Capacity requirements planning of multichip modules through simulation

Dasalla, Kathryn Anne.

January 2007

Thesis (M.S.)--State University of New York at Binghamton, Thomas J. Watson School of Engineering and Applied Science, Department of Systems Science and Industrial Engineering, 2007. / Includes bibliographical references.

Torsionless modules and minimal generating sets for ideals of integral domains

Brown, Wesley R., Goeters, Herman Pat.

January 2006

Thesis(M.S.)--Auburn University, 2006. / Abstract. Vita. Includes bibliographic references (p.25).

Théorie d'Auslander-Reiten dans une catégorie triangulée à droite

Bustamante Rosero, Juan Carlos.

January 1999

Thèses (M.Sc.)--Université de Sherbrooke (Canada), 1999. / Titre de l'écran-titre (visionné le 20 juin 2006). Publié aussi en version papier.

Iwasawa mu-invariants of Selmer groups /

Drinen, Michael Jeffrey.

January 1999

Thesis (Ph. D.)--University of Washington, 1999. / Vita. Includes bibliographical references (p. 83-84).

The Euler class group of a line bundle on an affine algebraic variety over a real closed field /

Robertson, Ian.

January 2000

Thesis (Ph. D.)--University of Chicago, Dept. of Mathematics, June 2000. / Includes bibliographical references. Also available on the Internet.

Experimental study of void formation in solder joints of flip-chip assemblies

Wang, Daijiao, Panton, Ronald L.

January 2005

Thesis (Ph. D.)--University of Texas at Austin, 2005. / Supervisor: Ronald L. Panton. Vita. Includes bibliographical references.

A study of CS and [sigma]-CS rings and modules

Al-Hazmi, Husain Suleman S.

January 2005

Thesis (Ph.D.)--Ohio University, June, 2005. / Title from PDF t.p. Includes bibliographical references (p. 65-69)

On the sources of simple modules in nilpotent blocks

Salminen, Adam D.,

January 2005

Thesis (Ph. D.)--Ohio State University, 2005. / Title from first page of PDF file. Document formatted into pages; contains viii, 87 p. Includes bibliographical references (p. 85-87). Available online via OhioLINK's ETD Center

Properties and selection of materials for flip chip packages with low-K die /

Tang, Chi Wang.

January 2007

Thesis (M.Phil.)--Hong Kong University of Science and Technology, 2007. / Includes bibliographical references (leaves 94-97). Also available in electronic version.

Classifying Lambda-modules up to Isomorphism and Applications to Iwasawa Theory

January 2011

abstract: In Iwasawa theory, one studies how an arithmetic or geometric object grows as its field of definition varies over certain sequences of number fields. For example, let $F/\mathbb{Q}$ be a finite extension of fields, and let $E:y^2 = x^3 + Ax + B$ with $A,B \in F$ be an elliptic curve. If $F = F_0 \subseteq F_1 \subseteq F_2 \subseteq \cdots F_\infty = \bigcup_{i=0}^\infty F_i$, one may be interested in properties like the ranks and torsion subgroups of the increasing family of curves $E(F_0) \subseteq E(F_1) \subseteq \cdots \subseteq E(F_\infty)$. The main technique for studying this sequence of curves when $\Gal(F_\infty/F)$ has a $p$-adic analytic structure is to use the action of $\Gal(F_n/F)$ on $E(F_n)$ and the Galois cohomology groups attached to $E$, i.e. the Selmer and Tate-Shafarevich groups. As $n$ varies, these Galois actions fit into a coherent family, and taking a direct limit one obtains a short exact sequence of modules $$0 \longrightarrow E(F_\infty) \otimes(\mathbb{Q}_p/\mathbb{Z}_p) \longrightarrow \Sel_E(F_\infty)_p \longrightarrow \Sha_E(F_\infty)_p \longrightarrow 0 $$ over the profinite group algebra $\mathbb{Z}_p[[\Gal(F_\infty/F)]]$. When $\Gal(F_\infty/F) \cong \mathbb{Z}_p$, this ring is isomorphic to $\Lambda = \mathbb{Z}_p[[T]]$, and the $\Lambda$-module structure of $\Sel_E(F_\infty)_p$ and $\Sha_E(F_\infty)_p$ encode all the information about the curves $E(F_n)$ as $n$ varies. In this dissertation, it will be shown how one can classify certain finitely generated $\Lambda$-modules with fixed characteristic polynomial $f(T) \in \mathbb{Z}_p[T]$ up to isomorphism. The results yield explicit generators for each module up to isomorphism. As an application, it is shown how to identify the isomorphism class of $\Sel_E(\mathbb{Q_\infty})_p$ in this explicit form, where $\mathbb{Q}_\infty$ is the cyclotomic $\mathbb{Z}_p$-extension of $\mathbb{Q}$, and $E$ is an elliptic curve over $\mathbb{Q}$ with good ordinary reduction at $p$, and possessing the property that $E(\mathbb{Q})$ has no $p$-torsion. / Dissertation/Thesis / Ph.D. Mathematics 2011

Mathematics

elliptic curves

Iwasawa theory

Lambda modules