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    • CommentRowNumber1.
    • CommentAuthoraleksr
    • CommentTimeMar 21st 2019

    This is a base topic of my contribution. It introduces a new function that gives series whose coefficients are powers of fine structure constant. Furthermore each member represents natural physical interaction. It can be treated as natural physics that introduces natural particles.

    May be I made a lot of mistakes. I will correct them.

    v1, current

    • CommentRowNumber2.
    • CommentAuthoraleksr
    • CommentTimeMar 21st 2019

    This is a base topic of my contribution. It introduces a new function that gives series whose coefficients are powers of fine structure constant. Furthermore each member represents natural physical interaction. It can be treated as natural physics that introduces natural particles.

    May be I made a lot of mistakes. I will correct them.
    

    v1, current

    • CommentRowNumber3.
    • CommentAuthorRichard Williamson
    • CommentTimeMar 24th 2019
    • (edited Mar 24th 2019)

    Page deleted, but content available here.

    • CommentRowNumber4.
    • CommentAuthoraleksr
    • CommentTimeJan 18th 2020

    Could someone return my page “Hyperanalytic functions” to the normal position, please. I would like to continue it.

    • CommentRowNumber5.
    • CommentAuthorTodd_Trimble
    • CommentTimeJan 19th 2020

    It sounds like you weren’t listening to any of our earlier concerns. Anyway, the nLab cannot function as a perch for random people to write up their personal theories. So the answer for now is: no.

    • CommentRowNumber6.
    • CommentAuthorGuest
    • CommentTimeJan 19th 2020

    I understood what you said. However, let me show just a small piece of power an hyperanalytic function. I apologize that I do not know how to use Markdown+Itex.

    As is known in the Standard Model, the baryon asymmetry of the universe is an unsolved physical problem.

    P.A.M. Dirac showed that

    q Sq e=q Nq p=12α, \frac{q_{S}}{q_{e}}=\frac{q_{N}}{q_{p}}=\frac{1}{2\alpha},

    where q Sq_{S} и q Nq_{N} — Dirac’s magnetic monopoly charges, q eq_{e} — electron charge and q pq_{p} — positron charge, and α\alpha — fine structure constant. Since there are charges of particles and antiparticles in the denominators, we can expect that in the numerators there are also charges of particles and antiparticles!

    Using my definition of the fine structure constant

    α(σ)=12 max min max+ min. \alpha\left(\sigma\right)=\frac{1}{2}\frac{\mathbb{R}_{max}-\mathbb{R}_{min}}{\mathbb{R}_{max}+\mathbb{R}_{min}}.

    you can get

    min max=12α(σ)1+2α(σ). \frac{\mathbb{R}_{min}}{\mathbb{R}_{max}}=\frac{1-2\alpha\left(\sigma\right)}{1+2\alpha\left(\sigma\right)}.

    Thus, the hyperanalytic function explains the baryon asymmetry of the universe by the following connection between electrical and magnetic charges:

    min max=q S/q e1q N/q p+1. \frac{\mathbb{R}_{min}}{\mathbb{R}_{max}}=\frac{{q_{S}}/{q_{e}}-1}{{q_{N}}/{q_{p}}+1}.
    • CommentRowNumber7.
    • CommentAuthoraleksr
    • CommentTimeJan 19th 2020

    Aleksandr Rybnnikov New York, NY

    • CommentRowNumber8.
    • CommentAuthorDavidRoberts
    • CommentTimeJan 20th 2020

    I second what Todd wrote in #5.

    • CommentRowNumber9.
    • CommentAuthorUrs
    • CommentTimeJan 20th 2020

    Hi Aleksandr,

    your reply in #6 only strengthened the point that your material is not appropriate here. Also, there is nobody here who would give you the the feedback you will be looking for, so that neither we nor you yourself should have any interest in continuing this.

    To get actual feedback, you might want to consider sharing your thoughts on PhysicsForums, such as in the section High Energy, Nuclear, Particle Physics Forum or maybe rather in Beyond the Standard Model Forum where they are quite used to this kind of exchange.