Exponential Absolute Minimizing extension and biased infinity Laplacian

Abstract: We study the variational structure of the biased infinity Laplacian by introducing a notion of the $β$\textit{-Exponential Absolute Minimizing Extension} ($β$--AM) on arbitrary length space, which absolutely minimizing the exponential slope $$ L^β_u (E) := β\sup_{x,y \in E} \frac{u(y) - e^{-β|x-y|} u(x)}{1- e^{-β|x-y|}}. $$We also define the corresponding Exponential McShane-Whitney-type extension, and $β$-biased convexity, which equivalently characterize $β$-AM and may be of independent interest. These generalize the classical Absolute Minimizing Lipschitz Extension as a special case when $β= 0$. In Euclidean space with Euclidean norm, this corresponds to the Aronsson equation with Hamiltonian [ H(u, \nabla u) = |\nabla u| + βu, ] equivalently viscosity solutions of $Δ_{\infty}^β u = 0$. We show that $β$-AM arises as the continuum value of a biased tug-of-war game. Analogous to the unbiased case, we derive various properties of this extension. As an application, we further show that the linear blow-up property holds for biased infinity harmonic functions.