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1	Ideals in Semigroups Rodgers, Samuel A. 01 1900 (has links) This thesis investigates ideals in semigroups. mathematics theorem
2	Analyticam demonstrationem, propos. 47. primi elementorum Euclidis consensu amplissimae facultatis philosophicae in incluta lipsiensi adornatam, Christ, Andreas Stephanus, Thorinus, Andreas, January 1900 (has links) Diss.--Leipzig (Andreas Thorinus, respondent). / At head of title: Q.D.B.V. Day of the month in title supplied in manuscript. Pythagorean theorem.
3	Analyticam demonstrationem, propos. 47. primi elementorum Euclidis consensu amplissimae facultatis philosophicae in incluta lipsiensi adornatam, Christ, Andreas Stephanus, Thorinus, Andreas, January 1900 (has links) Diss.--Leipzig (Andreas Thorinus, respondent). / At head of title: Q.D.B.V. Day of the month in title supplied in manuscript. Pythagorean theorem.
4	Om Fermat's s. k. stora sats och nägra därmed sammanhängande undersökningar Arwin, A. January 1914 (has links) Adademisk afhandling--Lund. Fermat's theorem.
5	On many-one degrees Liu, Shih-Chao, January 1965 (has links) Thesis (Ph. D.)--University of Wisconsin--Madison, 1965. / Typescript. Vita. eContent provider-neutral record in process. Description based on print version record. Includes bibliographical references. Gödel's theorem.
6	A Generalization of the Weierstrass Approximation Theorem Murchison, Jo Denton 08 1900 (has links) A presentation of the Weierstrass approximation theorem and the Stone-Weierstrass theorem and a comparison of these two theorems are the objects of this thesis. Weierstrass approximation theorem Stone-Weierstrass theorem mathematics
7	Combinatorial Consequences of Relatives of the Lusternik-Schnirelmann-Borsuk Theorem Spencer, Gwen 01 May 2005 (has links) Call a set of 2n + k elements Kneser colored when its n-subsets are put into classes such that disjoint n-subsets are in different classes. Kneser showed that k + 2 classes are sufficient to Kneser-color the n-subsets of a 2n + k element set. There are several proofs that this same number is necessary which rely on fixed-point theorems related to the Lusternik-Schnirelmann- Borsuk (LSB) theorem. By employing generalizations of these theorems we expand the proofs mentioned to obtain proofs of an original result we call the Subcoloring theorem. The Subcoloring theorem asserts the existence of a partition of a Kneser-colored set that halves its classes in a special way. We demonstrate both a topological proof and a combinatorial proof of this main result. We present an original corollary that extends the Subcoloring theorem by providing bounds on the size of the pieces of the asserted partition. Throughout, we formulate our results both in combinatorial and graph theoretic terminology. Lusternik-Schnirelmann-Borsuk Theorem The Subcoloring Theorem
8	Central limit theorems for associated random fields with applications Kim, Tae-sung 21 November 1985 (has links) A functional central limit theorem for a strictly stationary associated random field in the general d-dimension case with an added moment condition is proven. Functional central limit theorems for associated random measures are also proven. More specifically, conditions are given that imply weak convergence in the Skorohod topology of a renormalized random measure to the d-dimensional Wiener process. These results are applied to show new functional central limit theorems for doubly stochastic point random fields and Poisson cluster random measures. / Graduation date: 1986 Central limit theorem
9	Parallel analytic tableaux systems Johnson, Robert David January 1996 (has links) No description available. 005 Automated theorem proving
10	Exploiting dependencies in search and inference mechanisms Shanahan, Murray Patrick January 1987 (has links) No description available. 510 Theorem proving

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