Emacs as a Tool for Modern Science

It is human nature to prefer additive problem solving even if removal may be the more efficient solution. This heuristic has wide ranging implications when dealing with science, innovation and complex problem solving. This is compounded when dealing with these issues at an institutional level. Additive solutions to workflows with extra software tools and proprietary digital solutions can impede work without offering any advantages in terms of FAIR data principles or productivity. The below Viewpoint highlights one possible workflow and the mentality underpinning it with an aim to incorporate FAIR data, improved productivity and longevity of written documents while improving workloads within industrial R&D.

Additive Eigenvalue Problems of the Laplace Operator with the Prescribed Contact Angle Boundary Condition

Additive eigenvalue problem appears in ergodic optimal control or the homogenization of Hamilton–Jacobi equations. It has wide applications in several fields including computer science and then attracts the attention. In this paper, we consider the Poisson equations with the prescribed contact angle boundary condition and finally derive the existence and the uniqueness of the solution to the additive problem of the Laplace operator with the prescribed contact angle boundary condition.

A binary additive problem with fractional powers

Let [Formula: see text] be a real number with [Formula: see text]. We study the representations of a large integer [Formula: see text] in the form [Formula: see text] where [Formula: see text] is an integer and [Formula: see text] is a friable number with [Formula: see text] for [Formula: see text]. We prove that when [Formula: see text] and [Formula: see text], all sufficiently large integers are thus representable.