In this paper, we study the performance of Boundary Value Methods (BVMs) on second-order PDEs. The PDEs are transformed into a system of second-order ordinary differential equations (ODEs) using the Lanczos-Chebyshev reduction technique. The conditions under which the BVMs converge and the computational complexities of the algorithms are discussed. Numerical illustrations are given to show the simplicity and high accuracy of the approach.
from #AlexandrosSfakianakis via Alexandros G.Sfakianakis on Inoreader http://ift.tt/2kJuf0V
via IFTTT
Εγγραφή σε:
Σχόλια ανάρτησης (Atom)
Δημοφιλείς αναρτήσεις
-
Early Antarctic ice age dynamics Antarctica. Image courtesy of Wikimedia Commons/Dave Pape. The extent of Antarctic ice sheets oscillated wi...
-
A host of new therapies are now available for treating patients with chronic lymphocytic leukemia (CLL) in both the upfront and relapsed or ...
-
Related Articles Middle ear adenomatous neuroendocrine tumors: a 25-year experience at MD Anderson Cancer Center. Virchows Arch. 2017...
-
We thank Liu et al. (1) for their comments on our paper (2). The first point of Liu et al. (1) is that the Lake Dali Early Holocene highstan...
-
Abstract Background The role of thymectomy in the treatment of juvenile myasthenia gravis (JMG) is poorly defined. The objective of this...
-
In PNAS, Krementsov et al. (1) report that if you are a male mouse and catch the flu, the severity of your illness may depend on the type of...
-
Biomarker testing is recommended for all patients diagnosed with non–small cell lung cancer. At a minimum, testing should include the mutati...
-
American Thyroid Resarch Grant to Nikita Pozdeyev, MD, PhD, University of Colorado Newswise (press release) The 2016 Research Grant h...
-
In the NCCN Clinical Practice Guidelines in Oncology (NCCN Guidelines) for Breast Cancer, among adjuvant radiotherapy options for whole-brea...
Δεν υπάρχουν σχόλια:
Δημοσίευση σχολίου