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Quelle finite_integral.pvs Sprache: PVS |
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% Integrals with finite measure % % Author: David Lester, Manchester University, NIA, Université Perpignan % % All references are to SK Berberian "Fundamentals of Real Analysis", % Springer, 1991 % % With finite measures (as in probability), every bounded measurable function % is integrable. % % Version 1.0 1/5/07 Initial Version %------------------------------------------------------------------------------ finite_integral[T:TYPE, (IMPORTING subset_algebra_def[T]) S:sigma_algebra, (IMPORTING measure_def[T,S]) mu:finite_measure]: THEORY BEGIN IMPORTING integral[T,S,to_measure(mu)] bounded_measurable_is_integrable: JUDGEMENT bounded_measurable SUBTYPE_OF integrable END finite_integral ¤ Dauer der Verarbeitung: 0.10 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28