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On a Class of Fractional Type Integral Equations in Variable Exponent Spaces

Rafeiro, Humberto, Samko, Stefan (2007)

Fractional Calculus and Applied Analysis

2000 Mathematics Subject Classification: 45A05, 45B05, 45E05,45P05, 46E30We obtain a criterion of Fredholmness and formula for the Fredholm index of a certain class of one-dimensional integral operators M with a weak singularity in the kernel, from the variable exponent Lebesgue space L^p(·) ([a, b], ?) to the Sobolev type space L^α,p(·) ([a, b], ?) of fractional smoothness. We also give formulas of closed form solutions ϕ ∈ L^p(·) of the 1st kind integral equation M0ϕ = f, known as the generalized...

On a converse inequality for maximal functions in Orlicz spaces

H. Kita (1996)

Studia Mathematica

Let Φ ( t ) = ʃ 0 t a ( s ) d s and Ψ ( t ) = ʃ 0 t b ( s ) d s , where a(s) is a positive continuous function such that ʃ 1 a ( s ) / s d s = and b(s) is quasi-increasing and l i m s b ( s ) = . Then the following statements for the Hardy-Littlewood maximal function Mf(x) are equivalent: (j) there exist positive constants c 1 and s 0 such that ʃ 1 s a ( t ) / t d t c 1 b ( c 1 s ) for all s s 0 ; (jj) there exist positive constants c 2 and c 3 such that ʃ 0 2 π Ψ ( ( c 2 ) / ( | | ) | ( x ) | ) d x c 3 + c 3 ʃ 0 2 π Φ ( 1 / ( | | ) ) M f ( x ) d x for all L 1 ( ) .

On a relation between norms of the maximal function and the square function of a martingale

Masato Kikuchi (2013)

Colloquium Mathematicae

Let Ω be a nonatomic probability space, let X be a Banach function space over Ω, and let ℳ be the collection of all martingales on Ω. For f = ( f ) n , let Mf and Sf denote the maximal function and the square function of f, respectively. We give some necessary and sufficient conditions for X to have the property that if f, g ∈ ℳ and | | M g | | X | | M f | | X , then | | S g | | X C | | S f | | X , where C is a constant independent of f and g.

On certain porous sets in the Orlicz space of a locally compact group

Ibrahim Akbarbaglu, Saeid Maghsoudi (2012)

Colloquium Mathematicae

Let G be a locally compact group with a fixed left Haar measure. Given Young functions φ and ψ, we consider the Orlicz spaces L φ ( G ) and L ψ ( G ) on a non-unimodular group G, and, among other things, we prove that under mild conditions on φ and ψ, the set ( f , g ) L φ ( G ) × L ψ ( G ) : f * g is well defined on G is σ-c-lower porous in L φ ( G ) × L ψ ( G ) . This answers a question raised by Głąb and Strobin in 2010 in a more general setting of Orlicz spaces. We also prove a similar result for non-compact locally compact groups.

On CLUR points of Orlicz spaces

Quandi Wang, Liang Zhao, Tingfu Wang (2000)

Annales Polonici Mathematici

Criteria for compactly locally uniformly rotund points in Orlicz spaces are given.

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