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arXiv:1212.1695 [math.CA]Abstract References Reviews Resources

On a weighted variable spaces $L_{p(x), ω}$ for $0< p(x)< 1$ and weighted Hardy inequality

Published 2012-12-07Version 1

In this paper a weighted variable exponent Lebesgue spaces $L_{p(x), \omega}$ for $0< p(x)< 1$ is investigated. We show that this spaces is a quasi-Banach spaces. Note that embedding theorem between weight variable Lebesgue spaces is proved. In particular, we show that $L_{p(x), \omega}(\Omega)$ for $0< p(x)< 1$ isn't locally convex. Also, in this paper a some two-weight estimates for Hardy operator are proved.

Categories: math.CA

Keywords: weighted hardy inequality, weighted variable spaces, weight variable lebesgue spaces, weighted variable exponent lebesgue spaces, quasi-banach spaces

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arXiv:1212.1695 [math.CA]Abstract References Reviews Resources

On a weighted variable spaces $L_{p(x), ω}$ for $0< p(x)< 1$ and weighted Hardy inequality

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On a weighted variable spaces $L_{p(x), ω}$ for $0< p(x)< 1$ and weighted Hardy inequality

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arXiv:1212.1695 [math.CA]Abstract References Reviews Resources