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<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">Hello Hodge,</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">When you write "<i>could your and his model of  electron and photon be that the photon/electron is made of magnets and the vortices</i>" I think that you correctly relate the magnetic field with two charges.</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">My answer is definitely yes. And I think that this could work in my model, at least, your vortices could possibly represent the varying intensity of the E fields as they cyclically vary in intensity.</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">If you look at equation (14) in the last paper I referred Richard to:</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif"><a href="https://www.omicsonline.org/open-access/gravitation-quantum-mechanics-and-the-least-action-electromagneticequilibrium-states-2329-6542-1000152.pdf" style="color:blue; text-decoration:underline">https://www.omicsonline.org/open-access/gravitation-quantum-mechanics-and-the-least-action-electromagneticequilibrium-states-2329-6542-1000152.pdf</a></span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">you will see that the photon E fields is made of 2 components, whose common E field definition is drawn from my paper ("Field equations for ..."), and is also shown as the second equation (13) , both of which cyclically morph into a single B field, whose definition also comes from the ("Field equations for ...") paper.</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">Now this is not obvious in equation (14), but both electric components cyclically oscillate in opposite directions with respect to each other from a maximum distance set at (lambda alpha)/(2 pi) at maximum intensity to zero distance at zero intensity when the B field reaches max intensity. You can se a representation of this cyclic motion with this image (Figure 9) in my paper on the de Broglie photon):</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><img src="data:image/png;base64,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"></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">The paper for the de Broglie photon is here:</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif"><a href="https://www.omicsonline.com/open-access/on-de-broglies-doubleparticle-photon-hypothesis-2090-0902-1000153.pdf" style="color:blue; text-decoration:underline">https://www.omicsonline.com/open-access/on-de-broglies-doubleparticle-photon-hypothesis-2090-0902-1000153.pdf</a></span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">Since these 2 components of the photon E field always are moving in opposite directions, either away from, or towards each other, then your vortices applied to the varing intensity of the opposite charges as they move would make sense in my view.</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">Best Regards</span></span></p>

<p style="margin-right:0cm; margin-left:0cm"><span style="font-size:12pt"><span style="font-family:"Times New Roman",serif">André</span></span></p>

<footer class="signatureDivContainer">
<footer class="signatureContainer" style="display:inline;">---<br>
André Michaud<br>
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<footer class="replyforwardcontainer"><br>
<br>
<span>On Fri, 15 Dec 2017 22:06:03 +0000 (UTC), Hodge John <jchodge@frontier.com> wrote:</jchodge@frontier.com></span><br>
 
<div style="color:#000; background-color:#fff; font-family:Helvetica Neue, Helvetica, Arial, Lucida Grande, sans-serif;font-size:13px">
<div id="yui_3_16_0_ym19_1_1513374509996_3754">Andre:</div>

<div id="yui_3_16_0_ym19_1_1513374509996_3755">Thanks for the reference to Marmet's paper ("Fundamental nature ...") and you paper ("Field equations for ...").</div>

<div id="yui_3_16_0_ym19_1_1513374509996_3756">The vortices seem very interesting to my model ecause my plenum is non-viscus. I lthink his description of diffraction of photons doesn't work - especially for the single photon case.</div>

<div id="yui_3_16_0_ym19_1_1513374509996_3757">More to the point - could your and his model of electron and photon be that the photon/electron is made of magnets and the vortices ( I really like the vortices in my model -just still trying to apply) . The prime issue of the Poincare stress is solved and the "hollow" aspect is gone. I think the other issues can be solved if the rotation direction of the electric vortices are opposite (how to define direction) for positive and negative charge.</div>

<div id="yui_3_16_0_ym19_1_1513374509996_3758">Could this work in your model?</div>

<div id="yui_3_16_0_ym19_1_1513374509996_3759">You'll notice I'm "out of the box" , also. My diffraction test is the 2 Hodge experiments and the Afshar experiment that reject wave light models.</div>

<div dir="ltr" id="yui_3_16_0_ym19_1_1513374509996_3760">Hodge</div>
</div>
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