Newton, Einstein, Gravity, Poetry

     Recent discovery of gravitational waves has put Einstein (1878-1955) -- and even Newton (1643-1727) -- into recent news, and a visit to one of my favorite reference collections, James R. Newman's four-volume collection, The World of Mathematics, finds those two giants celebrated in verse:

Introductory quotes for Section 21 ("The New Law of Gravitation and the Old Law" by Sir Arthur Stanley Eddington) of Part V (on page 1073 of Volume Two) of James R. Newman's The World of Mathematics.

     Here are links to information about the poets named above:  Lord Byron (1788-1824),  Alexander Pope (1688-1744), and Sir John Collings Squire (1884-1958) -- and these links lead to previous blog postings that feature The World of Mathematics:  March 22, 2011 and August 2, 2011.

Miroslav Holub -- "what use is it?"

     In earlier postings I have expressed my admiration for the Czech poet Miroslav Holub (1923-1998)  -- a research scientist who also wrote fine poetry.  In a biographical sketch of Holub at poetryfoundation.org, the poet is quoted as saying, " . . . I'm afraid that, if I had all the time in the world to write my poems, I would write nothing at all."   There is no agreed standard for the amount of time  to spend on a creative work.  Many poets devote their full time to their craft;  others fear over-writing and strictly limit their writing and editing.  In each aspect of our lives it is possible to do too much or too little thinking about things.  And so it goes.
      My post on 5 April 2013 linked to several math-related Holub poems.  And here is another; in "Magnetism," Holub focuses on the sometimes-silly, sometimes-practical, sometimes-too-limiting question often put to mathematics or science, "what use is it?"

Magnetism     by Miroslav Holub

Lagrange points

The Italian-French mathematician Josef Lagrange discovered the existence of five special "Lagrange points" (aka Lagrangian points) in the vicinity of two orbiting bodies where a third, smaller body can orbit at a fixed distance from the larger ones. More precisely, Lagrange Points mark positions where the gravitational pull of the two large bodies precisely cancels the centripetal acceleration required to rotate with them. Poet Catherine Daly considers these points in a poem: