Results 271 to 280 of about 33,049 (300)
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Inversion Formulas for a Cylindrical Radon Transform

SIAM Journal on Imaging Sciences, 2011
In this paper we study the inversion of a generalized Radon transform that maps a function in three dimensional space to a family of cylindrical integrals. We derive local backprojection-type inversion formulas for this cylindrical Radon transform. Our inversion formulas can be implemented in a straightforward manner with $\mathcal{O}(\mathtt{N}^{4/3})$
openaire   +2 more sources

Practical inversion formulas

Scandinavian Actuarial Journal, 1983
Abstract Various inversion formulas in terms of characteristic functions, moments and real Laplace transforms are studied from the viewpoint of practical applicability. A new inversion integral in terms of the characteristic function for integer-valued variables and a new moment inversion formula for variables in the unit interval are given.
openaire   +1 more source

Inversion formula for the windowed linear canonical transform

Applicable Analysis, 2022
Yaoyao Han, Wenchang Sun
exaly  

On the inversion formula for probability densities

1997
Let \(\varphi: \mathbb{R}^d \to\mathbb{C}\) be the characteristic function determined by a certain \(d\)-dimensional distribution function \(F:\mathbb{R}^d\to \langle 0,1 \rangle\subset \mathbb{R}\). Assuming that \(\varphi\) is square integrable, the author succeeds to derive from Lévy's inversion theorem a formula for the probability density of \(F\),
openaire   +1 more source

SOME INVERSION FORMULAE

The Quarterly Journal of Mathematics, 1940
openaire   +1 more source

Inversion Formulas

2000
Israel Gohberg   +2 more
openaire   +1 more source

An inversion formula for a Prandtl–Ishlinskii operator with time dependent thresholds

Physica B: Condensed Matter, 2011
Mohammad Al Janaideh, Pavel Krejčí
exaly  

An inversion formula for the Laplace transform

1992
For real, right continuous and bounded functions \(f\) with Laplace transform \(\phi\) the inversion formula \[ f(x)= \lim_{\varepsilon\to +0} \lim_{\lambda\to \infty} {1\over \varepsilon} \sum_{\lambda x< k\leq \lambda(x+ \varepsilon)}(- 1)^ k {\lambda^ k\over k!} \phi^{(k)}(\lambda) \] is proved for \(x\geq 0\).
openaire   +1 more source

Cluster variation method and M�bius inversion formula

Journal of Statistical Physics, 1990
Morita T
exaly  

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