The resolution of fluorescence microscopy images is limited by the physical properties of light. In the last decade, numerous super-resolution microscopy (SRM) approaches have been proposed to deal with such hindrance. Here we present Mean-Shift Super Resolution (MSSR), a new SRM algorithm based on the Mean Shift theory, which extends spatial resolution of single fluorescence images beyond the diffraction limit of light. MSSR works on low and high fluorophore densities, is not limited by the architecture of the optical setup and is applicable to single images as well as temporal series. The theoretical limit of spatial resolution, based on optimized real-world imaging conditions and analysis of temporal image stacks, has been measured to be 40 nm. Furthermore, MSSR has denoising capabilities that outperform other SRM approaches. Along with its wide accessibility, MSSR is a powerful, flexible, and generic tool for multidimensional and live cell imaging applications.
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Abstract Single-particle tracking offers detailed information about the motion of molecules in complex environments such as those encountered in live cells, but the interpretation of experimental data is challenging. One of the most powerful tools in the characterization of random processes is the power spectral density. However, because anomalous diffusion processes in complex systems are usually not stationary, the traditional Wiener-Khinchin theorem for the analysis of power spectral densities is invalid. Here, we employ a recently developed tool named aging Wiener-Khinchin theorem to derive the power spectral density of fractional Brownian motion coexisting with a scale-free continuous time random walk, the two most typical anomalous diffusion processes. Using this analysis, we characterize the motion of voltage-gated sodium channels on the surface of hippocampal neurons. Our results show aging where the power spectral density can either increase or decrease with observation time depending on the specific parameters of both underlying processes.
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This paper proposes an approach for the estimation of a time-varying Hurst exponent to allow accurate identification of multifractional Brownian motion (MFBM). The contribution provides a prescription for how to deal with the MFBM measurement data to solve regression and classification problems. Theoretical studies are supplemented with computer simulations and real-world examples. Those prove that the procedure proposed in this paper outperforms the best-in-class algorithm.more » « less
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Datasets generated in the report "Aging power spectrum of membrane protein transport and other subordinated random walks". Included data are:
Numerical simulations
RWdata1.mat: 10,000 realizations, subordinated random walk with Hurst exponent, H=0.3 and \(\alpha\)=0.4.
RWdata3.mat: 10,000 realizations, subordinated random walk with Hurst exponent, H=0.7 and \(\alpha\)=0.4.
RWdata8.mat: 5,000 realizations, subordinated random walk with Hurst exponent, H=0.75 and \(\alpha\)=0.8.
RWdataCTRW.mat: 10,000 realizations, continuous time random walk (CTRW), \(\alpha\)=0.7.Spectra of simulations
PSDdata1.mat: Power spectral density (PSD) of a subordinated random walk with Hurst exponent, H=0.3 and \(\alpha\)=0.4. Five different realization times are used to compute the PDS: 2^8, 2^10, 2^12, 2^14, and 2^16.
PSDdata3.mat: PSD of a subordinated random walk with Hurst exponent, H=0.7 and \(\alpha\)=0.4. Five different realization times are used to compute the PDS: 2^8, 2^10, 2^12, 2^14, and 2^16.
PSDdata8.mat: PSD of a subordinated random walk with Hurst exponent, H=0.75 and \(\alpha\)=0.8. Four different realization times are used to compute the PDS: 2^15, 2^16, 2^17, and 2^18.
PSDs_CTRW.mat: PSD of a continuous-time random walk (CTRW), \(\alpha\)=0.7. Five different realization times are used to compute the PDS: 2^8, 2^10, 2^12, 2^14, and 2^16.Experimental data of Nav1.6 channels in the soma of hippocampal neurons
We acknowledge the support of the National Science Foundation grant 2102832 (to DK) and Israel Science Foundation grant 1898/17 (to EB). {"references": ["Fox, Z.R., Barkai, E. & Krapf, D. Aging power spectrum of membrane protein transport and other subordinated random walks. Nat Commun 12, 6162 (2021). https://doi.org/10.1038/s41467-021-26465-8"]}
NavMSDtimes.csv: ensemble-averaged (EA) MSD and time-averaged (TA) MSD. The TA-MSD is measured for three observation times, 64, 128, and 256 frames (3.2, 6.4, and 12.8 s).
NavPSD.csv: Power spectral density (PSD) measured for three observation times, 64, 128, and 256 frames.
