1,575 research outputs found
Of Love, Of Money, Of Unquestionable Practicality: The Choices of F. Scott Fitzgerald’s Early Heroines
Between 1920-1925, F. Scott Fitzgerald explored the choices of young, affluent women, particularly in regards to marriage. His fascination with this topic began with Rosalind in This Side of Paradise, and her practical yet immature decision. Through his early short stories, Fitzgerald explores different motives behind his heroines’ decisions, varying points-of-view, and the consequences of his heroines’ actions. Fitzgerald’s fascination with these characters culminates in The Great Gatsby with his most complex characters and situations
Working Women and Motherhood: Failures of the Weimar Republic’s Family Policies
This paper examines the Weimar Republic’s reaction to the population crisis after the First World War. The Reich government created welfare policies to boost the birth rate and decrease the infant mortality rate. These policies were often unrealistic or too exclusive for working-class women. As a result, they did not greatly impact the lives of working women or their procreation. The Weimar policies, therefore, failed in its efforts to increase the birth rate among working-class women
Space-time random walk loop measures
In this work, we investigate a novel setting of Markovian loop measures and
introduce a new class of loop measures called Bosonic loop measures. Namely, we
consider loop soups with varying intensity (chemical potential in
physics terms), and secondly, we study Markovian loop measures on graphs with
an additional "time" dimension leading to so-called space-time random walks and
their loop measures and Poisson point loop processes. Interesting phenomena
appear when the additional coordinate of the space-time process is on a
discrete torus with non-symmetric jump rates. The projection of these
space-time random walk loop measures onto the space dimensions is loop measures
on the spatial graph, and in the scaling limit of the discrete torus, these
loop measures converge to the so-called [Bosonic loop measures]. This provides
a natural probabilistic definition of [Bosonic loop measures]. These novel loop
measures have similarities with the standard Markovian loop measures only that
they give weights to loops of certain lengths, namely any length which is
multiple of a given length which serves as an additional
parameter. We complement our study with generalised versions of Dynkin's
isomorphism theorem (including a version for the whole complex field) as well
as Symanzik's moment formulae for complex Gaussian measures. Due to the lacking
symmetry of our space-time random walks, the distributions of the occupation
time fields are given in terms of complex Gaussian measures over complex-valued
random fields ([B92,BIS09]. Our space-time setting allows obtaining quantum
correlation functions as torus limits of space-time correlation functions.Comment: 3 figure
The European Perspective on Women\u27s Leadership
The perspective of women in leadership positions is of particular impor- tance in Europe. It is a main subject in the areas of research and science. For example: At the University of Augsburg we conducted several studies of women\u27s leadership and the female academic career in view of gender is- sues such as gender within the family and in socialization. Furthermore we accomplished two gender mainstreaming studies with the focus on equity in several universities in Germany (Gender mainstreaming is a European law of 1997 and a political strategy of diversity management).
In this article we want to show the perspective on women\u27s leadership in Europe. Therefore we want to present the European data on the educational status of girls and women at schools and universities and in academic ca- reers. Data for Germany is presented as an example to provide evidence of some details. First, we want to point out four contradictions for women in the education system and concerning leadership positions. Second, data is discussed and some results of research explaining the data are given. Fi- nally, we present a European Program for the educational system to give women more chances: The so called Gender Mainstreaming Program
Quantum graphs whose spectra mimic the zeros of the Riemann zeta function
One of the most famous problems in mathematics is the Riemann hypothesis:
that the non-trivial zeros of the Riemann zeta function lie on a line in the
complex plane. One way to prove the hypothesis would be to identify the zeros
as eigenvalues of a Hermitian operator, many of whose properties can be derived
through the analogy to quantum chaos. Using this, we construct a set of quantum
graphs that have the same oscillating part of the density of states as the
Riemann zeros, offering an explanation of the overall minus sign. The smooth
part is completely different, and hence also the spectrum, but the graphs pick
out the low-lying zeros.Comment: 8 pages, 8 pdf figure
Giving or Taking: The Role of Dispositional Power Motivation and Positive Affect in Profit Maximization?
Socio-economic decisions are commonly explained by rational cost vs. benefit considerations, whereas person variables have not usually been considered. The present study aims at investigating the degree to which dispositional power motivation and affective states predict socio-economic decisions. The power motive was assessed both indirectly and directly using a TAT-like picture test and a power motive self-report, respectively. After nine months, 62 students completed an affect rating and performed on a money allocation task (Social Values Questionnaire). We hypothesized and confirmed that dispositional power should be associated with a tendency to maximize one’s profit but to care less about another party’s profit. Additionally, positive affect showed effects in the same direction. The results are discussed with respect to a motivational approach explaining socio-economic behaviour.economic decision-making, rational choice theory, personality, implicit power motive, positive affect, operant motive test
Certifying floating-point implementations using Gappa
High confidence in floating-point programs requires proving numerical
properties of final and intermediate values. One may need to guarantee that a
value stays within some range, or that the error relative to some ideal value
is well bounded. Such work may require several lines of proof for each line of
code, and will usually be broken by the smallest change to the code (e.g. for
maintenance or optimization purpose). Certifying these programs by hand is
therefore very tedious and error-prone. This article discusses the use of the
Gappa proof assistant in this context. Gappa has two main advantages over
previous approaches: Its input format is very close to the actual C code to
validate, and it automates error evaluation and propagation using interval
arithmetic. Besides, it can be used to incrementally prove complex mathematical
properties pertaining to the C code. Yet it does not require any specific
knowledge about automatic theorem proving, and thus is accessible to a wide
community. Moreover, Gappa may generate a formal proof of the results that can
be checked independently by a lower-level proof assistant like Coq, hence
providing an even higher confidence in the certification of the numerical code.
The article demonstrates the use of this tool on a real-size example, an
elementary function with correctly rounded output
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