Basic properties and applications of graded fractal bundles related to Clifford structures: An introduction

Ławrynowicz, Julian; Сузукі, Осаму; Alvarado, F.L. Castillo

doi:10.1007/s11253-008-0082-z

Cited by 4 publications

(5 citation statements)

References 30 publications

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“…We can prove the above assertions with the help of the two enclosed product tables. Now, owing to hints [13] and motivation given in references [7,8,13,15], following some earlier demands appearing in references [11,12,[16][17][18], we can prove the following basic theorems on the Galois extensions.…”

Section: The Galois Extension Structure Of the Nonion Algebramentioning

confidence: 95%

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Fractals and Chaos Related to Ising-Onsager-Zhang Lattices. Quaternary Approach vs. Ternary Approach

Ławrynowicz

Сузукі

Niemczynowicz

et al. 2019

Adv. Appl. Clifford Algebras

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Continuing our idea (Int. J. Geom. Methods Mod. Phys.) of extending some aspects of Onsager (Phys Rev 65:117-149, 1944) crystal statistics to three dimensions taking into account binary and ternary crystal structures in connection with fractals and chaos related to Ising-Onsager-Zhang lattices, we (1) use the Galois extension structure of the nonion algebra, (2) analyze ternary and binary structures of su(3) as well as (3) analyze the identification of the construction of the collection of two ternaries with the collection of three binaries, (4) observe that the approach is applicable to quarks and elementary particles including introduction of colors and, finally, (5) suggest an analysis of three quaternaries vs. four ternaries, involving duodevicenion and/or quindenion algebra.

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Section: The Galois Extension Structure Of the Nonion Algebramentioning

confidence: 95%

“…is the quaternionic algebra, so making its extension by T 2 as in (8) with e k , e k , k = 1, 2, 3, as in (17) and, in analogy to (21) and 22: can be introduced in an analogous way as shown in Fig. 9.…”

Section: Introduction Of Coloursmentioning

confidence: 99%

Fractals and Chaos Related to Ising-Onsager-Zhang Lattices. Quaternary Approach vs. Ternary Approach

Ławrynowicz

Сузукі

Niemczynowicz

et al. 2019

Adv. Appl. Clifford Algebras

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“…The results obtained have a clear physical significance [2], [5], [9], [11], [16], [17], [25], [26].…”

Section: Setting Of a Linearization Procedurementioning

confidence: 95%

“…(b) Then the general solution of the system (33) is a linear combination (27) with complex coefficients of 42 fundamental solutions which, in the case of (16), are explicitly given by the formulae (29)-(31).…”

Section: Setting Of a Linearization Procedurementioning

confidence: 99%

“…(ii) Then a solution s of (33) can be expressed as in (25) with coefficients as in (26) and (24), and the matrices (18) can be specified according to (20) in terms of para-quaternions. Moreover, the general solution of the system (33) is a linear combination (27) with complex coefficients of 42 fundamental solutions which, in the case of (16), are given explicitly by the formulae (29)-(31), where s 0 is determined by (16).…”

Section: Setting Of a Linearization Procedurementioning

confidence: 99%

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(Para) quaternionic geometry, harmonic forms, and stochastical relaxation

Ławrynowicz

Marchiafava

Alvarado³

et al. 2014

Publ. Math. Debrecen

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Both quaternionic and para-quaternionic geometry are important when studying harmonic forms and stochastical relaxation with the help of Fokker-Plancktype or Oguchi-type parabolic equations. In a recent paper the first-named author and H. M. Polatoglou (2012) have shown that the five-dimensional case is the simplest case that the use of para-quaternions is more convenient that the use of quaternions. Now we discuss that case in some detail.

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