Qualifying parabolic mirrors with deflectometry
نویسندگان
چکیده
منابع مشابه
Ultra-precise characterization of LCLS hard X-ray focusing mirrors by high resolution slope measuring deflectometry.
We present recent results on the inspection of a first diffraction-limited hard X-ray Kirkpatrick-Baez (KB) mirror pair for the Coherent X-ray Imaging (CXI) instrument at the Linac Coherent Light Source (LCLS). The full KB system - mirrors and holders - was under inspection by use of high resolution slope measuring deflectometry. The tests confirmed that KB mirrors of 350mm aperture length char...
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so ‖f‖p ≤ ‖f‖q · μ(X) 1 p − 1 q . Hence if f is in Lq, the left-hand side is finite hence so is the right-hand side, so f is in Lp. Also, the inequality shows that if ‖f‖p is small then ‖f‖q is also small, hence the inclusion Lq ↪→ Lp is continuous 2. Let X ⊂ Pn be an irreducible projective variety of dimension k, G(`, n) the Grassmannian of `-planes in Pn for some ` < n− k, and C(X) ⊂ G(`, n) ...
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2. (T) Let CPn be complex projective n-space. (a) Describe the cohomology ring H∗(CPn,Z) and, using the Kunneth formula, the cohomology ring H∗(CPn × CPn,Z). (b) Let ∆ ⊂ CPn×CPn be the diagonal, and δ = i∗[∆] ∈ H2n(CP×CP,Z) the image of the fundamental class of ∆ under the inclusion i : ∆ → CPn × CPn. In terms of your description of H∗(CPn × CPn,Z) above, find the Poincaré dual δ∗ ∈ H2n(CPn × C...
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1. (a) Prove that the Galois group G of the polynomial X6 + 3 over Q is of order 6. (b) Show that in fact G is isomorphic to the symmetric group S3. (c) Is there a prime number p such that X6 + 3 is irreducible over the finite field of order p? Solution. We initially work over any field k in which the polynomial X6 + 3 is irreducible. Clearly k cannot have characteristic 2 or 3. Let α be a root...
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ژورنال
عنوان ژورنال: Journal of the European Optical Society: Rapid Publications
سال: 2013
ISSN: 1990-2573
DOI: 10.2971/jeos.2013.13014