WeTS - Web Technology Selection Guidelines

Shao, Weiyan, Zhu, Chu

January 2015

Web development is receiving increasing attention among all kinds and sizes of companies. Web presentation has become a hygiene factor for companies nowadays. Fortunately, nowadays web developers can choose from a great number of ready-made technologies instead of developing everything from scratch. However, web development technologies have evolved much in the past 20 years. Due to the increased complexity and diversity of the alternatives, it is getting more and more difficult for companies to make an overall good choice of technologies, especially small and medium-sized enterprises (SMEs) that usually do not have resources to make a thorough research before choosing. This thesis creates WeTS - Web Technology Stack Guidelines, which contains three parts: process, algorithm and software quality characteristics. By following WeTS, inexperienced web developers, especially in SMEs, can select web technology stacks in an optimal way. Meanwhile, WeTS could be used for experienced practitioners and researchers as a reference to have an overview about modern web development technologies. Based on WeTS Guidelines, this thesis evaluated a number of technology stacks. Then a case study was performed with a startup company named Sqore. By comparing WeTS with Sqore’s technology selection process step by step, this thesis evaluated WeTS Guidelines.

Web application development

WeTS

small and medium enterprises

technology selection

Computer and Information Sciences

Data- och informationsvetenskap

Contribution à l'analyse variationnelle : stabilité des cônes tangents et normaux et convexité des ensembles de Chebyshev / Contribution to variational analysis : stability of tangent and normal cones and convexity of Chebyshev sets

Zakaryan, Taron

19 December 2014

Le but de cette thèse est d'étudier les trois problèmes suivantes : 1) On s'intéresse à la stabilité des cônes normaux et des sous-différentiels via deux types de convergence d'ensembles et de fonctions : La convergence au sens de Mosco et celle d'Attouch-Wets. Les résultats obtenus peuvent être vus comme une extension du théorème d'Attouch aux fonctions non nécessairement convexes sur des espaces de Banach localement uniformément convexes. 2) Pour une bornologie β donnée sur un espace de Banach X, on étudie la validité de la formule suivante (…). Ici Tβ(C; x) et Tc(C; x) désignent le β -cône tangent et le cône tangent de Clarke à C en x. On montre que si, X x X est ∂β-« trusted » alors cette formule est valable pour tout ensemble fermé non vide C ⊂ X et x ∈ C. Cette classe d'espaces contient les espaces ayant une norme équivalent β-différentiable, etplus généralement les espaces possédant une fonction "bosse" lipschitzienne et β-différentiable). Comme conséquence, on obtient que pour la bornologie de Fréchet, cette formule caractérise les espaces d'Asplund. 3) On examine la convexité des ensembles de Chebyshev. Il est bien connu que, dans un espace normé réflexif ayant la propriété Kadec-Klee, tout ensemble de Chebyshev faiblement fermé est convexe. On démontre que la condition de faible fermeture peut être remplacée par la fermeture faible locale, c'est-à-dire pour tout x ∈ C il existe ∈ > 0 tel que C ∩ B(x, ε) est faiblement fermé. On montre aussi que la propriété Kadec-Klee n'est plus exigée lorsque l'ensemble de Chebyshev est représenté comme une union d'ensembles convexes fermés. / The aim of this thesis is to study the following three problems: 1) We are concerned with the behavior of normal cones and subdifferentials with respect to two types of convergence of sets and functions: Mosco and Attouch-Wets convergences. Our analysis is devoted to proximal, Fréchet, and Mordukhovich limiting normal cones and subdifferentials. The results obtained can be seen as extensions of Attouch theorem to the context of non-convex functions on locally uniformly convex Banach space. 2) For a given bornology β on a Banach space X we are interested in the validity of the following "lim inf" formula (…).Here Tβ(C; x) and Tc(C; x) denote the β-tangent cone and the Clarke tangent cone to C at x. We proved that it holds true for every closed set C ⊂ X and any x ∈ C, provided that the space X x X is ∂β-trusted. The trustworthiness includes spaces with an equivalent β-differentiable norm or more generally with a Lipschitz β-differentiable bump function. As a consequence, we show that for the Fréchet bornology, this "lim inf" formula characterizes in fact the Asplund property of X. 3) We investigate the convexity of Chebyshev sets. It is well known that in a smooth reflexive Banach space with the Kadec-Klee property every weakly closed Chebyshev subset is convex. We prove that the condition of the weak closedness can be replaced by the local weak closedness, that is, for any x ∈ C there is ∈ > 0 such that C ∩ B(x, ε) is weakly closed. We also prove that the Kadec-Klee property is not required when the Chebyshev set is represented by a finite union of closed convex sets.

Cône normal proximal

Ensembles sous-réguliers

Cône tangent de Bouligand

Bornologie

Espace d'Asplund

Ensemble de Chebyshev

Projection metrique

Suite minimisante

Mosco (Attouch-Wets) convergence

Proximal normal cone

Subsmooth sets (functions)

Clarke tangent (normal) cone

Contingent cone

Bornology

Asplund space

Trustworthiness

Chebyshev set

Metric projection

Minimizing sequence

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