@article{article,
author = {Lapidus, Michel L and Radunovi\'{c}, Goran and \v{Z}ubrini\'{c}, Darko},
doi = {10.1016/j.aim.2016.11.034},
journal = {Advances in mathematics},
keywords = {Dirichlet integral,Minkowski content,Minkowski measurable set,box dimension,distance zeta function,fractal set,fractal string,principal complex dimensions,residue,transcendentally quasiperiodic set.,tube zeta function,zeta function},
pages = {1215--1267},
title = {{Distance and tube zeta functions of fractals and arbitrary compact sets}},
volume = {307},
year = {2017}
}

{"_id":"8KxbxpjkNkRsjTzwj","bibbaseid":"lapidus-radunovi-ubrini-distanceandtubezetafunctionsoffractalsandarbitrarycompactsets-2017","author_short":["Lapidus, M. L","Radunović, G.","Žubrinić, D."],"bibdata":{"bibtype":"article","type":"article","author":[{"propositions":[],"lastnames":["Lapidus"],"firstnames":["Michel","L"],"suffixes":[]},{"propositions":[],"lastnames":["Radunović"],"firstnames":["Goran"],"suffixes":[]},{"propositions":[],"lastnames":["Žubrinić"],"firstnames":["Darko"],"suffixes":[]}],"doi":"10.1016/j.aim.2016.11.034","journal":"Advances in mathematics","keywords":"Dirichlet integral,Minkowski content,Minkowski measurable set,box dimension,distance zeta function,fractal set,fractal string,principal complex dimensions,residue,transcendentally quasiperiodic set.,tube zeta function,zeta function","pages":"1215–1267","title":"Distance and tube zeta functions of fractals and arbitrary compact sets","volume":"307","year":"2017","bibtex":"@article{article,\nauthor = {Lapidus, Michel L and Radunovi\\'{c}, Goran and \\v{Z}ubrini\\'{c}, Darko},\ndoi = {10.1016/j.aim.2016.11.034},\njournal = {Advances in mathematics},\nkeywords = {Dirichlet integral,Minkowski content,Minkowski measurable set,box dimension,distance zeta function,fractal set,fractal string,principal complex dimensions,residue,transcendentally quasiperiodic set.,tube zeta function,zeta function},\npages = {1215--1267},\ntitle = {{Distance and tube zeta functions of fractals and arbitrary compact sets}},\nvolume = {307},\nyear = {2017}\n}\n","author_short":["Lapidus, M. L","Radunović, G.","Žubrinić, D."],"key":"article-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1","id":"article-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1-1","bibbaseid":"lapidus-radunovi-ubrini-distanceandtubezetafunctionsoffractalsandarbitrarycompactsets-2017","role":"author","urls":{},"keyword":["Dirichlet integral","Minkowski content","Minkowski measurable set","box dimension","distance zeta function","fractal set","fractal string","principal complex dimensions","residue","transcendentally quasiperiodic set.","tube zeta function","zeta function"],"metadata":{"authorlinks":{}}},"bibtype":"article","biburl":"https://bibbase.org/f/rTKwnBhyGKSSptYtt/My Collection.bib","dataSources":["MpTxM7aR49zFotABd"],"keywords":["dirichlet integral","minkowski content","minkowski measurable set","box dimension","distance zeta function","fractal set","fractal string","principal complex dimensions","residue","transcendentally quasiperiodic set.","tube zeta function","zeta function"],"search_terms":["distance","tube","zeta","functions","fractals","arbitrary","compact","sets","lapidus","radunović","žubrinić"],"title":"Distance and tube zeta functions of fractals and arbitrary compact sets","year":2017}