev F.G. 2017. We prove the lower bounds for the functions introduced as the maximal constan...
© Avkhadiev F.G. 2017. We prove the lower bounds for the functions introduced as the maximal constan...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2018, Allerton Press, Inc. On domains of Euclidean spaces we consider inequalities for test functi...
© 2018, Pleiades Publishing, Ltd. We determine some special functionals as sharp constants in integr...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2016, Allerton Press, Inc. For smooth functions supported in a domain of the Euclidean space we in...
© 2016 Elsevier Inc.For test functions supported in a domain of the Euclidean space we consider the ...
© 2018, © 2018 Informa UK Limited, trading as Taylor & Francis Group. For a plane domain we study ...
AbstractWe consider Hardy–Rellich inequalities and discuss their possible improvement. The procedure...
summary:Hardy and Rellich type inequalities with an additional term are proved for compactly support...
summary:Hardy and Rellich type inequalities with an additional term are proved for compactly support...
© 2018, Pleiades Publishing, Ltd. We determine some special functionals as sharp constants in integr...