代码搜索:Lagrangian

找到约 54 项符合「Lagrangian」的源代码

代码结果 54
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www.eeworm.com/read/338369/3318133

m lagrangian_fun_log.m

function L = Lagrangian_Fun_Log(w, N, aimFair, aveSNR, lambda) [T F] = T_F_w_Log(w, N, aimFair, aveSNR); L = T + lambda .* F;
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www.eeworm.com/read/338369/3318154

m lagrangian_fun_jain.m

function L = Lagrangian_Fun_Jain(w, N, aimFair, aveSNR, lambda) [T F] = T_F_w_Jain(w, N, aimFair, aveSNR); L = T + lambda .* F;
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www.eeworm.com/read/338369/3318166

m lagrangian_fun_gini.m

function L = Lagrangian_Fun_Gini(w, N, aimFair, aveSNR, lambda) [T F] = T_F_w_Gini(w, N, aimFair, aveSNR); L = T + lambda .* F;
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www.eeworm.com/read/338369/3318263

m lagrangian_fun_log.m

function L = Lagrangian_Fun_Log(w, N, aimFair, mean, sigma, lambda) [T F] = T_F_w_Log(w, N, aimFair, mean, sigma); L = T + lambda .* F;
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www.eeworm.com/read/338369/3318284

m lagrangian_fun_jain.m

function L = Lagrangian_Fun_Jain(w, N, aimFair, mean, sigma, lambda) [T F] = T_F_w_Jain(w, N, aimFair, mean, sigma); L = T + lambda .* F;
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www.eeworm.com/read/338369/3318297

m lagrangian_fun_gini.m

function L = Lagrangian_Fun_Gini(w, N, aimFair, mean, sigma, lambda) [T F] = T_F_w_Gini(w, N, aimFair, mean, sigma); L = T + lambda .* F;
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www.eeworm.com/read/427511/8938506

m polyinterp.m

function v = polyinterp(x,y,u) %POLYINTERP Polynomial interpolation. % v = POLYINTERP(x,y,u) computes v(j) = P(u(j)) where P is the % polynomial of degree d = length(x)-1 with P(x(i)) = y(i).
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www.eeworm.com/read/167116/9980409

m polyinterp.m

function v = polyinterp(x,y,u) %POLYINTERP Polynomial interpolation. % v = POLYINTERP(x,y,u) computes v(j) = P(u(j)) where P is the % polynomial of degree d = length(x)-1 with P(x(i)) = y(i). %
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www.eeworm.com/read/166823/9996353

m yangtiaofinal.m

%姓名:汪建强 学号:1050729035 班级:B0507291 clear A=ones(1,21); B=ones(1,21); X=sym('X'); J=1;F=0; %-------------------------------------------------------------------------- for K=2:0.1:4 %---求解拟合前函数的值
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www.eeworm.com/read/464335/7165216

m polyinterp.m

function v = polyinterp(x,y,u) %POLYINTERP Polynomial interpolation. % v = POLYINTERP(x,y,u) computes v(j) = P(u(j)) where P is the % polynomial of degree d = length(x)-1 with P(x(i)) = y(i).
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