L.S.,
With regards to the claim made by VME, Brian Beesley and I asked them to
produce a factor of M(727). They did not come up with a factor. Instead
they came up with the following (mass) reply which I leave to everyone's
own thoughts. They also attached a letter in .gif format which can be
viewed at http://home.wxs.nl/~tha/Mersenne/endorse.gif
YotN,
Henk Stokhorst.
-----
Meganet P-Time Deterministic Primality Test endorsed by world renowned
mathematician.
In response to your email inquiring about our Polynomial Time 100%
Deterministic Prime Testing, we have attached the endorsement for that
method. The attachment is in GIF format, and can be viewed or printed
from
any browser.
The method was reviewed and endorsed by a world renowned mathematician,
Professor Jaime Milstein.
Professor Jaime Milstein is a top ranking government mathematician, who
won
a medal from the president last year for his achievements for the
country.
He have published many articles in different publications, such as
"Linear
Algebra and its applications" published by Moshe Goldberg.
Professor Jaime Milstein have reviewed the method, described the work as
novel and intriguing, and highly recommends its implementation.
Professor
Jaime Milstein also submitted the work to another top ranking
mathematician
for an independent review, and he concurred with his findings.
The attached endorsement includes Professor Jaime Milstein conclusion
about
the algorithm, along with his mailing address and phone number. However,
we
ask that prior to calling him you'll give us a call to schedule such a
call,
as we'd like to respect his time.
This endorsement was sent to you since you inquired about our
mathematical
proof. It should be sufficient for a mathematician to accept our claims.
If you're interested in commercially implementing the algorithm for
commercial purposes, we'll be more than glad to discuss it further with
you,
and disclose the mathematics behind it to you. However, if your interest
is
purely scientific, this endorsement should be sufficient.
Keep in mind that leading research facilities are already examining this
algorithm for commercial use, and that this method is a worldwide
mathematical breakthrough.
You can contact us by either replying to [EMAIL PROTECTED], or calling
us at 818-757-3890.
Thank you for your interest in Meganet Corporation.
Saul.
-----
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