代码搜索:triangular
找到约 1,594 项符合「triangular」的源代码
代码结果 1,594
www.eeworm.com/read/449130/7517947
m utriangsl.m
function [b,iflag] = utriangsl( A, b);
%
% UTRIANGSL solves an N by N linear system with
% upper triangular matrix.
%
% Usage
% [b,iflag] = utriangsl( A, b)
%
% input:
% A: the upper
www.eeworm.com/read/449130/7517951
m mychol.m
function [A,iflag] = mychol( A )
%
% Usage:
% [A,iflag] = mychol( A )
%
% Given a symmetric N by N matrix A, CHOL attempts
% to compute the Cholesky decomposition of A.
% (Inner product form.)
www.eeworm.com/read/449130/7517966
m ltriangsl.m
function [b,iflag] = ltriangsl( A, b);
%
% LTRIANGSL solves an N by N linear system with
% lower triangular matrix.
%
% Usage
% [b,iflag] = ltriangsl( A, b)
%
% input:
% A: the lower
www.eeworm.com/read/446452/7578445
m lineartriangleelementarea.m
function y = LinearTriangleElementArea(xi,yi,xj,yj,xm,ym)
%LinearTriangleElementArea This function returns the area of the
% linear triangular element whose first
%
www.eeworm.com/read/446452/7578486
m quadtriangleelementarea.m
function y = QuadTriangleElementArea(x1,y1,x2,y2,x3,y3)
%QuadTriangleElementArea This function returns the area of the
% quadratic triangular element whose first
%
www.eeworm.com/read/446452/7578494
m lineartriangleassemble.m
function y = LinearTriangleAssemble(K,k,i,j,m)
%LinearTriangleAssemble This function assembles the element
% stiffness matrix k of the linear
% t
www.eeworm.com/read/295916/8134827
m lineartriangleelementarea.m
function y = LinearTriangleElementArea(xi,yi,xj,yj,xm,ym)
%LinearTriangleElementArea This function returns the area of the
% linear triangular element whose first
%
www.eeworm.com/read/295916/8134875
m quadtriangleelementarea.m
function y = QuadTriangleElementArea(x1,y1,x2,y2,x3,y3)
%QuadTriangleElementArea This function returns the area of the
% quadratic triangular element whose first
%
www.eeworm.com/read/295916/8134881
m lineartriangleassemble.m
function y = LinearTriangleAssemble(K,k,i,j,m)
%LinearTriangleAssemble This function assembles the element
% stiffness matrix k of the linear
% t
www.eeworm.com/read/144399/12797404
m lunopiv.m
function [L,U] = luNopiv(A,ptol)
% luNopiv LU factorization without pivoting
%
% Synopsis: [L,U] = luNopiv(A)
% [L,U] = luNopiv(A,ptol)
%
% Input: A = coefficient matrix
%