MATLAB Eigen with libigl Notes
[Y,IX] = sort(X,dim,mode)
MATLAB version allows Y to be a multidimensional matrix, but the Eigen version is only for 1D or 2D matrices.
B(i:(i+w),j:(j+h)) = A(x:(x+w),y:(y+h))
B.block(i,j,w,h) = A.block(i,j,w,h)
MATLAB version would allow w and h to be non-positive since the colon operator evaluates to a list of indices, but the Eigen version needs non-negative width and height values.
Find the maximum coefficient over all entries of the matrix.
Find the minimum coefficient over all entries of the matrix.
MatrixXd::Identity(w,h), MatrixXf::Identity(w,h), etc.
A(i:(i+w),j:(j+h)) = eye(w,h)
[I,J,V] = find(X)
Matlab supports finding subscripts (I and J) as well as indices (just I), but so far igl::find only supports subscripts. Also, igl::find requires X to be sparse.
X(:,j) = X(:,j) + x
X.col(j).array() += x
Acol_sum = sum(A,1)
Arow_sum = sum(A,2)
Adim_sum = sum(Asparse,dim)
Acol_sum = A.colwise().sum()
Arow_sum = A.rowwise().sum()
Currently the igl version only supports sparse matrix input (and dim must be 1 or 2)
D = diag(M)
Extract the main diagonal of a matrix. Currently igl version supports sparse only.
M = diag(D)
Construct new square matrix M with entries of vector D along the diagonal. Currently igl version supports sparse only.
[Y,I] = max(X,[],dim)
Matlab has a bizarre convention of passing [] as the second argument to mean take the max/min along dimension dim.
Y = max(X,[],1)
Y = max(X,[],2)
Y = min(X,[],1)
Y = min(X,[],2)
Y = X.colwise().maxCoeff()
Y = X.rowwise().maxCoeff()
Y = X.colwise().minCoeff()
Y = X.rowwise().minCoeff()
Matlab allows you to obtain the indices of extrema see mat_max
C = A.*B
C = (A.array() * B.array()).matrix()
C = A.^b
C = A.array().pow(b).matrix()
A(B == 0) = C(B==0)
A = (B.array() == 0).select(C,A)
C = A + B'
SparseMatrixType BT = B.transpose()
SparseMatrixType C = A+BT;
Do not attempt to combine .transpose() in expression like this:
C = A + B.transpose()
[L,p] = chol(A)
SparseLLT<SparseMatrixType> A_LLT(A.template triangularView<Lower>())
SparseMatrixType L = A_LLT.matrixL();bool p = (L*0).eval().nonZeros()==0;
Do not attempt to use A in constructor of A_LLT like this:
SparseLLT<SparseMatrixType> A_LLT(A)

Do not attempt to use A_LLT.succeeded() to determine if Cholesky factorization succeeded, like this:
bool p = A_LLT.succeeded()
X = U\(L\b)
X = b;
L.template triangularView<Lower>().solveInPlace(X);
U.template triangularView<Upper>().solveInPlace(X);
Expects that L and U are lower and upper triangular matrices respectively
B = repmat(A,i,j)
B = A.replicate(i,j);
igl::repmat is also implemented for Sparse Matrices.
I = low:step:hi
// or
const int size = ((hi-low)/step)+1;
I = VectorXi::LinSpaced(size,low,low+step*(size-1));
IGL version should be templated enough to handle same situations as matlab's colon. The matlab keyword end does not correspond in the C++ version. You'll have to use M.size(),M.rows() or whatever.
O = ones(m,n)
Matrix* O = Matrix*::Ones(m,n)
O = zeros(m,n)
Matrix* O = Matrix*::Zero(m,n)
B = A(I,J)
B = A(I,:)
This is only for the case when I and J are lists of indices and not vectors of logicals.
B(I,J) = A
B(I,:) = A
This is only for the case when I and J are lists of indices and not vectors of logicals.
M = mode(X,dim)
B = arrayfun(FUN, A)
B = A.unaryExpr(ptr_fun(FUN))
If FUN is templated, the templates must be fully resolved.
B = fliplr(A)
B = flipud(A)
B = A.rowwise().reverse().eval()
B = A.colwise().reverse().eval()
The .eval() is not necessary if A != B
B = IM(A)

A = IM(A);
B = A.unaryExpr(bind1st(mem_fun( 
  (&VectorXi::operator())), &IM)).eval();
// or
for_each(,,[&IM](int & a){a=IM(a);});
Where IM is an "index map" column vector and A is an arbitrary matrix. The .eval() is not necessary if A != B, but then the second option should be used.
A = sparse(I,J,V)
// build std::vector<Eigen::Triplet> IJV
IJV and A should not be empty! (this might be fixed)
A = min(A,c);
C.array() = A.array().min(c);
Coefficient-wise minimum of matrix and scalar (or matching size matrix)
IP = I(P==0);
I = VectorXi::LinSpaced(10,0,9);
VectorXi IP = I;
  [&P](int i){return P(i)==0;});
Where I is a vector of increasing indices from 0 to n, and P is a vector. Requires C++11 and #include <algorithm>
B = A(R<2,C>1);
B = igl::slice_mask(A,R.array()<2,C.array()>1);
a = any(A(:))
bool a = any_of(,,[](bool a){ return a;});
bool a = A.array().any();
Casts Matrix::Scalar to bool.
B = mod(A,2)
Eigen's "ASCII Quick Reference" with MATLAB translations
IGL Lib Tutorial