fix(numerik summary): lagrange definition and indices
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@ -20,10 +20,13 @@ norm(A^(-1)) &= sup_(x != 0) norm(A^(-1) x)/ norm(x) =^(A^(-1)x = 1) sup_(z !=
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#table(columns: 4, align: center + horizon,
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#table(columns: 4, align: center + horizon,
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[Spaltensummennorm], $ norm(A)_1 = max_(m=1,...,N) sum_(n=1)^N abs(a_"nm") $,
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[Spaltensummennorm],
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$ norm(x)_1 = sum_(n=1)^N abs(x_n) $, [1-Norm],
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$ norm(A)_1 = max_(m=1,...,N) sum_(n=1)^N abs(a_"nm") $,
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[Zeilensummennorm], $ norm(A)_1 = max_(n=1,...,N) sum_(m=1)^N abs(a_"nm") $,
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$ norm(x)_1 = sum_(n=1)^N abs(x_n) $,
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$ max_(n=1,...,N) abs(x_n) $, [Maximumsnorm],
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[1-Norm],
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[Zeilensummennorm],
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$ norm(A)_oo = max_(n=1,...,N) sum_(m=1)^N abs(a_"nm") $,
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$ norm(x)_oo = max_(n=1,...,N) abs(x_n) $, [Maximumsnorm],
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[Spektralnorm], $ norm(A)_2 = sqrt("größter EW von " A^T A) $, $ norm(x)_2 = sqrt(sum_(n=1)^N x_n^2) $, [euklidische Norm]
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[Spektralnorm], $ norm(A)_2 = sqrt("größter EW von " A^T A) $, $ norm(x)_2 = sqrt(sum_(n=1)^N x_n^2) $, [euklidische Norm]
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@ -304,7 +307,7 @@ als:
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p(x) = sum_(n=0)^N f_n L_n (x) #h(1cm)
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p(x) = sum_(n=0)^N f_n L_n (x) #h(1cm)
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, L_n (x) = sum_(m=0,m != n)^N (x-x_m)/(x_n-x_m) = sigma_(n m) = cases(1 ", falls "
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, L_n (x) = product_(m=0,m != n)^N (x-x_m)/(x_n-x_m) = sigma_(n m) = cases(1 ", falls "
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x_m = x_n, 0 ", falls " x_m != x_n)
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x_m = x_n, 0 ", falls " x_m != x_n)
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@ -504,7 +507,7 @@ $
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cases(reverse: #true,
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cases(reverse: #true,
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s''_n (x_(n-1)) &= gamma_(n-1),
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s''_n (x_(n-1)) &= gamma_(n-1),
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s''_n (x_n) &= gamma_n
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s''_n (x_n) &= gamma_n
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) " damit " s''_n (x_n) = s''_(n-1) (x_n) = gamma_n
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) " damit " s''_n (x_n) = s''_(n+1) (x_n) = gamma_n
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$
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Dies sind 2N Gleichungen für die N+1 Unbekannten $gamma_0, ..., gamma_N$. Durch
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Dies sind 2N Gleichungen für die N+1 Unbekannten $gamma_0, ..., gamma_N$. Durch
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@ -587,9 +590,12 @@ Norm: $norm(f)_1 = I(abs(f))$
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=== Quadraturformeln
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=== Quadraturformeln
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integral_a^b f(x) d x approx integral_a^b p(x) d x = integral_a^b sum_(n=0)^N f(x_n)
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integral_a^b f(x) d x
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L_n (x) = sum_(n=0)^N integral_a^b L_n (x) d x f(x) = (b-a) sum_(k=1)^s b_k f( a +
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approx integral_a^b p(x) d x
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c_k (b-a))
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= integral_a^b sum_(n=0)^N f(x_n) L_n (x)
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= sum_(n=0)^N overbrace(integral_a^b L_n (x) d x, =(b-a)b_(n+1))
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f underbrace((x_n), #box()#place(horizon+center, $script(=a + c_(n+1)(b-a))$))
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= (b-a) sum_(k=1)^s b_k f( a + c_k (b-a))
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$
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$
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#table(columns: 3,
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#table(columns: 3,
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@ -619,13 +625,13 @@ $
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Für eine QF mit vorgegebenen Knoten $c_1 < ... c_s$ können die Gewichte genau
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Für eine QF mit vorgegebenen Knoten $c_1 < ... c_s$ können die Gewichte genau
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dann mi $b_k = integral_0^1 underbrace(L_k (x), #place(center, $L_k (x) = sum_(j=1,j != k)^s
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dann mit $b_k = integral_0^1 underbrace(L_k (x), #place(center, $L_k (x) = product_(j=1,j != k)^s
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(x-c_j)/(c_k - c_j)$)) d x$ eindeutig bestimmt werden wenn $p >= s$.
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(x-c_j)/(c_k - c_j)$)) d x$ eindeutig bestimmt werden wenn $p >= s$.
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*Symmetrische QF*:
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*Symmetrische QF*:
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b_k = b_(s+1-k) && c_k = 1 - c_(s+1-k) "also symmetrisch um "1/2" verteilt"
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b_k = b_(s+1-k) #h(1.5cm) ,c_k = 1 - c_(s+1-k) "also symmetrisch um "1/2" verteilt"
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Die Ordnung p einer symmetrischen QF ist gerade. #TODO[Beweis]
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Die Ordnung p einer symmetrischen QF ist gerade. #TODO[Beweis]
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