@article{MTMT:3038311,
	title = {Radon–Nikodym Theorems for Nonnegative Forms, Measures and Representable Functionals},
	url = {https://m2.mtmt.hu/api/publication/3038311},
	author = {Tarcsay, Zsigmond},
	doi = {10.1007/s11785-014-0437-4},
	journal-iso = {COMPLEX ANAL OPER TH},
	journal = {COMPLEX ANALYSIS AND OPERATOR THEORY},
	volume = {10},
	unique-id = {3038311},
	issn = {1661-8254},
	abstract = {The aim of this paper is to establish two Radon–Nikodym-type theorems for nonnegative Hermitian forms defined on a real or complex vector space and to apply these results to provide some known Radon–Nikodym-type theorems of the theory of representable positive functionals, (Formula presented.) -additive and finitely additive measures. © 2014, Springer Basel.},
	keywords = {DECOMPOSITION; ALGEBRAS; Measure; Set function; Radon-Nikodym theorem; Radon-Nikodym theorem; Absolute continuity; Hermitian form; Hermitian form; ADDITIVE SET FUNCTIONS},
	year = {2016},
	eissn = {1661-8262},
	pages = {479-494},
	orcid-numbers = {Tarcsay, Zsigmond/0000-0001-8102-5055}
}