Titlebook: Geodesic Flows; Gabriel P. Paternain Book 1999 Springer Science+Business Media New York 1999 Fundamental group.Loop group.Riemannian manif

Tamoxifen

書(shū)目名稱Geodesic Flows影響因子(影響力)




書(shū)目名稱Geodesic Flows影響因子(影響力)學(xué)科排名




書(shū)目名稱Geodesic Flows網(wǎng)絡(luò)公開(kāi)度




書(shū)目名稱Geodesic Flows網(wǎng)絡(luò)公開(kāi)度學(xué)科排名




書(shū)目名稱Geodesic Flows被引頻次




書(shū)目名稱Geodesic Flows被引頻次學(xué)科排名




書(shū)目名稱Geodesic Flows年度引用




書(shū)目名稱Geodesic Flows年度引用學(xué)科排名




書(shū)目名稱Geodesic Flows讀者反饋




書(shū)目名稱Geodesic Flows讀者反饋學(xué)科排名

ACME

,Die Molybd?n- und Vanadinst?hle,In this chapter we introduce the counting functions and we relate them to the topological entropy ..(.) of the geodesic flow of ..

CANT

Heinz Ismar,Günther Lange,Wilhelm KrelleIn this chapter we present a proof of Ma?é’s formula for geodesic flows and convex billiards. The proof rests on the twist property of the vertical subbundle that we described in Chapter 2, Pesin’s theory which enters via Przytycki’s inequality and a very clever change of variables which is useful also in other situations (cf. Proposition 4.8).

帳單

預(yù)測(cè)

Ledger

,Ma?é’s Formula for Geodesic Flows and Convex Billiards,In this chapter we present a proof of Ma?é’s formula for geodesic flows and convex billiards. The proof rests on the twist property of the vertical subbundle that we described in Chapter 2, Pesin’s theory which enters via Przytycki’s inequality and a very clever change of variables which is useful also in other situations (cf. Proposition 4.8).

Ledger

misshapen

Living-Will

archetype