I do not work in algebra, so i apologize in advance if there are some unclear/wrong sentences. Let us consider the ring $\mathbb{C}[X_1,\ldots,X_q]$ of polynomials in $q$ variables. For an ideal $I$ of this ring we associate its variety $$V(I) = \left\lbrace(x_1,\ldots,x_q)\in\mathbb{C}^q \quad\middle | \quad P(x_1,\ldots,x_q) = 0\quad\forall P\in I\right\rbrace.$$ I'm interested in the set $$E = \left\lbrace I\text{ ideals of } \mathbb{C}[X_1,\ldots,X_q]\quad\middle |\quad V(I) = \lbrace(0,\ldots,0)\rbrace\right\rbrace$$ That is, the sets of ideals whose corresponding algebraic variety consists only in the origin point. One can define the multiplicity of an element ideal $I$ in $E$ as $$mult(I) = \dim \mathbb{C}[X_1,\ldots,X_q]/I,$$ and for $p\geq 1$ the space $$E_p = \left\lbrace I\in E\quad\middle |\quad mult(I) = p\right\rbrace.$$ Is there any known natural differentiable structure on the space $E_p$ ?
Following this article, an ideal in $E_p$ can be described as a collection of $p$ differential conditions at the origin, who must satisfies some closeness condition (in order to be an ideal). Thus a natural topology would be the topology induced by the Grassmannian $Gr(p,V)$, where $V$ is the set of differential operators whose order do not exceed $p-1$.
Second question, can we prove that topologically, $$\dim(E_p) = (p-1)(q-1)\quad ?$$ For instance if $q=1$ then $E_p$ consists in the only ideal $\langle X^p\rangle$ and thus $\dim(E_p) = 0$. For $q>1$, there is a one-to-one correspondence between $E_2$ and $\mathbb{S}^{q-1}$ given by the mapping $$\theta\mapsto \left\lbrace\quad P \quad\middle|\quad P(0) = 0\quad\text{and}\quad \partial_\theta P(0) = 0 \right\rbrace,$$ it yields $\dim(E_2) = q-1$. On can also prove in a similar fashion that $\dim(E_3) = 2(q-1)$ but for $p>3$ it gets a bit messy.
