Read e-book online Antenna Arrays for GNSS (PhD dissertation) PDF

By G. Granados

Show description

Read Online or Download Antenna Arrays for GNSS (PhD dissertation) PDF

Best nonfiction_6 books

Additional info for Antenna Arrays for GNSS (PhD dissertation)

Example text

Next we shall give a sketch of the proof of “if” part. First of all, we shall show the quasiconvexity lemma for compressible boundary components. Let C be a subset of C0 (S). We say that C is B-quasiconvex at the end e˜ if there exists a neighbourhood Ue˜ of e˜ with the following properties: Let {βi }ni=0 be a geodesic in C (S). When β0 , βn lie in C and each geodesic representative β∗i of βi in N˜ is contained in Ue˜ , the geodesic {βi }ni=0 is contained in the B-neighbourhood of C . For L > 0, let C (S, L) := {γ ∈ C (S) | N˜ (γ ∗ ) < L}.

Hersonsky (2004). Ubiquity of geometric finiteness in boundaries of deformation spaces of hyperbolic 3-manifolds. Amer. J. Math. 126 (6), 1193–1220. [Ear81] C. J. Earle (1981). On variation of projective structures. In Riemann Surfaces and Related Topics: Proceedings of the 1978 Stony Brook Conference (State Univ. , 1978), Ann. of Math. , volume 97, pp. 87–99. Princeton Univ. J. [Eva03] R. Evans (2003). The ending lamination conjecture for super-slender hyperbolic 3-manifolds. Preprint. [FG01] L.

Differential Geom. 48 (1), 1–59. [HK02] C. Hodgson & S. Kerckhoff (2002). Universal bounds for hyperbolic Dehn surgery. GT/0204345. [HK03] C. D. Hodgson & S. P. Kerckhoff (2003). Harmonic deformations of hyperbolic 3-manifolds. In Kleinian Groups and Hyperbolic 3-Manifolds (Warwick, 2001), London Math. Soc. , volume 299, pp. 41–73. Cambridge Univ. Press, Cambridge. [Hub81] J. H. Hubbard (1981). The monodromy of projective structures. In Riemann Surfaces and Related Topics: Proceedings of the 1978 Stony Brook Conference (State Univ.

Download PDF sample

Antenna Arrays for GNSS (PhD dissertation) by G. Granados


by John
4.1

Rated 4.12 of 5 – based on 16 votes