Auto‐Routing Fluidic Printed Circuit Boards
This work introduces (STREAM) software tool for routing efficiently advanced macrofluidics, an open‐source software tool for automating the design of 3D‐printable fluidic circuit boards. STREAM streamlines tube routing and layout, enabling the rapid fabrication of fluidic networks for soft robotics, lab‐on‐a‐chip devices, microfluidics, and biohybrid ...
Savita V. Kendre +3 more
wiley +1 more source
Target-less registration of UAV-LiDAR point clouds based on graph matching of tree locations in forest environments. [PDF]
Fekry R +4 more
europepmc +1 more source
Sensory-motor control with large language models via iterative policy refinement. [PDF]
Carvalho JT, Nolfi S.
europepmc +1 more source
Comparison of DLIR-H and ASIR algorithms for image reconstruction in low-dose chest CT of pediatric mycoplasma pneumoniae pneumonia: a cross-sectional study. [PDF]
Zou Y +7 more
europepmc +1 more source
A registration method for total hip arthroplasty navigation system based on point cloud alignment. [PDF]
Wang Z, He Q, Yue X.
europepmc +1 more source
Energy-Efficient 3D Trajectory Optimization and Resource Allocation for UAV-Enabled ISAC Systems. [PDF]
Jing L +5 more
europepmc +1 more source
Joint Optimization of Trajectory-Resource Allocation and Deep Task Partial Offloading for MEC-Enabled Multi-UAV. [PDF]
Liu C, Wang Y, Mei H, Du S, Guo B.
europepmc +1 more source
Related searches:
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zhanlav, T. +2 more
openaire +4 more sources
Choosing the Optimal Multi-Point Iterative Method for the Colebrook Flow Friction Equation [PDF]
The Colebrook equation is implicitly given in respect to the unknown flow friction factor λ; λ=ζ(Re,ε∗,λ) which cannot be expressed explicitly in exact way without simplifications and use of approximate calculus.
Pavel Praks, Dejan Brkic, Praks Pavel
exaly +2 more sources
A multi-point iterative method for solving nonlinear equations with optimal order of convergence [PDF]
In this study, a three-point iterative method for solving nonlinear equations is presented. The purpose is to upgrade a fourth order iterative method by adding one Newton step and using a proportional approximation for last derivative.
Mehdi Salimi +2 more
exaly +2 more sources

