The journal Rendiconti dell’Istituto di Matematica dell’università di Trieste publishes original articles in all areas of mathematics. Special regard is given to research papers, but attractive expository papers may also be considered for publication.
The journal usually appears in one issue per year. Additional issues may however be published. In particular, the Managing Editors may consider the publication of supplementary volumes related to some special events, like conferences, workshops, and advanced schools.
All submitted papers will be refereed. Manuscripts are accepted for review with the understanding that the work has not been published before and is not under consideration for publication elsewhere.
Our journal can be obtained by exchange agreements with other similar journals.
Instructions for Authors
Authors are invited to submit their papers by e-mail directly to one of the Managing Editors in PDF format.
All the correspondence regarding the submission and the editorial process of the paper are done by e-mail. Papers have to be written in one of the following languages: English, French, German, or Italian. Abstracts should not exceed ten printed lines, except for papers written in French, German, or Italian,
for which an extended English summary is required.
After acceptance, manuscripts have to be prepared in LaTeX using the style rendiconti.cls which can be downloaded from the web page.
Any figure should be recorded in a single PDF, PS (PostScript), or EPS (Encapsulated PostScript) file.
Browsing Rendiconti dell'Istituto di Matematica dell'Università di Trieste: an International Journal of Mathematics vol.28 (1996) by Author "Boccuto, Antonio"
(Università degli Studi di Trieste. Dipartimento di Scienze Matematiche, 1996)
Sambucini, Anna Rita
Si definisce un integrale del tipo "Burkill-Cesari" per funzioni d'insieme a valori in spazi di Riesz Dedekind completi. Si introduce un concetto di quasi-additività, simile a quello introdotto da Lamberto Cesari in . Si provano alcuni teoremi analoghi a quelli classici, e si confronta l'integrale introdotto con quello di Riemann e con quello monotono di cui in .