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Questions in which polynomials (single or several variables) play a key role. It is typically important that this tag is combined with other tags; polynomials appear in very different contexts. Please, use at least one of the top-level tags, such as nt.number-theory, co.combinatorics, ac.commutative-algebra, in addition to it. Also, note the more specific tags for some special types of polynomials, e.g., orthogonal-polynomials, symmetric-polynomials.

3 votes
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Division theorem for vector-valued distributions

The classical division theorem for scalar distributions on $\mathbb R^n$ can be formulated as follows. Let $T$ be a tempered distribution on $\mathbb R^n$ and let $P$ be a non-zero polynomial of $n$ …
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2 votes

Division theorem for vector-valued distributions

I think I have an answer to my own question : let us consider $Q$ the transposed of the comatrix of $P$. The determinant of $P$ is a polynomial and by the Lojasiewicz-Hörmander theorem, we can find a …
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7 votes

Symmetric version of Hilbert's seventeenth problem?

he proves that Every symmetric smooth fonction on $\mathbb R^n$ is equal to $g(\sigma_1,⋯,\sigma_n)$ for a $g$ smooth on $\mathbb R^n$, where $\sigma_1, \dots, \sigma_n$ are the elementary symmetric polynomials
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6 votes
Accepted

Multivariate Hermite Polynomials

In one dimension, you have $$ h_k(t)e^{-π t^2}=e^{π t^2}(\frac{d}{dt})^k\bigl(e^{-2π t^2}\bigr), $$ and $h_k$ is easily proven to be with degree $k$. The completeness question amounts to proving $L^2= …
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4 votes
Accepted

Closed formula for Hermite polynomials

Up to some normalization, the harmonic oscillator $H$ is self-adjoint such that $$ \langle Hu, u\rangle=\sum_{k\ge 0}(\frac12+k) \vert u_k\vert^2, $$ and thus defining a self-adjoint $A$ by the equali …
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