• Aucun résultat trouvé

Ideal polyhedral surfaces in Fuchsian manifolds

N/A
N/A
Info
Télécharger
Protected

Academic year: 2021

Partager "Ideal polyhedral surfaces in Fuchsian manifolds"

Copied!
29
0
0

Chargement.... (Voir le texte intégral maintenant)

Texte intégral

Figure

Fig. 1 To the proof of Lemma 2.3
Fig. 2 A semi-ideal ultraparallel trapezoid. Ideal vertices are equipped with horocycles
Fig. 3 A semi-ideal prism. Ideal vertices are equipped with horospheres
Fig. 4 To the proof of Lemma 3.6
+2

Références

Télécharger maintenant ( PDF - 29 Page - 868.41 KB )

Documents relatifs

AN EXPLICIT UPPER BOUND FOR THE LEAST PRIME IDEAL IN THE CHEBOTAREV DENSITY

Xylouris, “On the least prime in an arithmetic progression and estimates for the zeros of Dirichlet L-functions”, Acta Arith. Zaman, “Explicit estimates for the zeros of

The specific order on ExcU is defined as follows: for ξ, ξ0 ∈ExcU we haveξ ξ0 if and only if there exists η ∈ExcU such thatξ+η=ξ0

Boboc, Excessive functions and excessive measures: Hunt’s theorem on balayages, quasi-continuity.. Worpshop Classical and Modern Potential Theory and Appl., NATO ASI Series C

In this note we show that, for any power bounded elementaofA,θ=σ(A, A∗)−limn→∞(1+a2 )n exists,θ is an idempotent and θa=aθ=θ

To prove that the sequence (a n ) n≥0 converges in the weak ∗ topol- ogy of A , since this sequence is bounded, it is enough to prove that it has only one weak ∗ cluster

θ(cos θ, sin θ) −θ(cos θ,−sin θ) θ−π/2(sin θ,−cos θ) −θ−π/2(−sin θ,−cos θ) θ+π(−cos θ,−sin θ) −θ+π(−cos θ, sin θ) θ+π/2(−sin θ, cos θ) −θ+π/2(sin θ, cos θ

[r]

v(t) = E. v(t) E~ and E, is the projection on o~r Especially, if dim ~, = 1, we have (lb)

all the q~k correspond to finite energy states, i.e.. Our theorem says that states with non-zero initial decay rate could be found among infinite energy states1). What

is an irrationality measure for ϑ if there exists an integer q

It is expected that the result is not true with = 0 as soon as the degree of α is ≥ 3, which means that it is expected no real algebraic number of degree at least 3 is

Exercise 1. Let b ≥ 2 be an integer. Show that a real number x is rational if and only if the sequence (d

Write a degree 2 polynomial with integer coefficients having a root at the real number whose continued fraction expansion is. [0; a,

The goal of the lockdown is to mitigate and if possible prevent the spread of an epidemic

While a model with a single compartment and an average factor of reduction of social interactions predicts the extinction of the epidemic, a small group with high transmission factor