248,598 research outputs found
Energy, greenhouse gas emissions and irrigated agriculture
On-farm energy efficiency is becoming a significant issue for highly mechanised irrigated agricultural industries due to rising energy costs and concern over greenhouse gas (GHG) emissions. Energy represents a major cost and one of the fastest growing input costs to primary producers. The Australian cotton growing industry is highly mechanised and heavily reliant on fossil fuels (electricity and diesel). Within highly mechanised farming systems such as those used within the cotton industry, machinery costs can represent 40 – 50% of the cotton farm input costs. Given the major dependence on machinery (direct energy inputs) and rising energy costs, energy use efficiency is an emerging issue for the Australian Cotton Industry.
Both previous and current work undertaken by the National Centre for Engineering in Agriculture (NCEA) is studying direct on farm energy use which involves a number of case study cotton farms to understand the contribution of direct energy use to cotton production and greenhouse gas emissions. The results from this work show that energy use varies depending on the cropping enterprise and the farming system and that there are significant opportunities to reduce energy and costs. In comparison the greenhouse gas emissions (GHGs) from direct energy use can be similar and in fact greater than the GHGs generated by nitrogen based fertiliser
Twist-3 Contributions in Semi-Inclusive DIS with Transversely Polarized Target
We study semi-inclusive DIS with a transversely polarized target in the
approach of collinear factorization. The effects related with the transverse
polarization are at twist-3. We derive the complete result of twist-3
contributions to the relevant hadronic tensor at leading order of ,
and construct correspondingly experimental observables. Measuring these
observables will help to extract the twist-2 transversity distribution, twist-3
distributions and twist-3 fragmentation functions of the produced unpolarized
hadron. A detailed comparison with the approach of
transverse-momentum-dependent factorization is made.Comment: discussions and references are added. Published version in PL
Equation-free dynamic renormalization in a glassy compaction model
Combining dynamic renormalization with equation-free computational tools, we
study the apparently self-similar evolution of void distribution dynamics in
the diffusion-deposition problem proposed by Stinchcombe and Depken [Phys. Rev.
Lett. 88, 125701 (2002)]. We illustrate fixed point and dynamic approaches,
forward as well as backward in time.Comment: 4 pages, 4 figures (Minor Modifications; Submitted Version
Phase Retrieval by Linear Algebra
The null vector method, based on a simple linear algebraic concept, is
proposed as a solution to the phase retrieval problem.
In the case with complex Gaussian random measurement matrices, a
non-asymptotic error bound is derived, yielding an asymptotic regime of
accurate approximation comparable to that for the spectral vector method
High-Order-Mode Soliton Structures in Two-Dimensional Lattices with Defocusing Nonlinearity
While fundamental-mode discrete solitons have been demonstrated with both
self-focusing and defocusing nonlinearity, high-order-mode localized states in
waveguide lattices have been studied thus far only for the self-focusing case.
In this paper, the existence and stability regimes of dipole, quadrupole and
vortex soliton structures in two-dimensional lattices induced with a defocusing
nonlinearity are examined by the theoretical and numerical analysis of a
generic envelope nonlinear lattice model. In particular, we find that the
stability of such high-order-mode solitons is quite different from that with
self-focusing nonlinearity. As a simple example, a dipole (``twisted'') mode
soliton which may be stable in the focusing case becomes unstable in the
defocusing regime. Our results may be relevant to other two-dimensional
defocusing periodic nonlinear systems such as Bose-Einstein condensates with a
positive scattering length trapped in optical lattices.Comment: 14 pages, 10 figure
Implementation of a trapezoidal ring element in NASTRAN for elastic-plastic analysis
The explicit expressions for an elastic-plastic trapezoidal ring element are presented and implemented in NASTRAN computer program. The material is assumed to obey the von Mises' yield criterion, isotropic hardening rule and the Prandtl-Reuss flow relations. For the purpose of demonstration, two elastic-plastic problems are solved and compared with previous results. The first is a plane-strain tube under uniform internal pressure and the second, a finite-length tube loaded over part of its inner surface. A very good agreement was found in both test problems
A model of a dual-core matter-wave soliton laser
We propose a system which can generate a periodic array of solitary-wave
pulses from a finite reservoir of coherent Bose-Einstein condensate (BEC). The
system is built as a set of two parallel quasi-one-dimensional traps (the
reservoir proper and a pulse-generating cavity), which are linearly coupled by
the tunneling of atoms. The scattering length is tuned to be negative and small
in the absolute value in the cavity, and still smaller but positive in the
reservoir. Additionally, a parabolic potential profile is created around the
center of the cavity. Both edges of the reservoir and one edge of the cavity
are impenetrable. Solitons are released through the other cavity's edge, which
is semi-transparent. Two different regimes of the intrinsic operation of the
laser are identified: circulations of a narrow wave-function pulse in the
cavity, and oscillations of a broad standing pulse. The latter regime is
stable, readily providing for the generation of an array containing up to
10,000 permanent-shape pulses. The circulation regime provides for no more than
40 cycles, and then it transforms into the oscillation mode. The dependence of
the dynamical regime on parameters of the system is investigated in detail.Comment: Journal of Physics B, in pres
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