657,932 research outputs found
Arithmetic of Plane Cremona Transformations and the Dimensions of Transfinite Heterotic String Space-Time
It is shown that the two sequences of characteristic dimensions of
transfinite heterotic string space-time found by El Naschie can be remarkably
well accounted for in terms of the arithmetic of self-conjugate homaloidal nets
of plane algebraic curves of orders 3 to 20. A firm algebraic geometrical
justification is thus given not only for all the relevant dimensions of the
classical theory, but also for other two dimensions proposed by El Naschie,
viz. the inverse of quantum gravity coupling constant (~42.36067977) and that
of (one half of) fine structure constant (~68.54101967). A non-trivial coupling
between the two El Naschie sequences is also revealed.Comment: 4 pages, no figures, accepted in Chaos, Solitons & Fractal
On Veech's proof of Sarnak's theorem on the M\"{o}bius flow
We present Veech's proof of Sarnak's theorem on the M\"{o}bius flow which say
that there is a unique admissible measure on the M\"{o}bius flow. As a
consequence, we obtain that Sarnak's conjecture is equivalent to Chowla
conjecture with the help of Tao's logarithmic Theorem which assert that the
logarithmic Sarnak conjecture is equivalent to logaritmic Chowla conjecture,
furthermore, if the even logarithmic Sarnak's conjecture is true then there is
a subsequence with logarithmic density one along which Chowla conjecture holds,
that is, the M\"{o}bius function is quasi-generic.Comment: 11 pages. Some misprints are corrected, and some details about the
proof of the main result is added. We further add :"W. Veech in his letter
indicated to me that there is only four persons in the world who has a copy
of his notes including me.
A Further Note on a Formal Relationship Between the Arithmetic of Homaloidal Nets and the Dimensions of Transfinite Space-Time
A sequence of integers generated by the number of conjugated pairs of
homaloidal nets of plane algebraic curves of even order is found to provide an
>exact< integer-valued match for El Naschie's primordial set of fractal
dimensions characterizing transfinite heterotic string space-time.Comment: 3 pages, no figures, submitted to Chaos, Solitons & Fractal
On the spectral type of some class of rank one flows
It is shown that a certain class of Riesz product type measure on
is singular. This proves the singularity of the spectral types of
some class of rank one flows. Our method is based on the extension of the
Central Limit Theorem approach to the real line which gives a new extension of
Salem-Zygmund Central Limit Theorem.Comment: revised version with 19 pages. Submitted for publicatio
A new class of rank one transformations with singular spectrum
We introduce a new tool to study the spectral type of rank one
transformations using the method of central limit theorem for trigonometric
sums. We get some new applications.Comment: 16 pages et 27 r\'ef\'erence
On the spectrum of -rigid maps
It is shown that there exists an -rigid transformation with
less or equal to whose spectrum has Lebesgue component. This answers
the question raised by Klemes and Reinhold in \cite{Klemes-Reinhold}. We
exhibit also a large class of -rigid transformations with singular
spectrum.Comment: 15 pages. Accepted for publication in Journal of Dynamical and
Control System
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