Humanity already possesses the fundamental scientific, technical, and industrial know-how to solve the carbon and climate problem for the next half-century. A portfolio of technologies now exists to meet the world's energy needs over the next 50 years and limit atmospheric CO2 to a trajectory that avoids a doubling of the preindustrial concentration. Every element in this portfolio has passed beyond the laboratory bench and demonstration project; many are already implemented somewhere at full industrial scale. Although no element is a credible candidate for doing the entire job (or even half the job) by itself, the portfolio as a whole is large enough that not every element has to be used.

“Stabilization wedges: Solving the climate problem for the next 50 years with current technologies” from science magazine (2004)

John M Wallace and Peter V Hobbs London: Academic 1977 pp xvii + 467 price £12.80 This is a comprehensive textbook for undergraduate courses in atmospheric physics. It contains general physical meteorology (atmospheric hydrostatics, cloud physics, radioactive transfer and thermodynamics), some selected topics of special interest (aerosol physics, aeronomy and physical climatology) and dynamic meteorology describing and interpreting large scale atmospheric motions.

Atmospheric Science: An Introductory Survey

Abstract. We undertook a comprehensive evaluation of 22 gridded (quasi-)global (sub-)daily precipitation (P) datasets for the period 2000–2016. Thirteen non-gauge-corrected P datasets were evaluated using daily P gauge observations from 76 086 gauges worldwide. Another nine gauge-corrected datasets were evaluated using hydrological modeling, by calibrating the HBV conceptual model against streamflow records for each of 9053 small to medium-sized (

Global-scale evaluation of 22 precipitation datasets using gauge observations and hydrological modeling

Corine Land Cover

Trace Elements In Terrestrial Environments Biogeochemistry Bioavailability And Risks Of Metals

This article aims to mark out new conditions for oscillation of the even-order Emden–Fowler neutral delay differential equations with neutral term β1iΦα[ζr−1i]′+β3iΦα[ςξi]=0. The obtained results extend, and simplify known conditions in the literature. The results are illustrated with examples.

https://www.mdpi.com/2227-7390/9/7/714/pdf

Oscillatory Solutions to Neutral Delay Differential Equations

This article presents a numerical simulation of hydrodynamics in a bubble column. Numerical simulations have been carried out using the Eulerian model which provides specific modeling adapted to gas-liquid flows and allows a reasonable representation of the two-phase flow structure (fields of mean velocities and volumetric fractions of the two phases) as well as the important modulation of turbulence in the two-phase flow. In these simulations, we tested the sensitivity of the coefficients of the closure model of the interfacial transfer (drag, lift and added mass) on the prediction of the fields of average velocities and volumetric fractions of the two phases. The results are compared with the experimental data available in the literature using an average bubble diameter approach.

/pdf/sensitivity-of-the-coefficients-of-the-closure-model-of-the-2igi88rmbu.pdf

Sensitivity of the Coefficients of the Closure Model of the Interfacial Transfer in Bubble Columns

Instability of FGM rectangular hollow section (RHS) beam element under combined bending and compressive loads

In this paper, we investigate the generalized Hyers-Ulam stabilities of the fourth-order homogeneous differential equation and the non-homogeneous linear differential equation by applying Fourier transform method.

Application of Fourier Transform to Study Hyers-Ulam Stability of Linear Differential Equations

In this work, we study asymptotic behavior of solutions for a class of third-order non-linear neutral difference equation Δ(m(i)(Δ2y(i))β)+s(i)zβ(i−ξ)=0, where β is a proportion of odd positive numbers. m(i) > 0, s(i) ≥ 0, s(i) is not indistinguishable from zero for enormous i. We present the fundamental outcomes and guides to represent the principle results.

Asymptotic Behavior of Solutions of Third-order Non-linear Neutral Difference Equations

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