The answer is no. Let $\kappa$ be any infinite cardinal and assume for a contradiction that there is a set $E\subseteq\mathcal P(\kappa)$ satisfying your conditions. I will call the elements of $\kappa$ *points* and the elements of $E$ *lines*.

First note that there are $\lt\kappa$ lines through any point. For consider any point $\alpha$ and let $\lambda$ be the number of lines through $\alpha$.Choose a point $\beta\ne\alpha$ and a line $e$ which is incident with $\beta$ but not with $\alpha$. Since each line incident with $\alpha$ meets $e$ in a different point, $\lambda\le|e|\lt\kappa$.

Now choose two distinct points $\alpha$ and $\beta$. Say there are $\lambda$ lines through $\alpha$ and $\mu$ lines through $\beta$. Let $e$ be the line through $\alpha$ and $\beta$. Now every point which is not on the line $e$ is the intersection of a line through $\alpha$ and a line through $\beta$. Hence $\kappa\le|e|+\lambda\mu\lt\kappa$ which is absurd.