S completely umbilical, or sup ||two ( P, n, c) :=( n -2) c
S totally umbilical, or sup ||2 ( P, n, c) :=( n -2) c( n – 1) P2 . ( n – 2 ) n -2 c – P nThe equality sup ||2 = ( P, n, c) holds and this supremum attains SBP-3264 Cancer sooner or later on Mn , if and only if Mn is isoparametric with two distinct constant principle curvatures, a single of which is basic.Mathematics 2021, 9,6 ofn In specific, if L1 1 is often a (geodesically) comprehensive simply-connected Einstein manifold, then such a entirely umbilical (or, totally geodesic) hypersurface in (i) is really a sphere Sn ( R) (or, Sn (c)) and n such an isoparametric hypersurface in (ii) is really a hyperbolic cylinder H1 ( a) Sn-1 (b) S1 1 (c), with a, b defined by (57).Theorem 2. Let Mn (n three) be a comprehensive spacelike hypersurface with continual normalized scalar n curvature R inside a Ricci symmetric manifold L1 1 satisfying (1) and (2). Let us suppose that H is n , c 0, and bounded on M n – 2k tr(three ) | |3 (19) nk(n – k) for the integer 2 k n . D (n, k, c) is really a positive continuous defined by (32): 2 (i) (ii) If D (n, k, c) P c, then sup ||two = 0 and Mn is completely umbilical; If 0 P D (n, k, c), then either sup ||2 = 0 and Mn is totally umbilical, or ( P, n, k, c) sup ||two ( P, n, k, c), where ( P, n, k, c) and ( P, n, k, c) are two constants defined by (35). The equality sup ||2 = ( P, n, k, c) holds and this supremum attains at some point on Mn , or the equality ||two = ( P, n, k, c) holds, if and only if Mn is isoparametric and has exactly two distinct constant principal curvatures, with multiplicities k and n – k.n In particular, if L1 1 is often a (geodesically) total simply-connected Einstein manifold, then such a entirely umbilical hypersurface in (i) is usually a sphere Sn ( R) and such an isoparametric hypersurface n in (ii) is really a hyperbolic cylinder Hk ( a) Sn-k (b) S1 1 (c), using a, b defined by (47), when n sup ||2 = ( P, n, k, c), or maybe a hyperbolic cylinder Hk ( a) Sn-k (b) S1 1 (c), with a, b defined two = ( P, n, k, c ). by (48), when ||Theorem 3. Let M2m (m 2) be a complete spacelike hypersurface with continuous normalized scalar curvature R inside a Ricci symmetric manifold L2m1 satisfying (1) and (two). Let us suppose 1 that H is bounded on M2m , 0 P c, c 0 and tr(3 ) = 0; then, M2m is entirely umbilical n and it is actually entirely geodesic if and only if P = c. In particular, if L1 1 is a (geodesically) total simply-connected Einstein manifold, then such entirely umbilical hypersurface is often a sphere S2m ( R) and such entirely geodesic hypersurface is a sphere S2m (c). PHA-543613 medchemexpress Remark 1. The Okumura-type inequality (19) in Theorem 2 was introduced by Mel dez in [26]; it truly is weaker than to assume the spacelike hypersurface has two distinct principal curvatures with multiplicities k and n – k. Remark two. Concerning the integer k in (19), it can be originally assumed that 1 k n . By the two classical Okumura’s lemma ([27], Lemma two.1), the inequality (19) is automatically accurate when ( n -2) c k = 1. So, Theorem 1 is just the case of (19) that holds for k = 1 due to D (n, 1, c) = n , n even though Theorem 3, corresponding towards the case of (19), is true for k = 2 because of the assumption tr(three ) = 0. Keeping these in mind, we only assume, in Theorem 2, that (19) holds for two k n . two Remark 3. Theorems 1 considerably generalize the previous case that the ambient manifold is a space kind, an Einstein manifold or perhaps a locally symmetric manifold. At the similar time, they’re also the generalization in the case in which the hypersurface has two distinct principal curvatures. See the literature [6,7,91,179] and references.Mathematics 2021, 9,7 of4. Lemmasn.