Sequential convergence of regular measures on prehilbert space logics

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Title:	Sequential convergence of regular measures on prehilbert space logics
Authors:	Chetcuti, Emanuel de Lucia, Paolo 顿惫耻谤别膷别苍蝉办颈箩,&#虫20;础苍补迟辞濒颈箩
Keywords:	Hilbert space Inner product spaces Stochastic partial differential equations Lebesgue-Radon-Nikodym theorems Gleason measures
Issue Date:	2006
Publisher:	Elsevier
Citation:	颁丑别迟肠耻迟颈,&#虫20;贰.,&#虫20;诲别&#虫20;尝耻肠颈补,&#虫20;笔.,&#虫20;&补尘辫;&#虫20;顿惫耻谤别膷别苍蝉办颈箩,&#虫20;础.&#虫20;(2006).&#虫20;厂别辩耻别苍迟颈补濒&#虫20;肠辞苍惫别谤驳别苍肠别&#虫20;辞蹿&#虫20;谤别驳耻濒补谤&#虫20;尘别补蝉耻谤别蝉&#虫20;辞苍&#虫20;辫谤别丑颈濒产别谤迟&#虫20;蝉辫补肠别&#虫20;濒辞驳颈肠蝉.&#虫20;闯辞耻谤苍补濒&#虫20;辞蹿&#虫20;惭补迟丑别尘补迟颈肠补濒&#虫20;础苍补濒测蝉颈蝉&#虫20;补苍诲&#虫20;础辫辫濒颈肠补迟颈辞苍蝉,&#虫20;318(1),&#虫20;199-210.
Abstract:	This paper investigates Nikodym-type and Cafiero-type convergence theorems for regular charges in the general set-up of projection logics of prehilbert spaces. For this aim we also characterize bounded regular charges.
URI:	https://www.um.edu.mt/library/oar/handle/123456789/135710
Appears in Collections:	Scholarly Works - FacSciMat

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