John H Smith

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John H. Smith is a mathematician formerly of Boston College, where he retired in 2005.[1] He contributed to graph theory, combinatorics, and voting theory, among other fields.

[edit] Papers

R. H. Gross and John H. Smith, "A Generalization of a Conjecture of Hardy and Littlewood to Algebraic Number Fields", Rocky Mountain Journal of Mathematics, 30:1, Spring 2000, pp. 195–215.
John H. Smith, "Solution to problem number 1567 (matrices)", Mathematics Magazine, 73 (2000), pp. 67–68.
John H. Smith, "Factoring, into edge transpositions of a tree, permutations fixing a terminal vertex", Journal of Combinatorial Theory (Series A), 85 (1999), pp. 92–95.
John H. Smith, "Solution to problem number 10390 (permutations)", American Mathematical Monthly, 104 (1997), No. 4, p. 367.
John H. Smith, "General trinomials having symmetric Galois group", Proc. Amer. Math. Soc, 63 (1977), pp. 208–212.
John H. Smith, "Symmetry and multiple eigenvalues of graphs", Glas. Mat. Ser. III 12 (1977).
Alan J. Hoffman and John H. Smith, "On the spectral radii of topologically equivalent graphs", Recent advances in graph theory, Academia, Prague 1975.
John H. Smith, "Aggregation of preferences with variable electorate", Econometrica, vol. 41, pp. 1027–1041, 1973.
John H. Smith, "On S-units almost generated by S-units of subfields", Pacific Journal of Mathematics, Vol. 34, no. 3 (1970), pp. 803–805.