One-bubble nodal blow-up for asymptotically critical stationary Schr\"odinger-type equations
Abstract
We investigate in this work families (uε)ε >0 of sign-changing blowing-up solutions of asymptotically critical stationary nonlinear Schr\"odinger equations of the following type: g uε + hε uε = |uε|pε-2 uε in a closed manifold (M,g), where hε converges to h in C1(M). Assuming that (uε)ε >0 blows-up as a single sign-changing bubble, we obtain necessary conditions for blow-up that constrain the localisation of blow-up points and exhibit a strong interaction between h, the geometry of (M,g) and the bubble itself. These conditions are new and are a consequence of the sign-changing nature of uε.
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