Items Authored by Reay, John R.
[1] 1 758 066 Reay, J. R.; Zamfirescu, T. Hamiltonian cycles in T-graphs. The Branko Grünbaum birthday issue. Discrete Comput. Geom. 24 (2000), no. 2-3, 497--502. 05C45
[2] 2000h:52018 Klee, Victor; Reay, John R. A surprising but easily proved geometric decomposition theorem. Math. Mag. 71 (1998), no. 1, 3--11. (Reviewer: Yu. A. Shashkin) 52C05 (03E20)
[3] 98a:52027 Ding, Ren; Reay, John R.; Zhang, Jianguo Areas of generalized $H$-polygons. J. Combin. Theory Ser. A 77 (1997), no. 2, 304--317. (Reviewer: G. D. Chakerian) 52C05 (52A38)
[4] 95m:05092 Reay, John R.; Rogers, D. G. Thin Hamiltonian cycles on Archimedean graphs. European J. Combin. 16 (1995), no. 2, 185--189. 05C10 (05C45)
[5] 94h:52011 Ding, Ren; Ko\l odziejczyk, Krzysztof; Murphy, Grattan; Reay, John A fast Pick-type approximation for areas of $H$-polygons. Amer. Math. Monthly 100 (1993), no. 7, 669--673. (Reviewer: G. D. Chakerian) 52A38 (52B20)
[6] 93g:52016 Ko\l odziejczyk, Krzysztof; Reay, John R. Primitive and mensurable hex-triangles. Geom. Dedicata 43 (1992), no. 2, 233--241. (Reviewer: Paul R. Scott) 52C20 (52C05)
[7] 92b:52042 Danzer, Ludwig; Murphy, Grattan; Reay, John Translational prototiles on a lattice. Math. Mag. 64 (1991), no. 1, 3--12. (Reviewer: Marjorie Senechal) 52C20 (52C05)
[8] 89f:52033 Ding, Ren; Reay, J. R. Areas of lattice polygons, applied to computer graphics. Proceedings of the International Conference on Combinatorial Analysis and its Applications (Pokrzywna, 1985). Zastos. Mat. 19 (1987), no. 3-4, 547--556 (1988). (Reviewer: J. M. Wills) 52A43 (05B40 52A45 68U05)
[9] 89a:52033 Ding, Ren; Ko\l odziejczyk, Krzysztof; Reay, John A new Pick-type theorem on the hexagonal lattice. Discrete Math. 68 (1988), no. 2-3, 171--177. (Reviewer: R. Blind) 52A43
[10] 88a:52023 Ren, Ding; Reay, John R. The boundary characteristic and Pick's theorem in the Archimedean planar tilings. J. Combin. Theory Ser. A 44 (1987), no. 1, 110--119. (Reviewer: R. Bantegnie) 52A45 (05B45)
[11] 84k:90103b Ruckle, William H.; Reay, John R. Ambushing random walks. III. More continuous models. Oper. Res. 29 (1981), no. 1, 121--129. 90D05 (90B40)
[12] 83f:52006 Reay, John R. Open problems around Radon's theorem. Convexity and related combinatorial geometry (Norman, Okla., 1980), pp. 151--172, Lecture Notes in Pure and Appl. Math., 76, Dekker, New York, 1982. (Reviewer: Marilyn Breen) 52A35
[13] 83c:52008 Doignon, Jean-Paul; Reay, John R.; Sierksma, Gerard A Tverberg-type generalization of the Helly number of a convexity space. J. Geom. 16 (1981), no. 2, 117--125. (Reviewer: V. P. Soltan) 52A35 (52A01)
[14] 81f:52017 Reay, John R. Several generalizations of Tverberg's theorem. Israel J. Math. 34 (1979), no. 3, 238--244 (1980). (Reviewer: Jean-Paul Doignon) 52A35
[15] 81c:05021 Reay, John R. Twelve general position points always form three intersecting tetrahedra. Discrete Math. 28 (1979), no. 2, 193--199. (Reviewer: Ethan D. Bolker) 05B30
[16] 47 #9423 Barnette, David; Reay, John R. Projections of $f$-vectors of four-polytopes. J. Combinatorial Theory Ser. A 15 (1973), 200--209. (Reviewer: G. T. Sallee) 52A25
[17] 42 #8395 Reay, John R. Caratheodory theorems in convex product structures. Pacific J. Math. 35 1970 227--230. (Reviewer: G. T. Sallee) 52.30
[18] 40 #6366 Geyer, E. P.; Reay, J. R. Intersection bases of convex cones. Rend. Circ. Mat. Palermo (2) 16 1967 346--352. (Reviewer: D. G. Larman) 52.30
[19] 38 #2669 Bonnice, William E.; Reay, John R. Relative interiors of convex hulls. Proc. Amer. Math. Soc. 20 1969 246--250. (Reviewer: D. G. Larman) 52.30
[20] 37 #2088 Bonnice, William E.; Reay, John R. Interior points of convex hulls. Israel J. Math. 4 1966 243--248. (Reviewer: J. V. Ryff) 52.30
[21] 37 #824 Reay, John R. An extension of Radon's theorem. Illinois J. Math. 12 1968 184--189. (Reviewer: G. T. Sallee) 52.30 (05.00)
[22] 36 #5819 Reay, John R. Positive bases as a tool in convexity. 1967 Proc. Colloquium on Convexity (Copenhagen, 1965) pp. 255--260 Kobenhavns Univ. Mat. Inst., Copenhagen (Reviewer: R. R. Phelps) 52.30 (46.00)
[23] 33 #7827 Reay, J. R. Unique minimal representations with positive bases. Amer. Math. Monthly 73 1966 253--261. (Reviewer: G. C. Shephard) 46.90
[24] 32 #6319 Reay, John R. Generalizations of a theorem of Carathéodory. Mem. Amer. Math. Soc. No. 54 1965 50 pp. (Reviewer: B. Grünbaum) 52.34
[25] 31 #5145 Reay, John R. A new proof of the Bonice-Klee theorem. Proc. Amer. Math. Soc. 16 1965 585--587. (Reviewer: I. Namioka) 52.30
[26] 937 091 Reay, John Can neighborly polyhedra be realized geometrically? Shaping space (Northampton, Mass., 1984), 251--253, 259, Design Sci. Collect., Birkhäuser Boston, Boston, MA, 1988. 52A25

(c) 2000, American Mathematical Society