MATHEMATICA BOHEMICA, Vol. 121, No. 3, pp. 263-268, 1996

Note on functions satisfying the integral
Holder condition

Josef Kral

Josef Kral, Palackeho 500, 289 11 Pecky, Czech Republic

Abstract: Given a modulus of continuity $\omega$ and $q \in[1, \infty[ $ then $H_q^\omega$ denotes the space of all functions $f$ with the period $1$ on $\R$ that are locally integrable in power $q$ and whose integral modulus of continuity of power $q$ (see(1)) is majorized by a multiple of $ \omega$. The moduli of continuity $ \omega$ are characterized for which $H_q^\omega$ contains "many" functions with infinite "essential" variation on an interval of length $1$.

Keywords: integral modulus of continuity, variation of a function

Classification (MSC 1991): 26A15, 26A45, 26A16


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