The Fermat problem in Minkowski spaces

## Abstract In three‐dimensional Lorentz–Minkowski space 𝕃^3^, we consider a spacelike plane Π and a round disc Ω over Π. In this article we seek the shapes of unbounded surfaces whose boundary is __∂__ Ω and its mean curvature is a linear function of the distance to Π. These surfaces, called stati

We give a complete solution of Hadamard's problem concerning Huygens' principle on evendimensional Minkowski spaces M n+1 for a restricted class of linear, second-order, normal hyperbolic operators L = n+1 +u(x 1 , x 2 ) with real (locally) analytic potentials u = u(x 1 , x 2 ) depending on two spat

We investigate the possibility of extending classical integral geometric results, involving lower-dimensional areas, from Euclidean space to Minkowski spaces (finite-dimensional Banach spaces). Of the two natural notions of area in a Minkowski space, due respectively to Busemann and to Holmes and Th