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相关概念视频

Survival Curves01:18

Survival Curves

196
Survival curves are graphical representations that depict the survival experience of a population over time, offering an intuitive way to track the proportion of individuals who remain event-free at each time point. These curves are widely used in fields such as medicine, public health, and reliability engineering to visualize and compare survival probabilities across different groups or conditions.
The Kaplan-Meier estimator is the most common method for constructing survival curves. This...
196
Parametric Survival Analysis: Weibull and Exponential Methods01:14

Parametric Survival Analysis: Weibull and Exponential Methods

472
Parametric survival analysis models survival data by assuming a specific probability distribution for the time until an event occurs. The Weibull and exponential distributions are two of the most commonly used methods in this context, due to their versatility and relatively straightforward application.
Weibull Distribution
The Weibull distribution is a flexible model used in parametric survival analysis. It can handle both increasing and decreasing hazard rates, depending on its shape parameter...
472
Introduction To Survival Analysis01:18

Introduction To Survival Analysis

277
Survival analysis is a statistical method used to study time-to-event data, where the "event" might represent outcomes like death, disease relapse, system failure, or recovery. A unique feature of survival data is censoring, which occurs when the event of interest has not been observed for some individuals during the study period. This requires specialized techniques to handle incomplete data effectively.
The primary goal of survival analysis is to estimate survival time—the time...
277
Assumptions of Survival Analysis01:15

Assumptions of Survival Analysis

154
Survival models analyze the time until one or more events occur, such as death in biological organisms or failure in mechanical systems. These models are widely used across fields like medicine, biology, engineering, and public health to study time-to-event phenomena. To ensure accurate results, survival analysis relies on key assumptions and careful study design.
154
Entropy Change in Reversible Processes01:10

Entropy Change in Reversible Processes

2.6K
In the Carnot engine, which achieves the maximum efficiency between two reservoirs of fixed temperatures, the total change in entropy is zero. The observation can be generalized by considering any reversible cyclic process consisting of many Carnot cycles. Thus, it can be stated that the total entropy change of any ideal reversible cycle is zero.
The statement can be further generalized to prove that entropy is a state function. Take a cyclic process between any two points on a p-V diagram.
2.6K
Probability Distributions01:32

Probability Distributions

7.3K
 The probability of a random variable x  is the likelihood of its occurrence. A probability distribution represents the probabilities of a random variable using a formula, graph, or table. There are two types of probability distribution– discrete probability distribution and continuous probability distribution.
A discrete probability distribution is a probability distribution of discrete random variables. It can be categorized into binomial probability distribution and Poisson...
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相关实验视频

Updated: Jul 18, 2025

Monitoring Neuronal Survival via Longitudinal Fluorescence Microscopy
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在 Eigenstate 转换时的规模不变的生存概率.

Miroslav Hopjan1, Lev Vidmar1,2

  • 1Department of Theoretical Physics, J. Stefan Institute, SI-1000 Ljubljana, Slovenia.

Physical review letters
|August 25, 2023
PubMed
概括

研究人员发现了一种新的方法,使用缩放的生存概率来检测量子相位过渡. 这种方法揭示了过渡时的尺度不变行为,为本地化和ergodicity破坏提供了洞察力.

科学领域:

  • 量子物理学的量子物理学
  • 凝聚物质理论 凝聚物质理论
  • 统计力学就是统计力学.

背景情况:

  • 在高度激发的哈密尔顿固态中表征量子相位过渡仍然是一个重大挑战.
  • 开发用于分析这些转变的时间域工具对于推进量子力学理解至关重要.

研究的目的:

  • 介绍和演示一种用于描述时间域中的量子相位过渡的新方法.
  • 探索这种方法在不同类型的量子系统中的适用性,包括二级模型和相互作用模型.

主要方法:

  • 缩放的生存概率的分析,时间被海森堡时间规范化.
  • 该方法应用于范式二次模型:一维的奥布里-安德烈模型和三维的安德森模型.
  • 将分析扩展到交互的雪崩模型中,该模型是一个表现出 ergodicity 断裂阶段过渡的系统.

主要成果:

  • 在二次模型中,在自身状态过渡时观察到缩放生存概率的规模不变行为.
  • 令人惊的是,在交互的雪崩模型中发现了类似的规模不变现象学.
  • 这表明正方形系统中的局部化转换与相互作用系统中的ergodicity断裂之间存在意想不到的联系.

结论:

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  • 缩放的生存概率作为一种强大的,普遍的工具,用于识别时间域中的量子相位过渡.
  • 这项研究揭示了局部化和厄尔戈迪性破坏相位过渡之间的深刻相似性,弥合了量子物理学的不同领域.
  • 这一发现为对复杂量子现象的理论和实验研究开辟了新的途径.