Hello everyone,
Tomorrow we will be holding usual seminar. I will be speaking. My title and abstract are below.
Title: Exceptional Surgeries in 3-manifolds
Abstract: Bob (Myers) shows that every compact, connected, orientable 3–manifold with no 2– sphere boundary components contains a hyperbolic knot. We use work of Ikeda with an observation of Adams-Reid to show that every 3–manifold subject to the above conditions contains a hyperbolic knot which admits a non-trivial non-hyperbolic surgery, a toroidal surgery in particular. We conclude with a question and a conjecture about reducible surgeries. This is joint work with Ken Baker.
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Neil R. Hoffman Assistant Professor Department of Mathematics 523 Math Science Building Oklahoma State University Stillwater, OK 74078-1058 405-744-7791 http://math.okstate.edu/people/nhoffman
Sorry I forgot to send out the link. It's the same as always. https://meet.google.com/frv-bgow-byi [https://fonts.gstatic.com/s/i/productlogos/meet_2020q4/v1/web-96dp/logo_meet...]https://meet.google.com/frv-bgow-byi Meethttps://meet.google.com/frv-bgow-byi Real-time meetings by Google. Using your browser, share your video, desktop, and presentations with teammates and customers. meet.google.com
______________________
Neil R. Hoffman Assistant Professor Department of Mathematics 523 Math Science Building Oklahoma State University Stillwater, OK 74078-1058 405-744-7791 http://math.okstate.edu/people/nhoffman
________________________________ From: Mdtop mdtop-bounces@mathdept.okstate.edu on behalf of Hoffman, Neil nhoffman@math.okstate.edu Sent: Tuesday, February 16, 2021 4:26 PM To: mdtop@mathdept.okstate.edu mdtop@mathdept.okstate.edu Subject: [Mdtop] Tomorrow in seminar
Hello everyone,
Tomorrow we will be holding usual seminar. I will be speaking. My title and abstract are below.
Title: Exceptional Surgeries in 3-manifolds
Abstract: Bob (Myers) shows that every compact, connected, orientable 3–manifold with no 2– sphere boundary components contains a hyperbolic knot. We use work of Ikeda with an observation of Adams-Reid to show that every 3–manifold subject to the above conditions contains a hyperbolic knot which admits a non-trivial non-hyperbolic surgery, a toroidal surgery in particular. We conclude with a question and a conjecture about reducible surgeries. This is joint work with Ken Baker.
______________________
Neil R. Hoffman Assistant Professor Department of Mathematics 523 Math Science Building Oklahoma State University Stillwater, OK 74078-1058 405-744-7791 http://math.okstate.edu/people/nhoffmanhttps://nam04.safelinks.protection.outlook.com/?url=http%3A%2F%2Fmath.okstate.edu%2Fpeople%2Fnhoffman&data=04%7C01%7Cneil.r.hoffman%40okstate.edu%7C7a2d273332364b36559f08d8d2c9ec6b%7C2a69c91de8494e34a230cdf8b27e1964%7C0%7C0%7C637491111994883835%7CUnknown%7CTWFpbGZsb3d8eyJWIjoiMC4wLjAwMDAiLCJQIjoiV2luMzIiLCJBTiI6Ik1haWwiLCJXVCI6Mn0%3D%7C1000&sdata=Mx0wO697ESXdyPQtD7LJhzxP%2Bf8ak59iNKw5pttHmi8%3D&reserved=0
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Hoffman, Neil