1. Negotiation from a near and distant time perspective. - APA PsycNET
Negotiation from a near and distant time perspective. Citation. Henderson, M. D., Trope, Y., & Carnevale, P. J. (2006). Negotiation from a near and distant ...
2. New open access publication: 'Distant-time' - Ayona Datta
15 mei 2024 · This paper proposes a notion of distant time as a metaphor of temporal power that keeps marginal citizens at a governable distance from the state.
DISTANT TIME: The future of urbanisation from ‘there’ and ‘then’
3. Distant Time: A Possible Typological Literary Universal
31 jan 2017 · The distant past is “so remote that its realities are not those of today, and are not to be believed or judged in the ordinary terms of the ...
(revised July 17, 2017) Michelle Scalise Sugiyama, University of Oregon, Eugene Argument and Evidence Literature began tens of thousands of years ago as ta ...
4. [PDF] Distant time: The future of urbanisation from 'there' and 'then'
Distant time is simultaneously a measure of clock time taken to traverse ... Source: British Library. 10. Dialogues in Human Geography 0(0). Page 11 ...
5. Distant time, distant gesture: speech and gesture correlate to express ...
14 jun 2021 · Over the last few years, co-speech gestures have become an invaluable source of information for research in language, cognition, and ...
This study investigates whether there is a relation between the semantics of linguistic expressions that indicate temporal distance and the spatial properties of their co-speech gestures. To this date, research on time gestures has focused on features such as gesture axis, direction, and shape. Here we focus on a gesture property that has been overlooked so far: the distance of the gesture in relation to the body. To achieve this, we investigate two types of temporal linguistic expressions are addressed: proximal (e.g., near future, near past) and distal (e.g., distant past, distant future). Data was obtained through the NewsScape library, a multimodal corpus of television news. A total of 121 co-speech gestures were collected and divided into the two categories. The gestures were later annotated in terms of gesture space and classified in three categories: (i) center, (ii) periphery, and (iii) extreme periphery. Our results suggest that gesture and language are coherent in the expression of temporal distance: when speakers locate an event far from them, they tend to gesture further from their body; similarly, when locating an event close to them, they gesture closer to their body. These results thus reveal how co-speech gestures also reflect a space-time mapping in the dimension of distance.
6. Negotiation From a Near and Distant Time Perspective - PMC - NCBI
The current study examines the proposition that temporal distance from the realization of negotiated agreements promotes integrative behavior during the ...
Across 3 experiments, the authors examined the effects of temporal distance on negotiation behavior. They found that greater temporal distance from negotiation decreased preference for piecemeal, single-issue consideration over integrative, ...
7. Development of time, speed, and distance concepts. - APA PsycNet
Citation. Siegler, R. S., & Richards, D. D. · Abstract · Unique Identifier · Title · Publication Date · Language · Author Identifier · Affiliation.
8. [2407.05231] Fréchet Distance in Subquadratic Time - arXiv
7 jul 2024 · Title:Fréchet Distance in Subquadratic Time ; Subjects: Computational Geometry (cs.CG); Data Structures and Algorithms (cs.DS) ; Cite as: arXiv: ...
Let $m$ and $n$ be the numbers of vertices of two polygonal curves in $\mathbb{R}^d$ for any fixed $d$ such that $m \leq n$. Since it was known in 1995 how to compute the Fréchet distance of these two curves in $O(mn\log (mn))$ time, it has been an open problem whether the running time can be reduced to $o(n^2)$ when $m = Ω(n)$. In the mean time, several well-known quadratic time barriers in computational geometry have been overcome: 3SUM, some 3SUM-hard problems, and the computation of some distances between two polygonal curves, including the discrete Fréchet distance, the dynamic time warping distance, and the geometric edit distance. It is curious that the quadratic time barrier for Fréchet distance still stands. We present an algorithm to compute the Fréchet distance in $O(mn(\log\log n)^{2+μ}\log n/\log^{1+μ} m)$ expected time for some constant $μ\in (0,1)$. It is the first algorithm that returns the Fréchet distance in $o(mn)$ time when $m = Ω(n^{\varepsilon})$ for any fixed $\varepsilon \in (0,1]$.