In [5] an analogue of the classical Dini-Riemann theorem related to non-absolutely convergent series of real number is obtained for the Lebesgue improper integral. Here we are extending it to the case of the Henstock integral.

Rao, G., Tulone, F. (2009). HENSTOCK INTEGRAL AND DINI-RIEMANN THEOREM. LE MATEMATICHE, LE MATEMATICHE Vol. LXIV (2009) – Fasc. II, pp. 71–77(II), 71-77.

HENSTOCK INTEGRAL AND DINI-RIEMANN THEOREM

RAO, Giuseppe;TULONE, Francesco
2009-01-01

Abstract

In [5] an analogue of the classical Dini-Riemann theorem related to non-absolutely convergent series of real number is obtained for the Lebesgue improper integral. Here we are extending it to the case of the Henstock integral.
2009
Settore MAT/05 - Analisi Matematica
Rao, G., Tulone, F. (2009). HENSTOCK INTEGRAL AND DINI-RIEMANN THEOREM. LE MATEMATICHE, LE MATEMATICHE Vol. LXIV (2009) – Fasc. II, pp. 71–77(II), 71-77.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10447/49301
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