The Jump Problem in Fourth-Order Gravity

dedicated to professor w. t. tutte on the occasion of his eightieth birthday A jump system is a set of lattice points satisfying a certain exchange axiom. This notion was introduced by Bouchet and Cunningham [2], as a common generalization of (among others) the sets of bases of a matroid and degree

## Abstract The value of a contingent claim under a jump‐diffusion process satisfies a partial integro‐differential equation. A fourth‐order compact finite difference scheme is applied to discretize the spatial variable of this equation. It is discretized in time by an implicit‐explicit method. Mea

Let L p u = d 4 u/dx 4 -d/dx p 1 du/dx + p 2 u u 0 = u 0 = u 1 = u 1 = 0 where p ∈ L 2 0 1 × L 2 0 1 . We show that for near constant coefficients, if p is even about 1/2 and L p and L p have the same eigenvalues, then knowledge of the first coefficient uniquely determines the second up to average v