Los puntos clave no están disponibles para este artículo en este momento.
We consider the continuous superposition of operators of the form \ [₀, ₁ (₁, ₍) (-) ₚˢ \, u\, d (s, p), \] where denotes a signed measure over the set 0, 1 (1, N), joined to a nonlinearity satisfying a proper subcritical growth. The novelty of the paper relies in the fact that, differently from the existing literature, the superposition occurs in both s and p. Here we introduce a new framework which is so broad to include, for example, the scenarios of the finite sum of different (in both s and p) Laplacians, or of a fractional p-Laplacian plus a p-Laplacian, or even combinations involving some fractional Laplacians with the "wrong" sign. The development of this new setting comes with two applications, which are related to the Weierstrass Theorem and a Mountain Pass technique. The results obtained contribute to the existing literature with several specific cases of interest which are entirely new.
Dipierro et al. (Mon,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: