Sign In

Login

Password

Forgot Password ? Sign Up

Acoustic attenuation (English Wikipedia)

Analysis of information sources in references of the Wikipedia article "Acoustic attenuation" in English language version.

refsWebsite
Global rank English rank
20doi.org
2nd place
2nd place
15harvard.edu
18th place
17th place
9nih.gov
4th place
4th place
7semanticscholar.org
11th place
8th place
5arxiv.org
69th place
59th place
3handle.net
102nd place
76th place
1zenodo.org
621st place
380th place

arxiv.org

doi.org

  • Kirchhoff, G. (1868). "Ueber den Einfluss der Wärmeleitung in einem Gase auf die Schallbewegung". Annalen der Physik und Chemie. 210 (6): 177–193. Bibcode:1868AnP...210..177K. doi:10.1002/andp.18682100602.
  • Chen, Yangkang; Ma, Jitao (May–June 2014). "Random noise attenuation by f-x empirical-mode decomposition predictive filtering". Geophysics. 79 (3): V81–V91. Bibcode:2014Geop...79...81C. doi:10.1190/GEO2013-0080.1.
  • Chen, Yangkang; Zhang, Guoyin; Gan, Shuwei; Zhang, Chenglin (2015). "Enhancing seismic reflections using empirical mode decomposition in the flattened domain". Journal of Applied Geophysics. 119: 99–105. Bibcode:2015JAG...119...99C. doi:10.1016/j.jappgeo.2015.05.012.
  • Chen, Yangkang (2016). "Dip-separated structural filtering using seislet transform and adaptive empirical mode decomposition based dip filter". Geophysical Journal International. 206 (1): 457–469. Bibcode:2016GeoJI.206..457C. doi:10.1093/gji/ggw165.
  • Szabo, Thomas L.; Wu, Junru (2000). "A model for longitudinal and shear wave propagation in viscoelastic media". The Journal of the Acoustical Society of America. 107 (5): 2437–2446. Bibcode:2000ASAJ..107.2437S. doi:10.1121/1.428630. PMID 10830366.
  • Szabo, Thomas L. (1994). "Time domain wave equations for lossy media obeying a frequency power law". The Journal of the Acoustical Society of America. 96 (1): 491–500. Bibcode:1994ASAJ...96..491S. doi:10.1121/1.410434.
  • Chen, W.; Holm, S. (2003). "Modified Szabo's wave equation models for lossy media obeying frequency power law". The Journal of the Acoustical Society of America. 114 (5): 2570–4. arXiv:math-ph/0212076. Bibcode:2003ASAJ..114.2570C. doi:10.1121/1.1621392. PMID 14649993. S2CID 33635976.
  • Chen, W.; Holm, S. (2004). "Fractional Laplacian time-space models for linear and nonlinear lossy media exhibiting arbitrary frequency power-law dependency". The Journal of the Acoustical Society of America. 115 (4): 1424–1430. Bibcode:2004ASAJ..115.1424C. doi:10.1121/1.1646399. PMID 15101619.
  • Carcione, J. M.; Cavallini, F.; Mainardi, F.; Hanyga, A. (2002). "Time-domain Modeling of Constant- Q Seismic Waves Using Fractional Derivatives". Pure and Applied Geophysics. 159 (7–8): 1719–1736. Bibcode:2002PApGe.159.1719C. doi:10.1007/s00024-002-8705-z. S2CID 73598914.
  • d'Astous, F.T.; Foster, F.S. (1986). "Frequency dependence of ultrasound attenuation and backscatter in breast tissue". Ultrasound in Medicine & Biology. 12 (10): 795–808. doi:10.1016/0301-5629(86)90077-3. PMID 3541334.
  • Holm, Sverre; Näsholm, Sven Peter (2011). "A causal and fractional all-frequency wave equation for lossy media". The Journal of the Acoustical Society of America. 130 (4): 2195–2202. Bibcode:2011ASAJ..130.2195H. doi:10.1121/1.3631626. hdl:10852/103311. PMID 21973374.
  • Pritz, T. (2004). "Frequency power law of material damping". Applied Acoustics. 65 (11): 1027–1036. doi:10.1016/j.apacoust.2004.06.001.
  • Waters, K.R.; Mobley, J.; Miller, J.G. (2005). "Causality-imposed (Kramers-Kronig) relationships between attenuation and dispersion". IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control. 52 (5): 822–823. doi:10.1109/TUFFC.2005.1503968. PMID 16048183. S2CID 23508424.
  • Nachman, Adrian I.; Smith, James F.; Waag, Robert C. (1990). "An equation for acoustic propagation in inhomogeneous media with relaxation losses". The Journal of the Acoustical Society of America. 88 (3): 1584–1595. Bibcode:1990ASAJ...88.1584N. doi:10.1121/1.400317.
  • Caputo, M.; Mainardi, F. (1971). "A new dissipation model based on memory mechanism". Pure and Applied Geophysics. 91 (1): 134–147. Bibcode:1971PApGe..91..134C. doi:10.1007/BF00879562. S2CID 121781575.
  • Holm, Sverre; Näsholm, Sven Peter (2014). "Comparison of Fractional Wave Equations for Power Law Attenuation in Ultrasound and Elastography". Ultrasound in Medicine & Biology. 40 (4): 695–703. arXiv:1306.6507. doi:10.1016/j.ultrasmedbio.2013.09.033. PMID 24433745. S2CID 11983716.
  • Näsholm, Sven Peter; Holm, Sverre (2011). "Linking multiple relaxation, power-law attenuation, and fractional wave equations". The Journal of the Acoustical Society of America. 130 (5): 3038–3045. Bibcode:2011ASAJ..130.3038N. doi:10.1121/1.3641457. hdl:10852/103312. PMID 22087931.
  • Sven Peter Nasholm; Holm, Sverre (2012). "On a Fractional Zener Elastic Wave Equation". Fractional Calculus and Applied Analysis. 16: 26–50. arXiv:1212.4024. doi:10.2478/s13540-013-0003-1. S2CID 120348311.
  • Näsholm, Sven Peter (2013). "Model-based discrete relaxation process representation of band-limited power-law attenuation". The Journal of the Acoustical Society of America. 133 (3): 1742–1750. arXiv:1301.5256. Bibcode:2013ASAJ..133.1742N. doi:10.1121/1.4789001. PMID 23464043. S2CID 22963787.
  • Müller, Tobias M.; Gurevich, Boris; Lebedev, Maxim (September 2010). "Seismic wave attenuation and dispersion resulting from wave-induced flow in porous rocks — A review". Geophysics. 75 (5): 75A147–75A164. Bibcode:2010Geop...75A.147M. doi:10.1190/1.3463417. hdl:20.500.11937/35921.

handle.net

hdl.handle.net

harvard.edu

ui.adsabs.harvard.edu

  • Kirchhoff, G. (1868). "Ueber den Einfluss der Wärmeleitung in einem Gase auf die Schallbewegung". Annalen der Physik und Chemie. 210 (6): 177–193. Bibcode:1868AnP...210..177K. doi:10.1002/andp.18682100602.
  • Chen, Yangkang; Ma, Jitao (May–June 2014). "Random noise attenuation by f-x empirical-mode decomposition predictive filtering". Geophysics. 79 (3): V81–V91. Bibcode:2014Geop...79...81C. doi:10.1190/GEO2013-0080.1.
  • Chen, Yangkang; Zhang, Guoyin; Gan, Shuwei; Zhang, Chenglin (2015). "Enhancing seismic reflections using empirical mode decomposition in the flattened domain". Journal of Applied Geophysics. 119: 99–105. Bibcode:2015JAG...119...99C. doi:10.1016/j.jappgeo.2015.05.012.
  • Chen, Yangkang (2016). "Dip-separated structural filtering using seislet transform and adaptive empirical mode decomposition based dip filter". Geophysical Journal International. 206 (1): 457–469. Bibcode:2016GeoJI.206..457C. doi:10.1093/gji/ggw165.
  • Szabo, Thomas L.; Wu, Junru (2000). "A model for longitudinal and shear wave propagation in viscoelastic media". The Journal of the Acoustical Society of America. 107 (5): 2437–2446. Bibcode:2000ASAJ..107.2437S. doi:10.1121/1.428630. PMID 10830366.
  • Szabo, Thomas L. (1994). "Time domain wave equations for lossy media obeying a frequency power law". The Journal of the Acoustical Society of America. 96 (1): 491–500. Bibcode:1994ASAJ...96..491S. doi:10.1121/1.410434.
  • Chen, W.; Holm, S. (2003). "Modified Szabo's wave equation models for lossy media obeying frequency power law". The Journal of the Acoustical Society of America. 114 (5): 2570–4. arXiv:math-ph/0212076. Bibcode:2003ASAJ..114.2570C. doi:10.1121/1.1621392. PMID 14649993. S2CID 33635976.
  • Chen, W.; Holm, S. (2004). "Fractional Laplacian time-space models for linear and nonlinear lossy media exhibiting arbitrary frequency power-law dependency". The Journal of the Acoustical Society of America. 115 (4): 1424–1430. Bibcode:2004ASAJ..115.1424C. doi:10.1121/1.1646399. PMID 15101619.
  • Carcione, J. M.; Cavallini, F.; Mainardi, F.; Hanyga, A. (2002). "Time-domain Modeling of Constant- Q Seismic Waves Using Fractional Derivatives". Pure and Applied Geophysics. 159 (7–8): 1719–1736. Bibcode:2002PApGe.159.1719C. doi:10.1007/s00024-002-8705-z. S2CID 73598914.
  • Holm, Sverre; Näsholm, Sven Peter (2011). "A causal and fractional all-frequency wave equation for lossy media". The Journal of the Acoustical Society of America. 130 (4): 2195–2202. Bibcode:2011ASAJ..130.2195H. doi:10.1121/1.3631626. hdl:10852/103311. PMID 21973374.
  • Nachman, Adrian I.; Smith, James F.; Waag, Robert C. (1990). "An equation for acoustic propagation in inhomogeneous media with relaxation losses". The Journal of the Acoustical Society of America. 88 (3): 1584–1595. Bibcode:1990ASAJ...88.1584N. doi:10.1121/1.400317.
  • Caputo, M.; Mainardi, F. (1971). "A new dissipation model based on memory mechanism". Pure and Applied Geophysics. 91 (1): 134–147. Bibcode:1971PApGe..91..134C. doi:10.1007/BF00879562. S2CID 121781575.
  • Näsholm, Sven Peter; Holm, Sverre (2011). "Linking multiple relaxation, power-law attenuation, and fractional wave equations". The Journal of the Acoustical Society of America. 130 (5): 3038–3045. Bibcode:2011ASAJ..130.3038N. doi:10.1121/1.3641457. hdl:10852/103312. PMID 22087931.
  • Näsholm, Sven Peter (2013). "Model-based discrete relaxation process representation of band-limited power-law attenuation". The Journal of the Acoustical Society of America. 133 (3): 1742–1750. arXiv:1301.5256. Bibcode:2013ASAJ..133.1742N. doi:10.1121/1.4789001. PMID 23464043. S2CID 22963787.
  • Müller, Tobias M.; Gurevich, Boris; Lebedev, Maxim (September 2010). "Seismic wave attenuation and dispersion resulting from wave-induced flow in porous rocks — A review". Geophysics. 75 (5): 75A147–75A164. Bibcode:2010Geop...75A.147M. doi:10.1190/1.3463417. hdl:20.500.11937/35921.

nih.gov

pubmed.ncbi.nlm.nih.gov

semanticscholar.org

api.semanticscholar.org

zenodo.org

  • Kirchhoff, G. (1868). "Ueber den Einfluss der Wärmeleitung in einem Gase auf die Schallbewegung". Annalen der Physik und Chemie. 210 (6): 177–193. Bibcode:1868AnP...210..177K. doi:10.1002/andp.18682100602.