@prefix rdfs: . @prefix dbr: . dbr:Fractal_curve rdfs:label "Curva fractal"@es , "Fractal curve"@en ; rdfs:comment "A fractal curve is, loosely, a mathematical curve whose shape retains the same general pattern of irregularity, regardless of how high it is magnified, that is, its graph takes the form of a fractal. In general, fractal curves are nowhere rectifiable curves \u2014 that is, they do not have finite length \u2014 and every subarc longer than a single point has infinite length. A famous example is the boundary of the Mandelbrot set."@en , "Una curva fractal es, en t\u00E9rminos generales, un tipo de curva matem\u00E1tica cuya forma conserva el mismo patr\u00F3n general de , independientemente de cu\u00E1nto se aumente el detalle con el que se representa, de manera que su gr\u00E1fico posee una configuraci\u00F3n fractal.\u200B Por lo general, no son rectificables, es decir, su longitud de arco no es finita, y cada fragmento del arco de la curva m\u00E1s largo que un solo punto tiene longitud infinita.\u200B Un ejemplo extremadamente famoso es el contorno del conjunto de Mandelbrot."@es . @prefix foaf: . dbr:Fractal_curve foaf:depiction , . @prefix dcterms: . @prefix dbc: . dbr:Fractal_curve dcterms:subject dbc:Types_of_functions , dbc:Fractal_curves . @prefix dbo: . dbr:Fractal_curve dbo:wikiPageID 4972605 ; dbo:wikiPageRevisionID 1107452727 ; dbo:wikiPageWikiLink , dbr:Vascular_network , dbr:Quasicircle , dbr:Dragon_curve , , dbr:Nature , , dbr:Newton_fractal , , dbr:Benoit_Mandelbrot , dbr:Fractal_landscape , dbr:Geomorphology , dbr:Polymer_molecule , dbr:The_Fractal_Geometry_of_Nature , dbr:Lichtenberg_figure , dbr:Patterns_in_nature , , dbr:Fluid_mechanics , dbr:Fractal_antenna , dbr:Orbit_trap , dbr:Fibonacci_word_fractal , dbr:Coastline_paradox , dbr:Romanesco_broccoli , dbr:Brownian_motion , dbc:Types_of_functions , dbr:Curve_length , , dbr:Broccoli , dbr:Human_physiology , dbr:Fractal , dbr:Economics , dbr:Mosely_snowflake , dbr:Fractal_dimension , dbr:Frost_crystals , dbr:Fractal_expressionism , dbr:The_Beauty_of_Fractals , dbr:Blancmange_curve , , dbr:Peano_curve , dbr:List_of_fractals_by_Hausdorff_dimension , dbr:De_Rham_curve , dbr:Self-similarity , dbr:Hausdorff_dimension , dbr:Subarc , dbr:Linguistics , dbr:Natural_phenomena , dbr:Microscopic_view , dbc:Fractal_curves , dbr:Weierstrass_function , dbr:Mandelbrot_set , dbr:Self-organized_criticality , dbr:Snowflakes , dbr:Menger_sponge , dbr:Rectifiable_curve , dbr:Surface , , dbr:Hexaflake , dbr:Koch_snowflake , dbr:Infinite_length , dbr:Lightning_strike , dbr:Geckos ; dbo:wikiPageExternalLink , , , , . @prefix ns6: . dbr:Fractal_curve dbo:wikiPageExternalLink ns6:area-of-koch-snowflake-part-1-advanced , ns6:koch-snowflake-fractal . @prefix owl: . @prefix wikidata: . dbr:Fractal_curve owl:sameAs wikidata:Q96378256 . @prefix dbpedia-es: . dbr:Fractal_curve owl:sameAs dbpedia-es:Curva_fractal . @prefix ns10: . dbr:Fractal_curve owl:sameAs ns10:BuN6C . @prefix dbp: . @prefix dbt: . dbr:Fractal_curve dbp:wikiPageUsesTemplate dbt:Fractals , dbt:Div_col , dbt:Div_col_end , dbt:Reflist , dbt:Short_description ; dbo:thumbnail ; dbo:abstract "Una curva fractal es, en t\u00E9rminos generales, un tipo de curva matem\u00E1tica cuya forma conserva el mismo patr\u00F3n general de , independientemente de cu\u00E1nto se aumente el detalle con el que se representa, de manera que su gr\u00E1fico posee una configuraci\u00F3n fractal.\u200B Por lo general, no son rectificables, es decir, su longitud de arco no es finita, y cada fragmento del arco de la curva m\u00E1s largo que un solo punto tiene longitud infinita.\u200B Un ejemplo extremadamente famoso es el contorno del conjunto de Mandelbrot."@es , "A fractal curve is, loosely, a mathematical curve whose shape retains the same general pattern of irregularity, regardless of how high it is magnified, that is, its graph takes the form of a fractal. In general, fractal curves are nowhere rectifiable curves \u2014 that is, they do not have finite length \u2014 and every subarc longer than a single point has infinite length. A famous example is the boundary of the Mandelbrot set."@en . @prefix prov: . dbr:Fractal_curve prov:wasDerivedFrom . @prefix xsd: . dbr:Fractal_curve dbo:wikiPageLength "5556"^^xsd:nonNegativeInteger . @prefix wikipedia-en: . dbr:Fractal_curve foaf:isPrimaryTopicOf wikipedia-en:Fractal_curve .