Second-order diffraction effects in practical radiometry: analytical asymptotic results. [PDF]
J Opt Soc Am A Opt Image Sci VisShirley EL.
europepmc +1 more source
Development and validation of the socially shared regulated learning questionnaire: insights from a second-order confirmatory factor analysis. [PDF]
Front PsycholYang Y, He Z, Wei Y, Tang E.
europepmc +1 more source
Myricetin Attenuates Hyperexcitability of Trigeminal Nociceptive Second-Order Neurons in Inflammatory Hyperalgesia: Celecoxib-like Effects. [PDF]
MoleculesYamaguchi S, Takeda M.
europepmc +1 more source
Molecular characterization of gustatory second-order neurons reveals integrative mechanisms of gustatory and metabolic information. [PDF]
ElifeMollá-Albaladejo R +2 more
europepmc +1 more source
Dynamical analysis of scabies delayed epidemic model with second-order global stability. [PDF]
PLoS OneFadhal E +6 more
europepmc +1 more source
Related searches:
Second-Order Structured Deformations
Archive for Rational Mechanics and Analysis, 2000zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Owen, David R., Paroni, Roberto
openaire +3 more sources
Second-order universal calibration
Talanta, 2020Quantification and qualification of an analyte of interest in pharmaceutical tablets from different manufacturers/companies are a hard task because of the potential presence of various interfering molecules. Indeed, the composition of the tablets covers a wide range of interferents which can be even unknown.
Ghaffari, Mahdiyeh +3 more
openaire +3 more sources
SECOND-ORDER DECISION ANALYSIS
International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, 2001The purpose of this work is to provide theoretical foundations of, as well as some computational aspects on, a theory for analysing decisions under risk, when the available information is vague and imprecise. Many approaches to model unprecise information, e.g., by using interval methods, have prevailed.
Ekenberg, Love, Thorbiörnson, Johan
openaire +2 more sources
Second Order Polynomial Recursions
SIAM Journal on Applied Mathematics, 1977Divisibility properties of sequences of polynomials $\{ f_n (x)\} $ which satisfy a second order recursion of the form \[ f_{n + 1} (x) = a(x)f_n (x) + b(x)f_{n - 1} (x) \] are considered, with special emphasis on the sequence $\{ q_n (x)\} $ obtained when $a(x) = 1,b(x) = x$, and starting with $q_0 = 0,q_1 = 1$. It is shown that for $n > 2,q_n (x)$ is
Golomb, S. W., Lempel, A.
openaire +2 more sources