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Schrodinger operators, operators on manifolds, general differential operators, numerical studies, integral operators, discrete models, resonances, non-self-adjoint operators, random operators/matrices
2
votes
Accepted
Massive dirac operator symmetric spectrum
With $z=x+iy$, we use the Fourier transformation in $(x,y)$ to see that $H$ is unitarily equivalent to
$$
\frac12\begin{pmatrix}2m&\xi-i\eta\\
\xi+i\eta&-2m\end{pmatrix},
\text{whose eigenvalues are } …
2
votes
1
answer
298
views
Weyl quantization and convexity
Let $C$ be a convex subset of $\mathbb R^{2n}$ and $\mathbf 1_C$ be the characteristic function of $C$. Is it true that
$$\forall u\in\mathscr S(\mathbb R^n),\quad
\langle\mathbf 1_C^{Weyl}u,u\rangle\ …
1
vote
0
answers
55
views
On various versions of the harmonic oscillator
The standard $n$-dimensional harmonic oscillator is the operator
$
\mathcal H=\frac{1}{2}\sum_{1\le j\le n}(D_j^2+x_j^2), \text{ $D_j=-i\partial_{x_j}$},
$
and its spectral decomposition is
$$
\mathca …
4
votes
2
answers
471
views
Gaps in the spectrum of Laplace-Beltrami operators
Let us consider $\mathbb S^d$ the unit Euclidean sphere of $\mathbb R^{d+1}$ and let $\Delta_{\mathbb S^d}$ be the Laplace operator on $\mathbb S^d$. We have
$$
-\Delta_{\mathbb S^d}=\sum_{k\in \mathb …
2
votes
2
answers
749
views
Self-adjoint extensions for pseudo-differential operators
The class $\Sigma^1$ of symbols on $\mathbb R^{2n}$ is made with $C^\infty$ functions $a$ of $X=(x,\xi)\in \mathbb R^n\times\mathbb R^n$ such that
$$
\vert\partial_X^\alpha a\vert\le C_\alpha(1+\vert …
0
votes
0
answers
103
views
Numerical error on the spectrum of a matrix
Let $Q=(q_{j,k})_{1\le j,k\le N}$ be a (Hermitian) $N\times N$ matrix with complex-valued entries. The matrix $Q$ is given numerically and the absolute error on each entry is bounded above by a (small …
2
votes
Lower bound of the spectrum of a Schrodinger operator on a bounded domain
Here are some very classical references:
M. Cwikel. Weak type estimates for singular values and the number of bound
states of Schrödinger operators. Ann. of Math. (2), 106(1):93–100, 1977.
E. Lieb. …
3
votes
Differentiability of eigenvalue and eigenvector on the non-simple case
Let me point out a more specific result for hyperbolic polynomials, known as Bronshtein's theorem (see e.g. the preprint https://arxiv.org/abs/1309.2150 by A. Parusinski & A. Rainer). Let $p(X,y)$ be …
4
votes
Commutator representation of certain smoothing operators
Take $f=g=1$, $\Delta$ the usual Laplace operator on $\mathbb S^1$, then
$$
C_0=\partial_\theta e^{\partial_\theta^2},
$$
can be identified to the diagonal infinite matrix
$
(ik e^{-k^2})_{k\in \mathb …
4
votes
Examples of potentials for which Schrödinger equation lacks discrete points in continuous sp...
Consider the (stationary) Schrödinger equation
$$
-\Delta u+ Vu=0,
$$
or the differential inequality
$\vert\Delta u \vert\le \vert V u\vert$, where $V$ is some "potential" function. The following uniq …
2
votes
wavefront is a coisotropic
Yes: look at Theorem 8.1.4 in the first volume of Hörmander's ALPDO (Springer Grund. 256). For the classical (conic) wave-front-set, given any closed conic set $S$, you can construct a distribution $u …
2
votes
Accepted
Exponential stability in nonlinear differential equations
Here is a statement, due to Lagrange. Take a square system $\dot x=f(x)$ with $f$
of class $C^2$
such that $f(0)=0$ and the spectrum of $df(0)$ is contained in
{$z\in \mathbb C , \Re{z}\le -\delta$} …
6
votes
0
answers
369
views
Paving conjecture for Toeplitz matrices
Let me first recall what is the so-called paving conjecture:
for any $\epsilon >0$, there exists $r\in \mathbb N$ such that
for any bounded operator $A$ on $\ell^2(\mathbb Z)$, there exists a partitio …