Results 51 to 60 of about 1,018,693 (306)
Constructing Hybrid Baryons with Flux Tubes [PDF]
, 1999 Hybrid baryon states are described in quark potential models as having explicit excitation of the gluon degrees of freedom. Such states are described in a model motivated by the strong coupling limit of Hamiltonian lattice gauge theory, where three flux ...
C. Caso +27 more
core +2 more sources
Nanomaterials, 2021 In this study, the energy transference of a hybrid Al2O3-Cu-H2O nanosuspension within a lid-driven heated square chamber is simulated. The domain is affected by a horizontal magnetic field.
M. M. Rashidi, M. Sadri, M. A. Sheremet
doaj +1 more source
A Study on Horadam Hybrid Numbers
TURKISH JOURNAL OF MATHEMATICS, 2020 In this paper, we study Horadam hybrid numbers. For these numbers, we give the exponential generating function, Poisson generating function, generating matrix, Vajda's, Catalan's, Cassini's, and d'Ocagne's identities. In addition, we offer Honsberger formula, general bilinear formula, and some summation formulas for these numbers.
Tuncay Deniz ŞENTÜRK +3 more
openaire +2 more sources
On the Lichtenberg hybrid quaternions [PDF]
Mathematica MoravicaIn this study, we define Lichtenberg hybrid quaternions. We give the Binet's formula, the generating functions, exponential generating functions and sum formulas of these quaternions. We find some relations between Jacobsthal hybrid quaternions, Mersenne
Morales Gamaliel
doaj +1 more source
Adding Flexibility to Hybrid Number Systems [PDF]
The Computer Journal, 1992 Hybrid number systems (HNSs) represent a natural generalisation of weighted and residue number systems. In HNSs, an integrer is represented by using both weighted and residue notations; their mathematical properties, which have been is apparent that varying the residue-to-weighted-ranged ratio should enable us to optimise the mathematical performances ...
F. Barsi, PINOTTI, Maria Cristina
openaire +3 more sources
An allocation scheme for estimating the reliability of a parallel-series system [PDF]
, 2012 We give a hybrid two stage design which can be useful to estimate the reliability of a parallel-series and/or by duality a series-parallel system, when the component reliabilities are unknown as well as the total numbers of units allowed to be tested in ...
Benkamra, Zohra +2 more
core +3 more sources
On generalized Mersenne hybrid numbers
Annales Universitatis Mariae Curie-Sklodowska, sectio A – Mathematica, 2020 The hybrid numbers are generalization of complex, hyperbolic and dual numbers. In this paper we consider a special kind of hybrid numbers, namely the Mersenne hybrid numbers and we give some of their properties.
Szynal-Liana, Anetta, Włoch, Iwona
openaire +3 more sources
On a new generalization of Fibonacci hybrid numbers
Indian Journal of Pure and Applied Mathematics, 2022 The hybrid numbers were introduced by Ozdemir [9] as a new generalization of complex, dual, and hyperbolic numbers. A hybrid number is defined by $k=a+bi+c +dh$, where $a,b,c,d$ are real numbers and $% i, ,h$ are operators such that $i^{2}=-1, ^{2}=0,h^{2}=1$ and $ih=-hi= +i$. This work is intended as an attempt to introduce the bi-periodic Horadam
Tan, Elif, Ait-Amrane, N. Rosa
openaire +2 more sources
Inversion transformations with respect to conics in hybrid number planes
AIMS MathematicsThis paper presents a comprehensive study of geometric inversion with respect to central conics in hybrid number planes, which unify complex, hyperbolic, and dual numbers within a single algebraic structure. By employing the hybrid scalar product and the
İskender Öztürk +2 more
doaj +1 more source
Jacobsthal Representation Hybrinomials
Annales Mathematicae Silesianae, 2022 Jacobsthal numbers are a special case of numbers defined recursively by the second order linear relation and for these reasons they are also named as numbers of the Fibonacci type.
Liana Mirosław +2 more
doaj +1 more source