| Quellcodebibliothek Statistik Leitseite products/sources/formale Sprachen/PVS/matrices/ (Beweissystem der NASA Version 6.0.9©) Datei vom 28.9.2014 mit Größe 2 kB |
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Quellcode-Bibliothek matrix_upper_triang.pvs Sprache: PVS |
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matrix_upper_triang: THEORY
BEGIN IMPORTING matrix_det SM,SM1,SM2: VAR FullMatrix r: VAR real nzr: VAR nzreal M,N,A,B: VAR Matrix v,v1,v2: VAR Vector i,j,k,p : VAR nat m,n : VAR nat pn,pm : VAR posnat F,G: VAR [[nat,nat]->real] Mp,Np: VAR (nonempty?) PFM,D1,D2,D: VAR PosFullMatrix SQ,IQ,GQ, SQ2,IQ2,GQ2,DQ,DQ2, Q,R,S,T, Q2,R2,S2,T2: VAR Square ut_point1(SQ)(j): bool = j<rows(SQ) AND (FORALL (k,p):p<j AND k>p AND k<rows(SQ) IMPLIES entry(SQ)(k,p)=0) ut_point2(SQ,j)(i): bool = i<rows(SQ) AND i>=j AND (FORALL (k):k>i AND k<rows(SQ) IMPLIES entry(SQ)(k,j)=0) % j is the column, i is the row. j comes first as an input upper_triangulate(pn)(comp_matrix,comp_inverse:bool, S:SquareMatrix(pn), (Q:SquareMatrix(pn)|is_simple_prod?(pn,false,false)(Q)), (R:SquareMatrix(pn)|is_simple_prod?(pn,false,false)(R) AND (comp_matrix AND comp_inverse IMPLIES (R*Q=Id(pn) AND Q*R=Id(pn)))), (T:SquareMatrix(pn)|comp_matrix IMPLIES Q*T = S), (j|ut_point1(S)(j)),(i|ut_point2(S,j)(i)),stop_rec:bool,k): RECURSIVE {SGI:[SquareMatrix(pn),SquareMatrix(pn),SquareMatrix(pn)]| (not stop_rec) IMPLIES (LET (S2,Q2,R2)=SGI IN upper_triangular?(S2) AND (comp_matrix IMPLIES Q2*T=S2 AND is_simple_prod?(pn,false,false)(Q2)) AND (comp_matrix AND comp_inverse IMPLIES (R2*Q2=Id(pn) AND Q2*R2=Id(pn) AND is_simple_prod?(pn,false,false)(R2))) AND det(S2)=det(S))} = IF (stop_rec AND k=0) OR (i=pn-1 AND j=pn-1) THEN (S,Q,R) ELSIF i=j THEN upper_triangulate(pn)(comp_matrix,comp_inverse,S,Q,R,T,j+1,pn-1,stop ELSIF entry(S)(i,j)=0 THEN upper_triangulate(pn)(comp_matrix,comp_inverse,S,Q,R,T,j ELSIF entry(S)(j,j)=0 THEN upper_triangulate(pn)(comp_matrix,comp_inverse, replace_row(j,row(S)(j)+row(S)(i))(S), IF comp_matrix THEN replace_row(j,row(Q)(j)+row(Q)(i))(Q) ELSE Id(pn) ENDIF, IF comp_matrix AND comp_inverse THEN R*Easr(pn)(j,i,-1) ELSE Id(pn) ENDIF, T,j,i,stop_rec,max(k-1,0)) ELSE LET pivnum = -entry(S)(i,j)/entry(S)(j,j) IN upper_triangulate(pn)(comp_matrix,comp_inverse, replace_row(i,row(S)(i)+pivnum*row(S)(j))(S), IF comp_matrix THEN replace_row(i,row(Q)(i)+pivnum*row(Q)(j))(Q) ELSE Id(pn) ENDIF, IF comp_matrix AND comp_inverse THEN R*Easr(pn)(i,j,-pivnum) ELSE Id(pn) ENDIF, T,j,i-1,stop_rec,max(k-1,0)) ENDIF MEASURE lex3(pn-j,i,IF entry(S)(i,j)/=0 AND entry(S)(j,j)=0 THEN 1 ELSE 0 ENDIF) END matrix_upper_triang ¤ Die Informationen auf dieser Webseite wurden nach bestem Wissen sorgfältig zusammengestellt. Es wird jedoch weder Vollständigkeit, noch Richtigkeit, noch Qualität der bereit gestellten Informationen zugesichert.0.0Bemerkung: (vorverarbeitet) ¤*Bot Zugriff |
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