[1] 91i:11004 Filaseta, Michael A.; Richman, David R. Sets which contain a quadratic residue modulo $p$ for almost all
$p$.
Math. J. Okayama Univ. 31 (1989), 1--8. (Reviewer: Klaus Burde) 11A15
[2] 91g:86010 Richman, David; Sharp, W. E. A method for determining the reversibility of a Markov sequence.
Math. Geol. 22 (1990), no. 7, 749--761. 86A32 (60J99 62M99)
[3] 91g:15020 Richman, David R. On vector invariants over finite fields.
Adv. Math. 81 (1990), no. 1, 30--65. (Reviewer: Joseph Kung) 15A72 (13E15 20G40)
[4] 90d:20017 Richman, David R. The fundamental theorems of vector invariants.
Adv. in Math. 73 (1989), no. 1, 43--78. (Reviewer: Andrea Brini) 20C07 (05A99 15A72)
[5] 89f:11148 Hardy, Kenneth; Hudson, Richard H.; Richman, David; Williams, Kenneth S. Determination of all imaginary cyclic quartic fields with class number
$2$.
Trans. Amer. Math. Soc. 311 (1989), no. 1, 1--55. (Reviewer: Duncan A. Buell) 11R16 (11R29)
[6] 89d:15003 Richman, David R. A result about block Vandermonde matrices.
Linear and Multilinear Algebra 21 (1987), no. 2, 181--189. (Reviewer: Robert M. McConnel) 15A33 (12E20)
[7] 89d:11087 Richman, David R. The Waring problem for matrices.
Linear and Multilinear Algebra 22 (1987), no. 2, 171--192. (Reviewer: L. N. Vaserstein) 11P05 (15A33)
[8] 88m:11112 Hardy, Kenneth; Hudson, R. H.; Richman, D.; Williams, Kenneth S.; Holtz, N. M. Calculation of the class numbers of imaginary cyclic quartic
fields.
Math. Comp. 49 (1987), no. 180, 615--620. (Reviewer: Ken Nakamula) 11Y40 (11R16 11R29)
[9] 88j:15006 Richman, David R.; Wang, Quan Long On generalized Vandermonde determinants.
Current trends in matrix theory (Auburn, Ala., 1986),
285--295, North-Holland, New York-Amsterdam, 1987. (Reviewer: Thomas H. Foregger) 15A15 (15A45)
[10] 88e:15007 Richman, David R. Addendum to: "Matrices as sums of squares: a conjecture of Griffin
and Krusemeyer" [Linear and Multilinear Algebra {\bf 17} (1985), no. 3,
289--294; MR 87a:15022].
Linear and Multilinear Algebra 20 (1987), no. 4, 389. 15A24 (11C20 12D15)
[11] 88d:12004 Richman, David R. On the computation of minimal polynomials.
J. Algebra 103 (1986), no. 1, 1--17. (Reviewer: Kevin S. McCurley) 12E12 (12-04 68Q40)
[12] 87a:15022 Richman, David R. Matrices as sums of squares: a conjecture of Griffin and
Krusemeyer.
Linear and Multilinear Algebra 17 (1985), no. 3-4, 289--294. (Reviewer: John H. Hodges) 15A24 (11C20 12D15)
[13] 86k:12002 Peskin, Barbara R.; Richman, David R. A method to compute minimal polynomials.
SIAM J. Algebraic Discrete Methods 6 (1985), no. 2, 292--299. (Reviewer: J. H. Davenport) 12-04 (12E05 68Q40)
[14] 86k:05009 Richman, David R. On balanced sets mod $p$.
J. Combin. Theory Ser. A 40 (1985), no. 1, 179--182. (Reviewer: Robert Girse) 05A17 (11T15)
[15] 86d:11100 Richman, David R. Some remarks on the number of solutions to the equation $f(X\sb
1)+\cdots +f(X\sb n)=0$.
Stud. Appl. Math. 71 (1984), no. 3, 263--266. (Reviewer: S. W. Graham) 11T41
[16] 84h:10026 Richman, David R. Polynomial relations among the $n$th roots of one.
J. Number Theory 16 (1983), no. 1, 14--18. (Reviewer: Ming-Chit Liu) 10B30 (10B15)
[17] 84d:47035 Richman, David R. A new proof of a result about Hankel operators.
Integral Equations Operator Theory 5 (1982), no. 6, 892--900. (Reviewer: Jeffrey R. Butz) 47B35
[18] 83m:05004 Ein, Lawrence M. H.; Richman, David Ross; Kleitman, Daniel J.; Shearer, James; Sturtevant, Dean Some results on systems of finite sets that satisfy a certain
intersection condition.
Stud. Appl. Math. 65 (1981), no. 3, 269--274. (Reviewer: Peter Frankl) 05A05
[19] 83j:15015 Richman, David Ross Matrices which commute with their transposes over a field of
characteristic two.
Linear and Multilinear Algebra 10 (1981), no. 2, 131--140. 15A33 (15A27)