I was going through some literature regarding virtual element function spaces.
I was wondering if it is possible for a function $v_h$ to exist such that $v_h \notin P_k$ but $\Delta v_h \in P_{k-2}$ for dimensions greater than or equal to $2$.
Thanks in advance!
If $v$ is a polynomial, add a harmonic function that is not a polynomial. E.g. in dimension $2$, the real part of a non-polynomial entire function of $z = x+iy$ will do.