Large Torsional Oscillations in Suspension Bridges Revisited: Fixing an Old Approximation
by P. J. McKenna
When people discuss large torsional oscillations of suspension bridges like the one at the Tacoma Narrows, they invariably linearize the trigonometry out of the problem, unwittingly making a small-angle assumption. In this paper, I re-derive the equations for a torsionally oscillating plate, choosing the physical constants in accordance with the historical record.
I show how nonlinearity from the trigonometry embedded in the problem leads naturally to large amplitude motions sustained by small forces. These motions are an excellent match for the historical record. I also show how large vertical (nontorsional) motions can lead, via a sudden instability, into the purely torsional motions of the type recorded on famous historical film footage.
Inverse Conjugacies and Reversing Symmetry Groups
by Geoffrey R. Goodson
Some elementary group theory that arises in the theory of time-reversing dynamical systems is presented. Given a group G, and a, a member of G, then
are the centralizer and skew centralizer of a respectively. B(a) need not be a group and in fact is a group if and only if a is an involution, i.e., a2 = e, the identity of G. However, E(a), the union of C(a) and B(a) is always a group, called the reversing symmetry group of a. Properties of E(a) are given and several examples are studied.
More on Paperfolding
by Dmitry Fuchs and Serge Tabachnikov
It is a common knowledge that folding a sheet of paper yields a straight line. We study paper folding along arbitrary smooth curves and describe the curves in space that can be obtained as the result of such folding.
Trigonometric Integrals and Hadamard Products
by L. R. Bragg
The Hadamard product and a generalized version of it are employed to evaluate a variety of single and multiple trigonometric integrals and to substantiate binomial identities. They are also used to develop integral formulas for special functions including the Laguerre polynomials. Finally, they permit obtaining selector functions, which yield integral forms for the sums of coefficients of certain subterms of a given series or polynomial.
by Richard Blecksmith, Paul Erdös, and J. L. Selfridge
A cluster prime is a prime p such that every even number up to p - 3 is a difference of two primes not greater than p. The authors prove that the cluster primes are fairly sparsely distributed among all the primes. They describe an algorithm for efficiently finding the next cluster prime after a given one, and give some data on the cluster primes up to 1013.
Fermat's Last Theorem for Gaussian Integer Exponents
by John A. Zuehlke
On Rational Function Approximations to Square Roots
by M. J. Jamieson
THE EVOLUTION OF... The Birth of Literal Algebra
by I. G. Bashmakova and G. S. Smirnova
PROBLEMS AND SOLUTIONS
Mathematics: From the Birth of Numbers
By Jan Gullberg
Reviewed by Arnold Allen
Harold P. Boas
Handbook of Applied Cryptography
By Alfred J. Menezes, Paul C. Van Oorschot, and Scott A. Vanstone
The Cryptographic Imagination: Secret Writing from Edgar Poe to the Internet
By Shawn James Rosenheim
Reviewed by Jeffrey Shallit