Add to ORKG© Nasibullin R.G. 2017. We prove exact Hardy type inequalities with the weights depending on a Bessel function. We obtain one-dimensional L p -inequalities and provide an example of extending these inequalities for the case of convex domains with a finite inner radius. The proved statements are generalization for the case of arbitrary p ≥ 2 of the corresponding inequality proved by F.G. Avkhadiev and K.-J. Wirths for p = 2
Let Ω be an n-dimensional convex domain with finite inradius δ 0 = sup xεΩ δ, where δ = dist(x,ρΩ), ...
We prove Hardy-type inequalities in spatial domains with finite inner radius, in particular, one-dim...
Hardy and Rellich type inequalities with an additional term are proved for compactly supported smoot...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© Nasibullin R.G. 2017. We prove exact Hardy type inequalities with the weights depending on a Besse...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2020, Pleiades Publishing, Ltd. We study Hardy-type integral inequalities with remainder terms for...
We prove Hardy-type inequalities in spatial domains with finite inner radius, in particular, one-dim...
© 2020 Royal Dutch Mathematical Society (KWG) This paper is devoted to Hardy type inequalities with ...
Let Ω be an n-dimensional convex domain with finite inradius δ 0 = sup xεΩ δ, where δ = dist(x,ρΩ), ...
We prove Hardy-type inequalities in spatial domains with finite inner radius, in particular, one-dim...
Hardy and Rellich type inequalities with an additional term are proved for compactly supported smoot...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© Nasibullin R.G. 2017. We prove exact Hardy type inequalities with the weights depending on a Besse...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© Nasibullin R.G. 2017.We prove exact Hardy type inequalities with the weights depending on a Bessel...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2016, Pleiades Publishing, Ltd.We obtain a new sharp Hardy type inequality with an additional term...
© 2020, Pleiades Publishing, Ltd. We study Hardy-type integral inequalities with remainder terms for...
We prove Hardy-type inequalities in spatial domains with finite inner radius, in particular, one-dim...
© 2020 Royal Dutch Mathematical Society (KWG) This paper is devoted to Hardy type inequalities with ...
Let Ω be an n-dimensional convex domain with finite inradius δ 0 = sup xεΩ δ, where δ = dist(x,ρΩ), ...
We prove Hardy-type inequalities in spatial domains with finite inner radius, in particular, one-dim...
Hardy and Rellich type inequalities with an additional term are proved for compactly supported smoot...