Series solution to 2D Poisson's equation on a rectangle with Dirichlet boundary conditions.

There are some subtleties in this procedure that haven't been addressed. When we say the set $$ left{sinleft(frac{npi x}{L_x}right)sinleft(frac{npi x}{L_y}right):n,minmathbb{N}right} $$ forms a basis, what is meant is that it forms a basis for $L^2([0,L_x]times[0,L_y],mathbb{R})$. This space consists of equivalence classes of square integrable functions, that is, two functions $f$ and $g$ are considered equivalent in $L^2$ if $int|f-g|^2=0$, or equivalently if $f=g$ alomst everywhere. In this sense, every square integrable function, even those that do not vanish on the boundary, may be uniquely written as $$ f(x)equivsum_{n,m}B_{n,m}sinleft(frac{npi x}{L_x}right)sinleft(frac{npi x}{L_y}right) $$ with the understanding that $equiv$ denotes equivalence in $L^2$. This sum may not converge pointwise, and indeed will not if $f(0)neq 0$. However, with this caveat in mind, there's no loss of generality in writing a square integrable function this way.

When doing calculus on $L^2$ spaces, one should keep in mind that these functions need not be continuous, let alone differentiable (though if a class has a continuous representative, it is unique). Especially in physics, it's common to simply assume that derivatives exist and are will behaved w.r.t. summation; this can ususally be justified after the fact. Making this process more rigorous is the domain of functional analysis.