Orthonormal matrix
An orthonormal matrix is a matrix whose column vectors are orthonormal. In other words, if G is an n-by-k orthonormal matrix then G*G=In, the identity matrix.
Moreover, if k<n then there exists an n-by-(n-k) orthonormal matrix H such that U=(G H) is a unitary matrix.
If G is real then H can chosen to be real and U is therefore an orthogonal matrix.
Of course, unitary matrix and orthogonal matrix are orthonormal matrices.