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Quelle indefinite_integral.pvs Sprache: PVS |
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indefinite_integral[T: TYPE+ FROM real]: THEORY
%------------------------------------------------------------------------------ % % Author: Rick Butler NASA Langley % % convention: % Definite integral : Integral(a,b,f) % Indefinite integral: integral(f) % %------------------------------------------------------------------------------ BEGIN ASSUMING IMPORTING deriv_domain_def[T] connected_domain : ASSUMPTION connected?[T] not_one_element : ASSUMPTION not_one_element?[T] ENDASSUMING deriv_domain: LEMMA deriv_domain?[T] IMPORTING integral[T], derivative_props[T] a,b,c,x: VAR T f,g,F,G,H: VAR [T -> real] antiderivative?(F,f): bool = derivable?(F) AND deriv(F) = f antiderivative_lem: LEMMA antiderivative?(F,f) AND derivable?(G) AND deriv(G) = f IMPLIES (EXISTS (c: real): F = G + const_fun(c)) derivs_eq: THEOREM derivable?(F) AND derivable?(G) AND deriv(F) = deriv(G) IMPLIES (EXISTS (c: real): F = G + const_fun(c)) % ------ indefinite integral defined over continuous functions ------ integrable?(f): bool = (EXISTS F: antiderivative?(F,f)) integrable_fun: TYPE = { f | integrable?(f)} IMPORTING fundamental_theorem[T] cont_fun_integrable?: LEMMA continuous?(f) IMPLIES integrable?(f) integral(f: integrable_fun): { F: [T -> real] | derivable?(F) AND deriv(F) = f } integral_lem: LEMMA integrable?(f) AND integral(f) = F AND derivable?(G) AND deriv(G) = f IMPLIES (EXISTS (c: real): F = G + const_fun(c)) deriv_integ: LEMMA derivable?(F) IMPLIES integrable?[T](deriv(F)) indef_integral_thm : THEOREM derivable?(F) IMPLIES (EXISTS (c: real): integral(deriv(F)) = F + const_fun(c)) fundamental_indef : THEOREM continuous?(f) IMPLIES Integrable?(a,b,f) AND Integral(a,b,f) = integral(f)(b) - integral(f)(a) END indefinite_integral ¤ Dauer der Verarbeitung: 0.0 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28