| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/PVS/metric_space/ Datei vom 28.9.2014 mit Größe 23 kB |
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Quelle horizontal_sq_dtca.pvs Sprache: PVS |
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horizontal_sq_dtca[D:posreal] : THEORY
BEGIN IMPORTING vect_analysis@vect_deriv_2D[real], tangent_line[D] V : VAR (differentiable_rv?) a,r : VAR real s : VAR Vect2 ss : VAR Ss_vect2 pm : VAR Sign horizontal_sq_dtca_diff : LEMMA (FORALL (a):nz_vect2?(V(a))) IMPLIES derivable?[real](LAMBDA (r: real): horizontal_sq_dtca(s, V(r)), r) horizontal_sq_dtca_deriv : LEMMA (FORALL (a):nz_vect2?(V(a))) IMPLIES deriv(LAMBDA(r:real):horizontal_sq_dtca(s,V(r)),r) = LET v = V(r), w = deriv_rv(V)(r) IN (2*sqv(v)*det(s,v)*det(s,w)-2*sq(det(s,v))*(v*w))/sq(sqv(v)) horizontal_sq_dtca_deriv_simpl : LEMMA (FORALL (a):nz_vect2?(V(a))) IMPLIES LET v = V(r), w = deriv_rv(V)(r) IN (2*sqv(v)*det(s,v)*det(s,w)-2*sq(det(s,v))*(v*w))/sq(sqv(v)) = 2*det(s,v)*det(V(r),w)*(s*V(r))/sq(sqv(v)) horizontal_sq_dtca_deriv_sign : LEMMA (FORALL (a):nz_vect2?(V(a))) AND line_solution?(ss,V(r)) IMPLIES (pm*deriv(LAMBDA(r:real):horizontal_sq_dtca(ss,V(r)),r) > 0 IFF LET v = V(r), w = deriv_rv(V)(r), eps = eps_line(ss,v) IN pm*(Q(ss,eps)*w) > 0) END horizontal_sq_dtca ¤ Dauer der Verarbeitung: 0.15 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28