I think Nate and Eli will get this without a lot of background set up. Let $$\omega(x) = \sum_{\mathfrak t : \underline L \nearrow \underline{NL}} \mathrm{Wr}(\mathbf p_{\mathfrak t}; x) \mathbf e_{\mathfrak t} \in \Lambda^L(V),$$ where… Read More »An Induction without Hypothesis
Let $K$ be a number field of degree $d$ over $\mathbb Q$. Let $\mathfrak F$ be the group of fractional ideals of $K$, and let $\mathcal N$ and $\mathfrak N$ be respectively the elements of… Read More »The Morm is Dead! Long Live the Morm!
A positive definite function $\Phi: \mathbb C[x] \rightarrow [0, \infty)$ is a multiplicative distance function if for any monic $f, g \in \mathbb C[x],$ $\Phi(f g) = \Phi(f) \Phi(g)$ and there exists a homogeneity degree… Read More »Multiplicative Distance Functions
In Nathan Hunter’s thesis, the inner product of two monomials $x^M$ and $x^L$, with $M \leq L$ are given as $$\begin{eqnarray}\langle x^M , x^L \rangle &=& 2 \pi \sum_{n=-NM}^M {M \choose \frac{NM + n}{N+1}} {L… Read More »Some Inner Product Calculations
Consider the Ferrer’s diagram for partition $\lambda \vdash N$. We slightly generalize the situation, and we consider Ferrer’s diagrams with some number of boxes deleted. We set $Y_n = Y_n(\lambda)$ to be the set of… Read More »A Holey Hook Walk
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