628,134 research outputs found
Twisted Alexander Invariants of Twisted Links
Let L be an oriented (d+1)-component link in the 3-sphere, and let L(q) be
the d-component link in a homology 3-sphere that results from performing
1/q-surgery on the last component. Results about the Alexander polynomial and
twisted Alexander polynomials of L(q) corresponding to finite-image
representations are obtained. The behavior of the invariants as q increases
without bound is described.Comment: 21 pages, 6 figure
On the Phase Covariant Quantum Cloning
It is known that in phase covariant quantum cloning the equatorial states on
the Bloch sphere can be cloned with a fidelity higher than the optimal bound
established for universal quantum cloning. We generalize this concept to
include other states on the Bloch sphere with a definite component of spin.
It is shown that once we know the component, we can always clone a state
with a fidelity higher than the universal value and that of equatorial states.
We also make a detailed study of the entanglement properties of the output
copies and show that the equatorial states are the only states which give rise
to separable density matrix for the outputs.Comment: Revtex4, 6 pages, 5 eps figure
Explicit enumeration of triangulations with multiple boundaries
We enumerate rooted triangulations of a sphere with multiple holes by the
total number of edges and the length of each boundary component. The proof
relies on a combinatorial identity due to W.T. Tutte
Casimir interaction between a sphere and a grating
We derive the explicit expression for the Casimir energy between a sphere and
a 1D grating, in terms of the sphere and grating reflection matrices, and valid
for arbitrary materials, sphere radius, and grating geometric parameters. We
then numerically calculate the Casimir energy between a metallic (gold) sphere
and a dielectric (fused silica) lamellar grating at room temperature, and
explore its dependence on the sphere radius, grating-sphere separation, and
lateral displacement. We quantitatively investigate the geometrical dependence
of the interaction, which is sensitive to the grating height and filling
factor, and show how the sphere can be used as a local sensor of the Casimir
force geometric features. To this purpose we mostly concentrate on separations
and sphere radii of the same order of the grating parameters (here of the order
of one micrometer). We also investigate the lateral component of the Casimir
force, resulting from the absence of translational invariance. We compare our
results with those obtained within the proximity force approximation (PFA).
When applied to the sphere only, PFA overestimates the strength of the
attractive interaction, and we find that the discrepancy is larger in the
sphere-grating than in the sphere-plane geometry. On the other hand, when PFA
is applied to both sphere and grating, it provides a better estimate of the
exact results, simply because the effect of a single grating is underestimated,
thus leading to a partial compensation of errors.Comment: 16 pages, 7 figure
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