Success Stories: Associate Professor of Mathematics in Missouri Receives EB-1B Approval in 2 Months, 8 Days
Client’s Testimonial:
Thank you very much for the great news. I had heard that you are [the] best in [the] US for EB1 and you proved that. I will strongly recommend you to all my friends.
On January 14, 2014, An Associate Professor of Mathematics in Missouri Received EB-1B (Outstanding Professors and Researchers) Approval (Approval Notice)
General Field: Mathematics
Position at the Time of Case Filing: Associate Professor
Petitioner: A Private University
National Origin: India
Service Center: Nebraska Service Center (NSC)
State Residing at the Time of Filing: Missouri
Approval Notice Date: January 14, 2014
Processing Time: 2 Months, 8 Days
Case Summary:
Here at North America Immigration Law Group – WeGreened.com, we recently worked with an Associate Professor of Mathematics to achieve approval of his EB-1B petition. The client worked closely with von Neumann regular rings, as well as the behavior of modules and their direct sums. He demonstrated that rings are always directly finite, and those that are non-singular contain a bounded index of nilpotence. At the time of case filing, his work had resulted in 21 peer-reviewed articles in international journals and 1 book. He had also presented his findings at 12 conferences and invited talks. His work had been cited 63 times at the time of case filing. In addition, the client permanently held a position on the editorial boards for 3 journals and had refereed for over 28 publications for international journals. This case received EB-1B (Outstanding Researchers/Professors) approval in 2 months, 8 days. As stated by an independent recommender: “Because injective modules are the building blocks of noetherian rings, [Client’s] study promises to revolutionize the fields of Ring Theory and algebraic geometry, generating previously unexplored research avenues and yielding innovative findings that are of use to computer scientists and engineers, in addition to pure mathematicians…He further showed that automorphism -invariant modules satisfy the C2 property. This finding represents a revolutionary, insightful contribution to the field of pure mathematics, and it has aided my own research by answering one of my open questions.”