The Equivariant Second Yamabe Constant

Abstract: For a closed Riemannian manifold of dimension n ≥ 3 and a subgroup G of the isometry group, we define and study the G−equivariant second Yamabe constant and we obtain some results on the existence of G−invariant nodal solutions of the Yamabe equation.

“…Using similar arguments as the ones used in the proof of (Theorem 3.4, [2]) and (Theorem 1.5, [27]) it can be seen that if g u realizes the second isoparametric f −constant of (M × N, g + h) then u = |v 2 | and v 2 is a nodal solution of the Yamabe equation. Also, by the connectedness of M , it can be seen that the number of connected components of M × N − {v −1 2 (0)} is two.…”

“…For the details we refer to the reader to (Proposition 3.2 in [2]) and to Section 4 in [27]. The subspace V 0 := span(v 1 , v 2 ) realizes the generalized second eigenvalue λ f 2 (g u ).…”

“…Making use of this invariant they were able to prove existence results when the conformal class of the Riemannian manifold admits a Riemannian metric of non-negative scalar curvature. Further results on the existence of nodal solutions of the Yamabe equation using the variational approach of Ammann and Humbert can be found in Petean [44], El Sayed [17], Madani and the author [27]. We refer the reader to the articles by Clapp and Fernandez [9] and Fernandez and Petean [18] for recent results on the multiplicity of nodal solutions of the Yamabe equation.…”

Isoparametric functions and nodal solutions of the Yamabe equation

“…Using similar arguments as the ones used in the proof of (Theorem 3.4, [2]) and (Theorem 1.5, [27]) it can be seen that if g u realizes the second isoparametric f −constant of (M × N, g + h) then u = |v 2 | and v 2 is a nodal solution of the Yamabe equation. Also, by the connectedness of M , it can be seen that the number of connected components of M × N − {v −1 2 (0)} is two.…”

“…For the details we refer to the reader to (Proposition 3.2 in [2]) and to Section 4 in [27]. The subspace V 0 := span(v 1 , v 2 ) realizes the generalized second eigenvalue λ f 2 (g u ).…”

“…Making use of this invariant they were able to prove existence results when the conformal class of the Riemannian manifold admits a Riemannian metric of non-negative scalar curvature. Further results on the existence of nodal solutions of the Yamabe equation using the variational approach of Ammann and Humbert can be found in Petean [44], El Sayed [17], Madani and the author [27]. We refer the reader to the articles by Clapp and Fernandez [9] and Fernandez and Petean [18] for recent results on the multiplicity of nodal solutions of the Yamabe equation.…”

Isoparametric functions and nodal solutions of the Yamabe equation

“…See also [11,14,15,19] for results related to the equivariant Yamabe problem. The Yamabe problem can be formulated for manifolds with boundary.…”

Equivariant Yamabe problem with boundary

“…solutions that change sign). See for instance the articles [4,8,9,14,15,16,24] and the references in them. Nodal solutions u do not give metrics of constant scalar curvature since u vanishes at some points and therefore |u| pn−2 g is not a Riemannian metric.…”

A note on solutions of Yamabe-type equations on products of spheres