From typing `help slash`

at the command prompt:

\ Backslash or left division.

A\B is the matrix division of A into B, which is roughly the same as
INV(A)*B , except it is computed in a different way. If A is an N-by-N
matrix and B is a column vector with N components, or a matrix with
several such columns, then X = A\B is the solution to the equation A*X
= B. A warning message is printed if A is badly scaled or nearly singular. A\EYE(SIZE(A)) produces the inverse of A.

If A is an M-by-N matrix with M < or > N and B is a column vector with M
components, or a matrix with several such columns, then X = A\B is the
solution in the least squares sense to the under- or overdetermined
system of equations A*X = B. The effective rank, K, of A is determined
from the QR decomposition with pivoting. A solution X is computed
which has at most K nonzero components per column. If K < N this will
usually not be the same solution as PINV(A)*B. A\EYE(SIZE(A))
produces a generalized inverse of A.

So, the second paragraph applies to your case. In other words, there is no `H`

that can satisfy `A*H = b`

for your problem, but Matlab computes the best approximation to it (in a least-squares sense). So the result you get is correct.