6,067 research outputs found
Household Allocations and Endogenous Information
This paper tests for the endogeneity of one of the main elements separating different models of intrahousehold allocations, namely the household information set. Based on unusually rich data, I find that split migrant couples in the Nairobi slums invest considerable resources into information acquisition through visits, sibling and child monitoring, budget submissions, and marital search. I also find potentially substantial welfare losses when information acquisition becomes costly, not only through reduced remittances but more importantly as families opt for family migration into the slums. That households invest in information when there are welfare gains complements a large and growing literature that seeks to explain intrahousehold allocations through more complex modes of decision-making.Survey Methods, Household production and Intrahousehold Allocation, Marriage, Family Structure, Migration
On the Regularization of the Kepler Problem
We show that for the Kepler problem the canonical Ligon-Schaaf regularization
map can be understood in a straightforward manner as an adaptation of the Moser
regularization. In turn this explains the hidden symmetry in a geometric way.Comment: 12 page
Superexpanders from group actions on compact manifolds
It is known that the expanders arising as increasing sequences of level sets
of warped cones, as introduced by the second-named author, do not coarsely
embed into a Banach space as soon as the corresponding warped cone does not
coarsely embed into this Banach space. Combining this with non-embeddability
results for warped cones by Nowak and Sawicki, which relate the
non-embeddability of a warped cone to a spectral gap property of the underlying
action, we provide new examples of expanders that do not coarsely embed into
any Banach space with nontrivial type. Moreover, we prove that these expanders
are not coarsely equivalent to a Lafforgue expander. In particular, we provide
infinitely many coarsely distinct superexpanders that are not Lafforgue
expanders. In addition, we prove a quasi-isometric rigidity result for warped
cones.Comment: 16 pages, to appear in Geometriae Dedicat
Simple Lie groups without the Approximation Property
For a locally compact group G, let A(G) denote its Fourier algebra, and let
M_0A(G) denote the space of completely bounded Fourier multipliers on G. The
group G is said to have the Approximation Property (AP) if the constant
function 1 can be approximated by a net in A(G) in the weak-* topology on the
space M_0A(G). Recently, Lafforgue and de la Salle proved that SL(3,R) does not
have the AP, implying the first example of an exact discrete group without it,
namely SL(3,Z). In this paper we prove that Sp(2,R) does not have the AP. It
follows that all connected simple Lie groups with finite center and real rank
greater than or equal to two do not have the AP. This naturally gives rise to
many examples of exact discrete groups without the AP.Comment: Version 4, 29 pages. Minor correction
A semidefinite programming hierarchy for packing problems in discrete geometry
Packing problems in discrete geometry can be modeled as finding independent
sets in infinite graphs where one is interested in independent sets which are
as large as possible. For finite graphs one popular way to compute upper bounds
for the maximal size of an independent set is to use Lasserre's semidefinite
programming hierarchy. We generalize this approach to infinite graphs. For this
we introduce topological packing graphs as an abstraction for infinite graphs
coming from packing problems in discrete geometry. We show that our hierarchy
converges to the independence number.Comment: (v2) 25 pages, revision based on suggestions by referee, accepted in
Mathematical Programming Series B special issue on polynomial optimizatio
A quartet in E : investigating collaborative learning and tutoring as knowledge creation processes
This paper is a short report of a continuing international study that is investigating networked collaborative learning among an advanced community of learners engaged in a master’s programme in e-learning. The study is undertaking empirical work using content analysis (CA), critical event recall (CER) and social network analysis (SNA). The first two methods are employed in the work reported in this paper. We are particularly interested in knowledge creation among the participants as they engage in action research for their master’s work. At the same time, another underlying aim of the main study is to develop methodology, enrich theory and explore the ways in which praxis (theory informed tutoring and learning on the programme) and theory interact as we try to understand the complex processes of tutoring and learning. The paper reports some of the current findings of this work and discusses future prospects
Simple Lie groups without the Approximation Property II
We prove that the universal covering group
of does not
have the Approximation Property (AP). Together with the fact that
does not have the AP, which was proved by Lafforgue
and de la Salle, and the fact that does not have
the AP, which was proved by the authors of this article, this finishes the
description of the AP for connected simple Lie groups. Indeed, it follows that
a connected simple Lie group has the AP if and only if its real rank is zero or
one. By an adaptation of the methods we use to study the AP, we obtain results
on approximation properties for noncommutative -spaces associated with
lattices in . Combining this with
earlier results of Lafforgue and de la Salle and results of the second named
author of this article, this gives rise to results on approximation properties
of noncommutative -spaces associated with lattices in any connected simple
Lie group.Comment: Final version. Continuation of the work in 1201.1250 and 1208.593
Strong property (T) for higher rank simple Lie groups
We prove that connected higher rank simple Lie groups have Lafforgue's strong
property (T) with respect to a certain class of Banach spaces
containing many classical superreflexive spaces and some
non-reflexive spaces as well. This generalizes the result of Lafforgue
asserting that has strong property (T) with respect
to Hilbert spaces and the more recent result of the second named author
asserting that has strong property (T) with respect
to a certain larger class of Banach spaces. For the generalization to higher
rank groups, it is sufficient to prove strong property (T) for
and its universal covering group. As consequences
of our main result, it follows that for , connected
higher rank simple Lie groups and their lattices have property (F) of
Bader, Furman, Gelander and Monod, and that the expanders contructed from a
lattice in a connected higher rank simple Lie group do not admit a coarse
embedding into .Comment: 33 pages, 1 figur
Can Warm Glow Alleviate Credit Market Failures? Evidence from Online Peer-to-Peer Lenders
This paper looks at an institutional innovation in which Western investors lend peer-to-peer to poor country enterprises. Using a unique dataset from an online lending platform called MyC4, we find that MyC4’s Western lenders grant lower interest rates to pro-poor, socially responsible (SR), and pro-female African projects, thus internalizing positive externalities. Using novel instrumental variables to account for interest rates’ endogeneity, we find that these lower interest rates substantially improve the repayment performance of borrowers, and do not reflect profit-maximizing behavior. This new way to organize finance improves credit market efficiency and the success rate of poorntry enterprises.Credit markets imperfections, externalities, warm glow
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