Results 141 to 150 of about 419 (187)
Impact of low-frequency hotspot mutation R282Q on the structure of p53 DNA-binding domain as revealed by crystallography at 1.54 angstroms resolution. [PDF]
Acta Crystallogr D Biol Crystallogr, 2008 Tu C +6 more
europepmc +1 more source
Insights into metazoan evolution from Alvinella pompejana cDNAs. [PDF]
BMC Genomics, 2010 Gagnière N +24 more
europepmc +1 more source
High-resolution electron microscopy with superconducting lenses at liquid helium temperatures. [PDF]
Proc Natl Acad Sci U S A, 1966 Fernández-Morán H.
europepmc +1 more source
Emerging trends and future challenges of advanced 2D nanomaterials for combating bacterial resistance. [PDF]
Bioact MaterHameed S, Sharif S, Ovais M, Xiong H.
europepmc +1 more source
The superstability of d’Alembert’s functional equation on the Heisenberg group
Applied Mathematics Letters, 2010 In this paper, we investigate the superstability of d’Alembert’s functional equation f(ab)+f(ai(b))=2f(a)f(b),a,b∈H, where H is the Heisenberg group and the map i:H⟶H is an automorphism of H such that i∘i=id (the identity map)
Bouikhalene, B. +2 more
exaly +2 more sources
Some Comments on the Superstability of a General Functional Equation
SymmetryIn this paper, we prove a superstability theorem for a general functional equation ∑j=1∞ajf(γj(t,s))=h(t)g(s), with the unknown functions g:T→X, h:S→K and f:S→X, such that the series ∑j=1∞f(γj(t,s)) is ...
Janusz Brzdęk, Brzdęk Janusz
exaly +2 more sources
Some of the next articles are maybe not open access.
Related searches:
Related searches:
On superstable generic structures
Archive for Mathematical Logic, 2012The authors modify the construction of the first author [Arch. Math. Logic 51, No. 1--2, 203--211 (2012; Zbl 1247.03054)] of a superstable not \(\omega\)-stable generic ab initio Hrushovski amalgam. While in the former paper the structure constructed has trivial forking, the two structures constructed in the present paper (one with a binary relation ...
Koichiro Ikeda, Hirotaka Kikyo
openaire +2 more sources
On the susceptibility of numerical methods to computational chaos and superstability
Communications in Nonlinear Science and Numerical Simulation, 2016 In the present study, the susceptibility of the forward and the backward Euler methods to computational chaos and superstability is investigated via the means of both a theoretical analysis and numerical experiments.
C Varsakelis
exaly +2 more sources
Superstable differential fields
Journal of Symbolic Logic, 1992In this paper we study differential fields of characteristic 0 (with perhaps additional structure) whose theory is superstable. Our main result is that such a differential field has no proper strongly normal extensions in the sense of Kolchin [K1]. This is an approximation to the conjecture that a superstable differential field is differentially closed
Anand Pillay, Zeljko Sokolovic
openaire +2 more sources