| Year |
Citation |
Score |
| 2020 |
Jarboui N, Dobbs DE. On almost valuation ring pairs Journal of Algebra and Its Applications. 2150182. DOI: 10.1142/S0219498821501826 |
0.349 |
|
| 2020 |
Dobbs DE. A minimal ring extension of a large finite local prime ring is probably ramified Journal of Algebra and Its Applications. 19: 2050015. DOI: 10.1142/S0219498820500152 |
0.393 |
|
| 2020 |
Dobbs DE. On the nature and number of isomorphism classes of the minimal ring extensions of a finite commutative ring Communications in Algebra. 48: 3811-3833. DOI: 10.1080/00927872.2020.1748193 |
0.406 |
|
| 2020 |
Dobbs DE, Jarboui N. Normal pairs of noncommutative rings Ricerche Di Matematica. 69: 95-109. DOI: 10.1007/S11587-019-00450-2 |
0.438 |
|
| 2019 |
Dobbs DE. Characterizing finite fields via minimal ring extensions Communications in Algebra. 47: 4945-4957. DOI: 10.1080/00927872.2019.1603303 |
0.394 |
|
| 2019 |
Dobbs DE, Khalfi AE, Mahdou N. Trivial extensions satisfying certain valuation-like properties Communications in Algebra. 47: 2060-2077. DOI: 10.1080/00927872.2018.1527926 |
0.365 |
|
| 2018 |
Dobbs DE. Certain towers of ramified minimal ring extensions of commutative rings Communications in Algebra. 46: 3461-3495. DOI: 10.1080/00927872.2017.1412446 |
0.411 |
|
| 2018 |
Dobbs DE. Subsets of fields whose nth-root functions are rational functions International Journal of Mathematical Education in Science and Technology. 49: 948-958. DOI: 10.1080/0020739X.2017.1423122 |
0.414 |
|
| 2017 |
Ismaili KA, Dobbs DE, Mahdou N. Commutative rings and modules that are Nil*-coherent or special Nil*-coherent Journal of Algebra and Its Applications. 16: 1750187. DOI: 10.1142/S0219498817501870 |
0.446 |
|
| 2017 |
Dobbs DE, Houston E. On sums and products of primitive elements Communications in Algebra. 45: 357-370. DOI: 10.1080/00927872.2016.1175459 |
0.417 |
|
| 2017 |
Dobbs DE. Why the nth-root function is not a rational function International Journal of Mathematical Education in Science and Technology. 48: 1120-1132. DOI: 10.1080/0020739X.2017.1319980 |
0.352 |
|
| 2017 |
Dobbs DE. The rings with identity whose additive subgroups are one-sided ideals International Journal of Mathematical Education in Science and Technology. 48: 774-781. DOI: 10.1080/0020739X.2016.1264637 |
0.461 |
|
| 2016 |
Dobbs DE. On the Commutative Rings with At Most Two Proper Subrings International Journal of Mathematics and Mathematical Sciences. 2016: 1-13. DOI: 10.1155/2016/6912360 |
0.375 |
|
| 2016 |
Ayache A, Dobbs DE. Strongly divided domains Ricerche Di Matematica. 65: 127-154. DOI: 10.1007/S11587-016-0256-1 |
0.466 |
|
| 2015 |
Dobbs DE, Shapiro JA. Some analogues of a result of vasconcelos Kyungpook Mathematical Journal. 55: 817-826. DOI: 10.5666/Kmj.2015.55.4.817 |
0.451 |
|
| 2015 |
Ayache A, Dobbs DE. Finite maximal chains of commutative rings Journal of Algebra and Its Applications. 14. DOI: 10.1142/S0219498814500753 |
0.474 |
|
| 2015 |
Dobbs DE, Picavet G, Picavet-L’hermitte M. Transfer Results for the FIP and FCP Properties of Ring Extensions Communications in Algebra. 43: 1279-1316. DOI: 10.1080/00927872.2013.856440 |
0.37 |
|
| 2014 |
Dobbs DE, Latham BK. On the subsemigroups of a finite cyclic semigroup Kyungpook Mathematical Journal. 54: 607-617. DOI: 10.5666/Kmj.2014.54.4.607 |
0.405 |
|
| 2014 |
Dobbs DE, Picavet G, Picavet-L'hermitte M. When an extension of Nagata rings has only finitely many intermediate rings, each of those is a Nagata ring International Journal of Mathematics and Mathematical Sciences. 2014. DOI: 10.1155/2014/315919 |
0.475 |
|
| 2013 |
Dobbs DE, Levy R, Shapiro J. A universal survival ring of continuous functions which is not a universal lying-over ring Rocky Mountain Journal of Mathematics. 43: 825-854. DOI: 10.1216/Rmj-2013-43-3-825 |
0.336 |
|
| 2013 |
Dobbs DE, Shapiro J. On the Strong (A)-Rings of Mahdou and Hassani Mediterranean Journal of Mathematics. 10: 1995-1997. DOI: 10.1007/S00009-013-0276-Y |
0.483 |
|
| 2012 |
Dobbs DE, Shapiro J. Transfer of the GPIT property in pullbacks International Journal of Mathematics and Mathematical Sciences. 2012. DOI: 10.1155/2012/743873 |
0.33 |
|
| 2012 |
Cahen PJ, Dobbs DE, Lucas TG. Finitely valuative domains Journal of Algebra and Its Applications. 11. DOI: 10.1142/S0219498812501125 |
0.408 |
|
| 2012 |
Dobbs DE, Picavet G, Picavet-L'Hermitte M. On Finite Maximal Chains of Weak Baer Going-Down Rings Communications in Algebra. 40: 1843-1855. DOI: 10.1080/00927872.2011.558881 |
0.509 |
|
| 2012 |
Dobbs DE, Rosen MI. Prime decompositions in infinite extensions of global fields Communications in Algebra. 40: 1260-1267. DOI: 10.1080/00927872.2010.550591 |
0.306 |
|
| 2012 |
Dobbs DE. Detecting prime numbers via roots of polynomials International Journal of Mathematical Education in Science and Technology. 43: 381-387. DOI: 10.1080/0020739X.2011.582182 |
0.344 |
|
| 2012 |
Dobbs DE, Picavet G, Picavet-L'Hermitte M. Characterizing the ring extensions that satisfy FIP or FCP Journal of Algebra. 371: 391-429. DOI: 10.1016/J.Jalgebra.2012.07.055 |
0.498 |
|
| 2012 |
Dobbs DE, Shapiro J. A note on complete rings of quotients and McCoy rings Rendiconti Del Circolo Matematico Di Palermo. 61: 393-401. DOI: 10.1007/S12215-012-0098-Y |
0.376 |
|
| 2012 |
Dobbs DE, Shapiro J. On bowtie rings, universal survival rings and universal lying-over rings Rendiconti Del Circolo Matematico Di Palermo. 61: 123-131. DOI: 10.1007/S12215-011-0080-0 |
0.433 |
|
| 2011 |
Dobbs DE, Shapiro JA. Normal pairs of going-down rings Kyungpook Mathematical Journal. 51: 1-10. DOI: 10.5666/Kmj.2011.51.1.001 |
0.48 |
|
| 2011 |
Cahen PJ, Dobbs DE, Lucas TG. Characterizing minimal ring extensions Rocky Mountain Journal of Mathematics. 41: 1081-1125. DOI: 10.1216/Rmj-2011-41-4-1081 |
0.362 |
|
| 2011 |
Dobbs DE, Shapiro J. A generalization of prüfer's ascent result to normal pairs of complemented rings Journal of Algebra and Its Applications. 10: 1351-1362. DOI: 10.1142/S021949881100521X |
0.461 |
|
| 2011 |
Dobbs DE, Shapiro J. Normal pairs with zero-divisors Journal of Algebra and Its Applications. 10: 335-356. DOI: 10.1142/S0219498811004628 |
0.469 |
|
| 2011 |
Dobbs DE, Smith HJ. Numerical semigroups whose fractions are of maximal embedding dimension Semigroup Forum. 82: 412-422. DOI: 10.1007/S00233-010-9275-5 |
0.317 |
|
| 2010 |
Dobbs DE. The Factor Domains that Result from Uppers to Prime Ideals in Polynomial Rings Kyungpook Mathematical Journal. 50: 1-5. DOI: 10.5666/Kmj.2010.50.1.001 |
0.445 |
|
| 2010 |
Dobbs DE. On Purity And Related Universal Properties Of Extensions Of Commutative Rings Tamkang Journal of Mathematics. 41: 253-259. DOI: 10.5556/J.Tkjm.41.2010.723 |
0.451 |
|
| 2010 |
Dobbs DE. On quadratic integral polynomials with only finitely many roots in any commutative finite-dimensional algebra Results in Mathematics. 58: 233-239. DOI: 10.1007/S00025-010-0063-Z |
0.338 |
|
| 2009 |
Anderson DD, Dobbs DE, Zafrullah M. Some applications of Zorn's Lemma in algebra Tamkang Journal of Mathematics. 40: 139-150. DOI: 10.5556/J.Tkjm.40.2009.463 |
0.386 |
|
| 2009 |
Dobbs DE, Sahandi P. Going-down and semistar operations Journal of Algebra and Its Applications. 8: 83-104. DOI: 10.1142/S0219498809003205 |
0.322 |
|
| 2009 |
Dobbs DE, Shapiro J. A generalization of divided domains and its connection to weak baer going-down rings Communications in Algebra. 37: 3553-3572. DOI: 10.1080/00927870902828488 |
0.494 |
|
| 2009 |
Dobbs DE. Extensions of integral domains with infinite chains of intermediate rings Communications in Algebra. 37: 604-608. DOI: 10.1080/00927870802254546 |
0.456 |
|
| 2009 |
Dobbs DE. On the finiteness of a field-theoretic invariant for commutative rings Rendiconti Del Circolo Matematico Di Palermo. 58: 327-336. DOI: 10.1007/S12215-009-0027-X |
0.458 |
|
| 2009 |
Dobbs DE, Picavet G. On almost-divided domains Rendiconti Del Circolo Matematico Di Palermo. 58: 199-210. DOI: 10.1007/S12215-009-0016-0 |
0.317 |
|
| 2008 |
Dobbs DE, Picavet G, Picavet-L'hermitte M. A Characterization Of The Commutative Unital Rings With Only Finitely Many Unital Subrings Journal of Algebra and Its Applications. 7: 601-622. DOI: 10.1142/S0219498808002990 |
0.476 |
|
| 2008 |
Dobbs DE, Shapiro J. Universal lying-over rings Communications in Algebra. 36: 2895-2904. DOI: 10.1080/00927870802108122 |
0.46 |
|
| 2008 |
Dobbs DE, Mullins B, Picavet-L'Hermitte M. The singly generated unital rings with only finitely many unital subrings Communications in Algebra. 36: 2638-2653. DOI: 10.1080/00927870802067989 |
0.483 |
|
| 2008 |
Dobbs DE, Shapiro J. Two examples in the theory of fixed rings Communications in Algebra. 36: 1097-1104. DOI: 10.1080/00927870701776912 |
0.455 |
|
| 2008 |
Dobbs DE. Four proofs of the converse of the Chinese Remainder Theorem International Journal of Mathematical Education in Science and Technology. 39: 104-109. DOI: 10.1080/00207390601129287 |
0.367 |
|
| 2008 |
Dobbs DE. Pseudo-almost valuation domains are quasilocal going-down domains, but not conversely Rendiconti Del Circolo Matematico Di Palermo. 57: 119-124. DOI: 10.1007/S12215-008-0006-7 |
0.361 |
|
| 2007 |
Ayache A, Dobbs DE, Echi O. On Maximal Non-Accp Subrings Journal of Algebra and Its Applications. 6: 873-894. DOI: 10.1142/S0219498807002545 |
0.474 |
|
| 2007 |
Dobbs DE, Shapiro J. Transfer of krull dimension, lying-over, and going-down to the fixed ring Communications in Algebra. 35: 1227-1247. DOI: 10.1080/00927870601142231 |
0.438 |
|
| 2007 |
Dobbs DE. A sufficient condition for a minimal ring extension to be an overring Communications in Algebra. 35: 773-779. DOI: 10.1080/00927870601115658 |
0.468 |
|
| 2007 |
Dobbs DE. The remainder theorem and factor theorem for polynomials over noncommutative coefficient rings International Journal of Mathematical Education in Science and Technology. 38: 268-273. DOI: 10.1080/00207390600913350 |
0.487 |
|
| 2007 |
Dobbs DE, Shapiro J. A classification of the minimal ring extensions of certain commutative rings Journal of Algebra. 308: 800-821. DOI: 10.1016/J.Jalgebra.2006.07.024 |
0.48 |
|
| 2006 |
Dobbs DE, Irick BC. The minimal generating sets of the multiplicative monoid of a finite commutative ring Rocky Mountain Journal of Mathematics. 36: 1165-1190. DOI: 10.1216/Rmjm/1181069410 |
0.38 |
|
| 2006 |
Ayache A, Dobbs DE, Echi O. Universal mapping properties of some pseudovaluation domains and related quasilocal domains International Journal of Mathematics and Mathematical Sciences. 2006. DOI: 10.1155/Ijmms/2006/72589 |
0.425 |
|
| 2006 |
Dobbs DE. A class of principal ideal rings arising from the converse of theChinese remainder theorem International Journal of Mathematics and Mathematical Sciences. 2006. DOI: 10.1155/Ijmms/2006/19607 |
0.45 |
|
| 2006 |
Ayache A, Dobbs DE, Echi O. Reflection Of Some Quasi-Local Domains Journal of Algebra and Its Applications. 5: 201-213. DOI: 10.1142/S0219498806001703 |
0.418 |
|
| 2006 |
Dobbs DE. Every commutative ring has a minimal ring extension Communications in Algebra. 34: 3875-3881. DOI: 10.1080/00927870600862706 |
0.434 |
|
| 2006 |
Dobbs DE, Shapiro J. A classification of the minimal ring extensions of an integral domain Journal of Algebra. 305: 185-193. DOI: 10.1016/J.Jalgebra.2005.10.005 |
0.466 |
|
| 2005 |
Dobbs DE, Hetzel AJ. Going-Down Implies Generalized Going-Down Rocky Mountain Journal of Mathematics. 35: 479-484. DOI: 10.1216/Rmjm/1181069740 |
0.313 |
|
| 2005 |
Dobbs DE, Mullins B, Picavet G, Picavet-L'Hermitte M. On the FIP Property for Extensions of Commutative Rings Communications in Algebra. 33: 3091-3119. DOI: 10.1081/Agb-200066123 |
0.469 |
|
| 2005 |
Dobbs DE. On the periods of a periodic function International Journal of Mathematical Education in Science and Technology. 36: 937-944. DOI: 10.1080/00207540500137720 |
0.338 |
|
| 2005 |
Dobbs DE. A field-theoretic invariant for domains Rendiconti Del Circolo Matematico Di Palermo. 54: 396-408. DOI: 10.1007/Bf02874947 |
0.391 |
|
| 2004 |
Dobbs DE, Shapiro J. Almost Integrally Closed Domains Communications in Algebra. 32: 3627-3639. DOI: 10.1081/Agb-120039634 |
0.444 |
|
| 2004 |
Dobbs DE, Mullins B. On a Field-Theoretic Invariant for Extensions of Commutative Rings Communications in Algebra. 32: 1295-1305. DOI: 10.1081/Agb-120028782 |
0.441 |
|
| 2003 |
Coykendall J, Dobbs DE. Survival-pairs of commutative rings have the lying-over property Communications in Algebra. 31: 259-270. DOI: 10.1081/Agb-120016758 |
0.427 |
|
| 2002 |
Dobbs DE. Why the square root function is not linear International Journal of Mathematical Education in Science and Technology. 33: 742-747. DOI: 10.1080/002073902320602897 |
0.32 |
|
| 2002 |
Dietz GD, Dobbs DE. Limiting values of the variance and the moments of the dimension of a sum or intersection of random vector subspaces Applied Mathematics Letters. 15: 945-953. DOI: 10.1016/S0893-9659(02)00068-X |
0.316 |
|
| 2002 |
Bouchiba S, Dobbs DE, Kabbaj S. On the prime ideal structure of tensor products of algebras Journal of Pure and Applied Algebra. 176: 89-112. DOI: 10.1016/S0022-4049(02)00067-1 |
0.37 |
|
| 2001 |
Dobbs DE, Fontana M. Inverse Limits Of Integral Domains Arising From Iterated Nagata Composition Mathematica Scandinavica. 88: 17-40. DOI: 10.7146/Math.Scand.A-14312 |
0.36 |
|
| 2001 |
Badawi A, Dobbs DE. On Locally Divided Rings And Going-Down Rings Communications in Algebra. 29: 2805-2825. DOI: 10.1081/Agb-4988 |
0.469 |
|
| 2001 |
Dobbs DE, Khalis M. On the prime spectrum, Krull dimension and catenarity of integral domains of the form A+XB[[X]] Journal of Pure and Applied Algebra. 159: 57-73. DOI: 10.1016/S0022-4049(00)00065-7 |
0.446 |
|
| 2001 |
Dobbs DE. Integral domains with almost integral proper overrings Archiv Der Mathematik. 76: 182-189. DOI: 10.1007/S000130050558 |
0.463 |
|
| 2001 |
Coykendall J, Dobbs D. Fragmented domains have infinite Krull dimension Rendiconti Del Circolo Matematico Di Palermo. 50: 377-388. DOI: 10.1007/Bf02844993 |
0.305 |
|
| 2000 |
Dobbs DE. On the Prime Ideals in a Commutative Ring Canadian Mathematical Bulletin. 43: 312-319. DOI: 10.4153/Cmb-2000-038-7 |
0.492 |
|
| 1999 |
Dobbs DE, Fontana M. Lifting trees of prime ideals to bezout extension domains Communications in Algebra. 27: 6243-6252. DOI: 10.1080/00927879908826820 |
0.43 |
|
| 1999 |
Coykendall J, Dobbs DE, Mullins B. On integral domains with no atoms Communications in Algebra. 27: 5813-5831. DOI: 10.1080/00927879908826792 |
0.336 |
|
| 1999 |
Dobbs DE. A going-up theorem for arbitrary chains of prime ideals Communications in Algebra. 27: 3887-3894. DOI: 10.1080/00927879908826671 |
0.435 |
|
| 1999 |
Coykendall J, Dobbs DE, Mullins B. On zero-dimensionality and fragmented rings Bulletin of the Australian Mathematical Society. 60: 137-151. DOI: 10.1017/S0004972700033402 |
0.462 |
|
| 1998 |
Anderson DF, Dobbs DE. Root closure in Integral Domains, III Canadian Mathematical Bulletin. 41: 3-9. DOI: 10.4153/Cmb-1998-001-0 |
0.326 |
|
| 1998 |
Hassani SA, Dobbs DE, Kabbaj SE. On The Prime Spectrum Of Commutative Semigroup Rings Communications in Algebra. 26: 2559-2589. DOI: 10.1080/00927879808826298 |
0.436 |
|
| 1997 |
Anderson DF, Dobbs DE, Roitman M. When is a power series ring n-root closed? Journal of Pure and Applied Algebra. 114: 111-131. DOI: 10.1016/0022-4049(95)00167-0 |
0.377 |
|
| 1997 |
Dobbs DE. Prime ideals surviving in complete integral closures Archiv Der Mathematik. 69: 465-469. DOI: 10.1007/S000130050147 |
0.456 |
|
| 1996 |
Dobbs DE. Locally henselian going-down domains Communications in Algebra. 24: 1621-1635. DOI: 10.1080/00927879608825659 |
0.454 |
|
| 1995 |
Dobbs DE, Houston EG. On $t$-${ m Spec}(R[![X]!])$ Canadian Mathematical Bulletin. 38: 187-195. DOI: 10.4153/Cmb-1995-027-1 |
0.361 |
|
| 1995 |
Dobbs DE. Prüfer's ascent result via Inc Communications in Algebra. 23: 5413-5417. DOI: 10.1080/00927879508825541 |
0.458 |
|
| 1992 |
Anderson DF, Dobbs DE, Fontana M. Hilbert Rings Arising As Pullbacks Canadian Mathematical Bulletin. 35: 431-438. DOI: 10.4153/Cmb-1992-057-4 |
0.462 |
|
| 1992 |
Dobbs DE, Kiltinen JO, Orndorff BJ. Commutative rings with homomorphic power functions International Journal of Mathematics and Mathematical Sciences. 15: 91-102. DOI: 10.1155/S0161171292000103 |
0.405 |
|
| 1992 |
Anderson DF, Dobbs DE, Fontana M, Khalis M. Catenarity of formal power series rings over a pullback Journal of Pure and Applied Algebra. 78: 109-122. DOI: 10.1016/0022-4049(92)90089-X |
0.392 |
|
| 1992 |
Dobbs DE. Rings of formal power series with homeomorphic prime spectra Rendiconti Del Circolo Matematico Di Palermo. 41: 55-61. DOI: 10.1007/Bf02844462 |
0.475 |
|
| 1991 |
Dobbs DE, Fontana M. Universally catenarian domains of D International Journal of Mathematics and Mathematical Sciences. 14: 209-214. DOI: 10.1155/S0161171291000212 |
0.368 |
|
| 1991 |
Dobbs DE. On n -flat modules over a commutative ring Bulletin of the Australian Mathematical Society. 43: 491-498. DOI: 10.1017/S0004972700029348 |
0.438 |
|
| 1990 |
Anderson DF, Dobbs DE, Eakin PM, Heinzer WJ. On the generalized principal ideal theorem and Krull domains Pacific Journal of Mathematics. 146: 201-215. DOI: 10.2140/Pjm.1990.146.201 |
0.472 |
|
| 1990 |
Dobbs DE, Barucci V, Fontana M. Gorenstein conducive domains Communications in Algebra. 18: 3889-3903. DOI: 10.1080/00927879008824114 |
0.314 |
|
| 1990 |
Anderson DF, Dobbs DE, Fontana M. Characterizing Kronecker Function Rings( Annali Dell'Universita' Di Ferrara. 36: 1-13. DOI: 10.1007/Bf02837203 |
0.385 |
|
| 1989 |
Anderson DD, Anderson DF, Costa DL, Dobbs DE, Mott JL, Zafrullah M. Some characterizations of v-domains and related properties Colloquium Mathematicum. 58: 1-9. DOI: 10.4064/Cm-58-1-1-9 |
0.31 |
|
| 1989 |
Dobbs DE, Houston EG, Lucas TG, Zafrullah M. t-Linked overrings and prüfer v-Multiplication domains Communications in Algebra. 17: 2835-2852. DOI: 10.1080/00927878908823879 |
0.312 |
|
| 1989 |
Dobbs DE. Fields with the Simple Binomial Theorem Mathematics Magazine. 62: 52-57. DOI: 10.1080/0025570X.1989.11977412 |
0.433 |
|
| 1989 |
Dobbs DE. Nearly integral homomorphisms of commutative rings Bulletin of the Australian Mathematical Society. 40: 1-12. DOI: 10.1017/S0004972700003440 |
0.372 |
|
| 1989 |
Anderson DF, Dobbs DE, Fontana M. On Treed Nagata Rings Journal of Pure and Applied Algebra. 61: 107-122. DOI: 10.1016/0022-4049(89)90008-X |
0.465 |
|
| 1988 |
Barucci V, Dobbs DE, Mulay SB. Integrally closed factor domains Bulletin of the Australian Mathematical Society. 37: 353-366. DOI: 10.1017/S0004972700026976 |
0.442 |
|
| 1988 |
Dobbs DE, Fedder R, Fontana M. G-domains and spectral spaces Journal of Pure and Applied Algebra. 51: 89-110. DOI: 10.1016/0022-4049(88)90080-1 |
0.447 |
|
| 1988 |
Anderson DD, Dobbs DE. Flatness, LCM-stability, and related module-theoretic properties Journal of Algebra. 112: 139-150. DOI: 10.1016/0021-8693(88)90138-X |
0.41 |
|
| 1988 |
Bouvier A, Dobbs DE, Fontana M. Universally catenarian integral domains Advances in Mathematics. 72: 211-238. DOI: 10.1016/0001-8708(88)90028-X |
0.489 |
|
| 1987 |
Dobbs DE, Fontana M. Seminormal Rings Generated By Algebraic Integers Mathematika. 34: 141-154. DOI: 10.1112/S0025579300013395 |
0.384 |
|
| 1987 |
Barucci V, Anderson DF, Dobbs DE. Coherent mori domains and the principal ideal theorem Communications in Algebra. 15: 1119-1156. DOI: 10.1080/00927878708823460 |
0.348 |
|
| 1987 |
Bouvier A, Dobbs DE, Fontana M. Two sufficient conditions for universal catenarity Communications in Algebra. 15: 861-872. DOI: 10.1080/00927878708823446 |
0.477 |
|
| 1987 |
Dobbs DE, Fedder R, Fontana M. Abstract Riemann surfaces of integral domains and spectral spaces Annali Di Matematica Pura Ed Applicata. 148: 101-115. DOI: 10.1007/Bf01774285 |
0.368 |
|
| 1986 |
Dobbs DE. Ahmes expansions of formal Laurent series and a class of nonarchimedean integral domains Journal of Algebra. 103: 193-201. DOI: 10.1016/0021-8693(86)90177-8 |
0.447 |
|
| 1986 |
Dobbs DE, Fontana M. Kronecker function rings and abstract Riemann surfaces Journal of Algebra. 99: 263-274. DOI: 10.1016/0021-8693(86)90067-0 |
0.449 |
|
| 1986 |
Barucci V, Dobbs DE, Fontana M. Conducive Integral Domains As Pullbacks Manuscripta Mathematica. 54: 261-277. DOI: 10.1007/Bf01171337 |
0.384 |
|
| 1985 |
Anderson DF, Arnold JT, Dobbs DE. Integrally closed condensed domains are Bezout Canadian Mathematical Bulletin. 28: 98-102. DOI: 10.4153/Cmb-1985-010-X |
0.338 |
|
| 1984 |
Barucci V, Dobbs DE. On chain conditions in integral domains Canadian Mathematical Bulletin. 27: 351-359. DOI: 10.4153/Cmb-1984-053-1 |
0.329 |
|
| 1984 |
Anderson DD, Anderson DF, Dobbs DE, Houston EG. Some finiteness and divisibility conditions on the proper overrings of an integral domain Communications in Algebra. 12: 1689-1706. DOI: 10.1080/00927878408823075 |
0.355 |
|
| 1984 |
Dobbs DE, Fontana M. Universally Incomparable Ring-Homomorphisms Bulletin of the Australian Mathematical Society. 29: 289-302. DOI: 10.1017/S0004972700021547 |
0.407 |
|
| 1984 |
Dobbs DE, Fontana M. Universally going-down homomorphisms of commutative rings Journal of Algebra. 90: 410-429. DOI: 10.1016/0021-8693(84)90180-7 |
0.363 |
|
| 1984 |
Dobbs DE, Fedder R. Conducive integral domains Journal of Algebra. 86: 494-510. DOI: 10.1016/0021-8693(84)90044-9 |
0.44 |
|
| 1984 |
Dobbs DE, Fontana M. Universally going-down integral domains Archiv Der Mathematik. 42: 426-429. DOI: 10.1007/Bf01190692 |
0.328 |
|
| 1983 |
Dobbs DE, Eakin PM, Eastham JF. Commutative Rings Whose Simple Proper Overrings are Noetherian Communications in Algebra. 11: 1073-1091. DOI: 10.1080/00927872.1983.10487601 |
0.421 |
|
| 1983 |
Dobbs DE, Fontana M. Locally pseudo-valuation domains Annali Di Matematica Pura Ed Applicata. 134: 147-168. DOI: 10.1007/Bf01773503 |
0.344 |
|
| 1982 |
Dobbs DE. Posets admitting a unique order-compatible topology Discrete Mathematics. 41: 235-240. DOI: 10.1016/0012-365X(82)90019-X |
0.301 |
|
| 1981 |
Dobbs DE. Lying-over pairs of commutative rings Canadian Journal of Mathematics. 33: 454-475. DOI: 10.4153/Cjm-1981-040-5 |
0.358 |
|
| 1981 |
Dobbs DE. On locally divided integral domains and CPI-overrings International Journal of Mathematics and Mathematical Sciences. 4: 119-135. DOI: 10.1155/S0161171281000082 |
0.42 |
|
| 1980 |
Dobbs DE. On INC-extensions and polynomials with unit content Canadian Mathematical Bulletin. 23: 37-42. DOI: 10.4153/Cmb-1980-005-8 |
0.447 |
|
| 1980 |
Anderson DF, Dobbs DE. Pairs of rings with the same prime ideals. II Canadian Journal of Mathematics. 32: 1399-1409. DOI: 10.4153/Cjm-1980-029-2 |
0.314 |
|
| 1978 |
Dobbs DE. On the weak global dimension of pseudo-valuation domains Canadian Mathematical Bulletin. 21: 159-164. DOI: 10.4153/Cmb-1978-027-9 |
0.323 |
|
| 1976 |
Beauregard RA, Dobbs DE. On a class of Archimedean integral domains Canadian Journal of Mathematics. 28: 365-375. DOI: 10.4153/Cjm-1976-038-X |
0.323 |
|
| 1976 |
Dobbs DE. Divided Rings And Going-Down Pacific Journal of Mathematics. 67: 353-363. DOI: 10.2140/Pjm.1976.67.353 |
0.365 |
|
| 1976 |
Dobbs DE. Ascent and descent of going-down rings for integral extensions Bulletin of the Australian Mathematical Society. 15: 253-264. DOI: 10.1017/S0004972700022619 |
0.359 |
|
| 1974 |
Dawson J, Dobbs DE. On Going Down in Polynomial Rings Canadian Journal of Mathematics. 26: 177-184. DOI: 10.4153/Cjm-1974-017-9 |
0.372 |
|
| 1974 |
Dobbs DE. On Going Down For Simple Overrings II Communications in Algebra. 1: 439-458. DOI: 10.1080/00927877408548715 |
0.428 |
|
| 1971 |
Dobbs DE. Amitsur cohomology of algebraic number rings Pacific Journal of Mathematics. 39: 631-635. DOI: 10.2140/Pjm.1971.39.631 |
0.383 |
|
| Show low-probability matches. |
