共查询到20条相似文献,搜索用时 15 毫秒
1.
We study algebraic properties of the Wiener algebra of absolutely convergent power series on the closed unit disc. In particular, we prove a form of Weierstrass preparation for algebraic functions in this algebra. 相似文献
2.
In this paper, a lower bound estimate on the uniform radius of spatial analyticity is established for solutions to the incompressible, forced Navier–Stokes system on an \(n\) -torus. This estimate matches previously known estimates provided that a certain bound on the initial data is satisfied. In particular, it is argued that for two-dimensional (2D) turbulent flows, the initial data is guaranteed to satisfy this hypothesized bound on a significant portion of the 2D global attractor, in which case, the estimate on the radius matches the best known one found in Kukavica (1998). A key feature in the approach taken here is the choice of the Wiener algebra as the phase space, i.e., the Banach algebra of functions with absolutely convergent Fourier series, whose structure is suitable for the use of the so-called Gevrey norms. We note that the method can also be applied with other phase spaces such as that of the functions with square-summable Fourier series, in which case the estimate on the radius matches that of Doering and Titi (1995). It can then similarly be shown that for three-dimensional (3D) turbulent flows, this estimate holds on a significant portion of the 3D weak attractor. 相似文献
3.
The main object of this paper is to present a systematic investigation of new classes of quaternion numbers associated with the familiar Pell and Pell-Lucas numbers. The various results obtained here for these classes of quaternion numbers include recurrence relations, summation formulas and Binet’s formulas. 相似文献
4.
In this paper, we investigate some properties of generalized Fibonacci quaternions and Fibonacci-Narayana quaternions in a generalized quaternion algebra. 相似文献
5.
Starting from known results, due to Y. Tian in [5], referring to the real matrix representations of the real quaternions, in this paper we will investigate the left and right real matrix representations for the complex quaternions and we will give some examples in the special case of the complex Fibonacci quaternions. 相似文献
6.
An involution or anti-involution is a self-inverse linear mapping. Involutions and anti-involutions of real quaternions were studied by Ell and Sangwine [15]. In this paper we present involutions and antiinvolutions of biquaternions (complexified quaternions) and split quaternions. In addition, while only quaternion conjugate can be defined for a real quaternion and split quaternion, also complex conjugate can be defined for a biquaternion. Therefore, complex conjugate of a biquaternion is used in some transformations beside quaternion conjugate in order to check whether involution or anti-involution axioms are being satisfied or not by these transformations. Finally, geometric interpretations of real quaternion, biquaternion and split quaternion involutions and anti-involutions are given. 相似文献
7.
Amol Sasane 《Complex Analysis and Operator Theory》2010,4(1):97-107
Let
\mathbbC+ : = {s ? \mathbbC | Re(s) 3 0}{{\mathbb{C}}}_{+} := \{s \in {{\mathbb{C}}}\quad | \quad {\rm Re}(s) \geq 0\} and let A\mathcal{A} denote the Banach algebra
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A = { s( ? \mathbbC+ ) ? [^(f)]a (s) + ?k = 0¥ fk e - stk | lfa ? L1 (0,¥),(fk )k 3 0 ? l1, 0 = t0 < t1 < t2 < ? }{{{\mathcal{A}}}} = \left\{ s( \in {{{\mathbb{C}}}}_ + ) \mapsto \hat{f}_a (s) + \sum\limits_{k = 0}^\infty {f_k e^{ - st_k }}\bigg | \bigg.{\begin{array}{l}{f_a \in L^1 (0,\infty ),(f_k )_{k \geq 0} \in \ell^{1}, } \cr {{0 = t_0 < t_1 < t_2 < \ldots}} \end{array}} \right\} 相似文献
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We will present the general solution of the algebraic Riccati equation for the quaternionic case, where also one additional variation is treated. For computational purpose a very simple form of the exact Jacobi matrix for Riccati polynomials is presented. There are several examples. 相似文献
10.
Let \(V_{n}\) denote the third order linear recursive sequence defined by the initial values \(V_{0}\), \(V_{1}\) and \(V_{2}\) and the recursion \(V_{n}=rV_{n-1}+sV_{n-2}+tV_{n-3}\) if \(n\ge 3\), where r, s, and t are real constants. The \(\{V_{n}\}_{n\ge 0}\) are generalized Tribonacci numbers and reduce to the usual Tribonacci numbers when \(r=s=t=1\) and to the 3-bonacci numbers when \(r=s=1\) and \(t=0\). In this study, we introduced a quaternion sequence which has not been introduced before. We show that the new quaternion sequence that we introduced includes the previously introduced Tribonacci, Padovan, Narayana and third order Jacobsthal quaternion sequences. We obtained the Binet formula, summation formula and the norm value for this new quaternion sequence. 相似文献
11.
Mahmut Akyiğit Hidayet Hüda Kösal Murat Tosun 《Advances in Applied Clifford Algebras》2013,23(3):535-545
Starting from ideas given by Horadam in [5] , in this paper, we will define the split Fibonacci quaternion, the split Lucas quaternion and the split generalized Fibonacci quaternion. We used the well-known identities related to the Fibonacci and Lucas numbers to obtain the relations between the split Fibonacci, split Lucas and the split generalized Fibonacci quaternions. Moreover, we give Binet formulas and Cassini identities for these quaternions. 相似文献
12.
In this paper, the Quaternion-valued Hardy spaces and conjugate Hardyspaces on
are characterized. In analogy with the decomposition of square-integrable function space on the real line
into the direct sum of Hardy space and conjugate Hardy space, the square-integrable Quaternion -valued function space on
is decomposed into the orthogonal sum of the Quaternion Hardy and conjugate Hardy spaces. 相似文献
13.
Mahmut Akyig̃it Hidayet Hüda Kösal Murat Tosun 《Advances in Applied Clifford Algebras》2014,24(3):631-641
In this paper, the Fibonacci generalized quaternions are introduced. We use the well-known identities related to the Fibonacci and Lucas numbers to obtain the relations regarding these quaternions. Furthermore, the Fibonacci generalized quaternions are classified by considering the special cases of quaternionic units. 相似文献
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D. A. Pinotsis 《PAMM》2007,7(1):2040057-2040058
This note gives an overview of two novel applications of Quaternions which appeared in [1]–[3]: First, the evaluation of certain three dimensional real integrals without integrating with respect to the real variables. This is the generalisation of the well-known Cauchy Residue Theorem from the case of two dimensions to the case of four dimensions. Second, the solution of boundary value problems for linear elliptic PDEs in four dimensions. This is the extension of some of the results of [4] from two to four dimensions. (© 2008 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim) 相似文献
17.
Serpil Halici 《Advances in Applied Clifford Algebras》2012,22(2):321-327
In this paper, we investigate the Fibonacci and Lucas quaternions. We give the generating functions and Binet formulas for these quaternions. Moreover, we derive some sums formulas for them. 相似文献
18.
Serpil Halici 《Advances in Applied Clifford Algebras》2013,23(1):105-112
Horadam defined the Fibonacci quaternions and established a few relations for the Fibonacci quaternions. In this paper, we investigate the complex Fibonacci quaternions and give the generating function and Binet formula for these quaternions. Moreover, we also give the matrix representations of them. 相似文献
19.
Quaternions are more usable than three Euler angles in the three dimensional Euclidean space. Thus, many laws in different fields can be given by the quaternions. In this study, we show that canal surfaces and tube surfaces can be obtained by the quaternion product and by the matrix representation. Also, we show that the equation of canal surface given by the different frames of its spine curve can be obtained by the same unit quaternion. In addition, these surfaces are obtained by the homothetic motion. Then, we give some results. 相似文献
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