BOOK 1. UNMASKING THE HIDDEN. N. LEVASHOV'S «SVETL BROOM» IN A. KHATYBOV'S «BATH SCHOOL» AND A LABOUR SPADE.

F. Shkrudnev N. Levashov's «SvetL Broom» in A. Khatybov's «Bath School» and A Labour Spade 279 manufactured household appliances and various devices using defense technologies, then the chief director of ZAO the “First Leasing Company”. In 1991 he became the deputy chairman of the KGB of the USSR. In 1992 he retired for health reasons. This is according to the official version. But in fact, the reason for the resignation was a sharp conflict with then "democratic" head of the KGB Bakatin, who passed the Americans strategically important information and let out schemes for "wiretapping" the American embassy in Moscow. It was under the cover of General Sham N.A. ANT business concern (Automation, Science, Technology) was working on several revolutionary trends in technology, engineering and other fields. "The leading" genius was Alexander Khatybov, a mathematician fromGod, whomwe introduced then in the ANT”, the general said. – " In the US, billions of dollars of budgetary funds were spent on the creation of the newest generation of computers with a trillion of operations per second. Super-computers have already been called a wonder of the XXI century. And the domestic mathematics genius Alexander Khatybov fifteen years ago on a primitive, by today's standards, personal computer coped with tasks that required machines with an operating speed of thousands of millions operations per second ". General Sham said that THERE WAS NO such a thing as speed limitation of computation for Alexander. Should Khatybov live in the US he would have become richer than Gates and would have been awarded several Nobel prizes long ago. "Alexander practically created HIS OWN MATHEMATICS , that made the experts HAIR STOOD ON END . If not to go into detail, Khatybov's method allows us to solve the most complicated mathematical problems ten times faster. For example, the famous "traveling salesman problem". It is classically difficult problem. Imagine that you are a sales agent, and you have to visit dozens of cities that are scattered around the map here and there. How to make an optimal route to visit each one, spending minimum of time on it? The more destinations, the more challenging the task. But Khatibov clicked on these tasks like seeds. We checked the efficiency of his system, suggesting that Alexander solve the problems over which the academic institutions had already racked their brains (naturally, without telling him that they had already been solved). The results surpassed all expectations: he coped with "the tests" in a matter of minutes, whereas it took traditional mathematicians days or even