The violent nature of explosive volcanic eruptions makes understanding their behavior both imperative and extremely challenging. These dangerous natural phenomena threaten society in a variety of ways ranging from destruction of local communities to disrupting global air traffic to influencing global climate change. Our ability to mitigate the r...
Creator:
Ogden, Darcy E. (Scripps Institution of Oceanography)
Created:
2011-04-12
Contributed By:
University of Minnesota, Institute for Mathematics and its Applications.
Published in: Africa : being an accurate description of the regions of Aegypt, Barbary, Lybia, and Billedulgerid, the land of Negroes, Guinee, Aethiopia, and the Abyssines, with all the adjacent islands, either in the Mediterranean, Atlantick, Southern, or Oriental Sea, belonging thereunto : with the several denominations of their coasts, harbor...
Creator:
Ogilby, John, 1600-1676
Created:
1670
Contributed By:
University of Minnesota Libraries, James Ford Bell Library.
Published in: Africa : being an accurate description of the regions of Aegypt, Barbary, Lybia, and Billedulgerid, the land of Negroes, Guinee, Aethiopia, and the Abyssines, with all the adjacent islands, either in the Mediterranean, Atlantick, Southern, or Oriental Sea, belonging thereunto : with the several denominations of their coasts, harbor...
Creator:
Ogilby, John, 1600-1676
Created:
1670
Contributed By:
University of Minnesota Libraries, James Ford Bell Library.
Published in, John Ogilby, Africa : being an accurate description of the regions of Aegypt, Barbary, Lybia, and Billedulgerid, the land of Negroes, Guinee, Aethiopia, and the Abyssines, with all the adjacent islands, either in the Mediterranean, Atlantick, Southern, or Oriental Sea, belonging thereunto : with the several denominations of their c...
Creator:
Ogilby, John, 1600-1676
Created:
1670
Contributed By:
University of Minnesota Libraries, James Ford Bell Library.
Liz Fierst is a Korean American adoptee. She was raised in Minneapolis and has traveled to many places throughout her adult life. She is now a prinicpal for a Middle School in San Francisco.
Creator:
O'Hagan, Ruby
Contributor:
Rolland, Isabella
Created:
2021-10-20
Contributed By:
University of Minnesota, Immigration History Research Center
This is an introduction to the lectures and the tutorials. We will study different topics, differential geometric topic using analysis for the lectures and topological topics with numerical experiments for the tutorials. A survey for the knot energies will also be given.
Creator:
O'Hara, Jun (Chiba University)
Created:
2019-06-17
Contributed By:
University of Minnesota, Institute for Mathematics and its Applications.
We begin with the generalization of electrostatic energy of charged knots, where we come across the difficulty of divergent integrals. Two kinds of regularization will be introduced, Hadamard regularization and the regularization via analytic continuation, both from the theory of generalized functions.
Creator:
O'Hara, Jun (Chiba University)
Created:
2019-06-18
Contributed By:
University of Minnesota, Institute for Mathematics and its Applications.
We will see that Hadamard regularization and the regularization via analytic continuation give essentially the same information. This part is rather technical, although it will save complicated computation afterward.
Creator:
O'Hara, Jun (Chiba University)
Created:
2019-06-20
Contributed By:
University of Minnesota, Institute for Mathematics and its Applications.
We apply the regularization via analytic continuation to generalized Riesz energies of submanifolds in Euclidean spaces to obtain Brylinski's beta function, which is a meromorphic function with simple poles. We study geometric information that can be derived from Brylinski's beta function.
Creator:
O'Hara, Jun (Chiba University)
Created:
2019-06-21
Contributed By:
University of Minnesota, Institute for Mathematics and its Applications.
A method to construct M\"obius invariant weighted inner products on the tangent spaces of the knot space by using M\"obius invariant knot energies will be introduced. It gives M\"obius invariant gradients of such energies."
Creator:
O'Hara, Jun (Chiba University)
Created:
2019-06-25
Contributed By:
University of Minnesota, Institute for Mathematics and its Applications.
Margaret Deirdre O'Hartigan is an Irish Catholic transsexual woman, transsexual health and rights activist, writer, and retired secretary and typesetter living in Portland, Oregon. Prior to her retirement, O'Hartigan was involved in a number of trans civil rights and nondiscrimination campaigns in Oregon, Washington, and Minnesota, including suc...
Creator:
O'Hartigan, Margaret Deirdre (interviewee)
Contributor:
Billund-Phibbs, Myra (interviewer, project manager, and transciber)
Created:
2022-04-06
Contributed By:
University of Minnesota Libraries, Jean-Nickolaus Tretter Collection in Gay, Lesbian, Bisexual and Transgender Studies.
