[right][i][b][size=50][color=#ff7700]14. September 2020 [/color][/size][/b][/i][b][size=50]Diese Aktivität ist eine Seite des[/size][/b][i][b][size=50] [color=#980000][url=https://www.geogebra.org/m/kCxvMbHb]geogebra-books Moebiusebene[br][/url][/color][/size][/b][/i][size=50][i][b]Diese Aktivität ist auch eine Seite des[/b][/i] [color=#980000][i][b]geogebra-books[/b][/i][/color] [url=https://www.geogebra.org/m/dcwdtu7t][u][color=#0000ff][i][b]Darboux Cycliden & bizirkulare Quartiken[/b][/i][/color][/u][/url] [color=#ff7700][i][b](14.09.2020)[br][size=50][color=#000000]Diese Aktivität ist auch eine Seite des[/color][i][b] [color=#980000]geogebra-books[/color][/b][/i] [url=https://www.geogebra.org/m/gz4cyje5][color=#0000ff][u][i][b]conics bicircular-quartics Darboux-cyclides[/b][/i][/u][/color][/url] [color=#ff7700][i][b](März 2021)[/b][/i][/color][/size][/b][/i][/color][/size][br][/right]

[size=85][size=100][i][b]Was läßt sich im obigen Applet erkunden?[/b][/i][/size][br]Rechts in [b]3D[/b] soll eine [color=#38761D][i][b]DARBOUX Cyclide[/b][/i][/color] angezeigt werden. Da wir leider keine Parameterdarstellung für diese Fläche kennen,[br]wird sie mit Hilfe von [color=#ff7700][i][b]Höhenlinien[/b][/i][/color] dargestellt: [color=#980000][b]Start z[sub]h[/sub] Animation[/b][/color].[br]Diese [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] mit der Gleichung [math]\left(x^2+y^2+z^2\right)^2-2\cdot A_x\cdot x^2-2\cdot B_y\cdot y^2-2\cdot C_z\cdot z^2+1=0[/math] besitzt [b]5[/b] [color=#BF9000][i][b]Symmetrien[/b][/i][/color]: [br]die [color=#BF9000][i][b]Spiegelungen[/b][/i][/color] an den 3 Koordinatenebenen, die Spiegelung ([color=#BF9000][i][b]Inversion[/b][/i][/color]) an der [color=#0000ff][i][b]Einheitskugel[/b][/i][/color], [br]und eine weitere - nicht reelle - [color=#BF9000][i][b]Möbiusspiegelung[/b][/i][/color].[br]Die Schnitte mit den Koordinatenebenen sind [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color], die links angezeigt werden, [br]wenn nötig, um 90° in die komplexe [b]GAUSS[/b]sche Ebene [math]\mathbb{C}[/math] gedreht. [br]Wir nennen die [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] 2-teilig, weil die Schnitte mit [color=#BF9000][i][b]Symmetrie-Ebenen[/b][/i][/color] oder [color=#BF9000][i][b]-Kugeln[/b][/i][/color] 2-teilig sind.[br]Die [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] wird überdeckt von [b]6[/b] [color=#ff0000][i][b]Kreisscharen[/b][/i][/color], die paarweise auftreten. [size=50][br]Aus diesen Kreisscharen kann man auf [b]8 = 2[sup]3[/sup][/b][sup] [/sup]verschiedene Weisen [color=#ff7700][i][b]6-Eck-Netze[/b][/i][/color] aus [color=#ff0000][i][b]Kreisen[/b][/i][/color] erzeugen; [br]dies kann leider wegen der Komplexität der Rechnungen oben nicht dargestellt werden.[br] [math]\hookrightarrow[/math]"[url=https://arxiv.org/abs/1106.1354]Darboux Cyclides and Webs from Circles[/url]" von H. POTTMANN, LING SHI und M. SKOPENKOV ([math]\hookrightarrow[/math][url=https://www.geogebra.org/m/kCxvMbHb#material/kBuDGYqv]2012 Lit. [[b]POT_et_ali[/b]][/url]).[br][/size][br][/size][b][size=100]Wie findet man [color=#ff0000][i]Kreise[/i][/color] auf der [/size][size=85][color=#38761D][i]DARBOUX Cyclide[/i][/color][/size][size=85]?[/size][/b][size=85][br][color=#ff0000][i][b]Kugeln[/b][/i][/color] ([b][icon]/images/ggb/toolbar/mode_showcheckbox.png[/icon]DB-Kugeln[/b]), welche die [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] [i][b]doppelt[/b][/i] (also in 2 verschiedenen Punkten) berühren, schneiden die [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] [br]in 2 [color=#ff0000][i][b]Kreisen[/b][/i][/color]: diese [/size][size=85][size=85][color=#ff0000][i][b]Kreise[/b][/i][/color][/size] können komplex sein, oder zusammenfallen, oder es sind 2 verschiedene reelle [/size][size=85][size=85][color=#ff0000][i][b]Kreise[/b][/i][/color][/size].[br]2-teilige [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color] besitzen 4 Scharen von [color=#999999][i][b]doppelt-berührenden[/b][/i][/color] [color=#ff0000][i][b]Kreisen:[/b][/i][/color] [br]jede dieser [color=#ff0000][i][b]Scharen[/b][/i][/color] ist durch eine der [color=#BF9000][i][b]Symmetrien[/b][/i][/color] bestimmt.[br]Erweitert man die [color=#999999][i][b]doppelt-berührenden[/b][/i][/color] [color=#ff0000][i][b]Kreise[/b][/i][/color] der [color=#ff7700][i][b]bizirkularen Quartik[/b][/i][/color] in der [math]xy[/math]-Ebene zu [color=#999999][i][b]doppelt-berührenden,[/b][/i][/color] [br]zur [math]xy[/math]-Ebene [color=#ff0000][i][b]orthogonalen Kugeln[/b][/i][/color], so kann man mit ihrer Hilfe die [color=#ff0000][i][b]Kreise[/b][/i][/color] auf der [/size][size=85][b][size=85][color=#38761D][i]DARBOUX Cyclide[/i][/color][/size][/b] konstruieren. [br][br][size=100][b]Wie konstruiert man die [color=#999999][i]doppelt-berührenden[/i][/color] [color=#ff0000][i]Kreise[/i][/color] einer [color=#ff7700][i]bizirkularen Quartik?[/i][/color][/b][/size][br]Eine 2-teilige[color=#ff7700][i][b] bizirkulare Quartik [/b][/i][/color]besitzt 4 verschiedene [color=#0000ff][i][b]konzyklische[/b][/i][/color] [color=#00ff00][i][b]Brennpunkte[/b][/i][/color]; für die [color=#ff7700][i][b]Quartik[/b][/i][/color] in der [math]xy[/math]-[color=#BF9000][i][b]Ebene[/b][/i][/color] [br]oben liegen diese auf der [math]y[/math]-[color=#BF9000][i][b]Achse[/b][/i][/color], spiegelbildlich zur [math]x[/math]-[color=#BF9000][i][b]Achse[/b][/i][/color] und zum [color=#BF9000][i][b]Einheitskreis[/b][/i][/color]. [br]Mit folgender generell für [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color] gültigen Eigenschaften kann man die doppelt-berührenden Kreise [br]mitsamt der Berührpunkte konstruieren:[br][/size][list][*][size=85] Spiegelt man einen zuvor fest gewählten [color=#00ff00][i][b]Brennpunkt[/b][/i][/color] (zB. [math]f_{xy}[/math]) an den [color=#999999][i][b]doppelt-berührenden[/b][/i][/color] [color=#ff0000][i][b]Kreisen[/b][/i][/color] einer [br][color=#BF9000][i][b]Symmetrie[/b][/i][/color], so liegen die [color=#00ffff][i][b]Spiegelpunkte[/b][/i][/color] auf einem [color=#ff0000][i][b]Kreis[/b][/i][/color]: dem zugehörigen [color=#0000ff][i][b]Leitkreis[/b][/i][/color]! Aus der Kenntnis des [br]zugehörigen [color=#0000ff][i][b]Leitkreises[/b][/i][/color] kann man die [/size][size=85][size=85][color=#999999][i][b]doppelt-berührenden[/b][/i][/color] [color=#ff0000][i][b]Kreise[/b][/i][/color][/size] mit Hilfe der [color=#00ffff][i][b]Punkte[/b][/i][/color] auf dem [/size][size=85][size=85][color=#0000ff][i][b]Leitkreis[/b][/i][/color][/size] [br]konstruieren! Man wähle hierzu eine der [color=#BF9000][i][b]Symmetrien[/b][/i][/color] und bewege den Punkt [color=#00ffff][i][b]pL..[/b][/i][/color] auf dem [color=#0000ff][i][b]Leitkreis[/b][/i][color=#000000].[br][/color][/color]Die [/size][size=85][size=85][color=#0000ff][i][b]Leitkreise[/b][/i][/color][/size] kann man mit Hilfe der [color=#ff0000][i][b]Scheitelkreise[/b][/i][/color] und der oben genannten Grundeigenschaft konstruieren.[br]Die [/size][size=85][size=85][size=85][color=#0000ff][i][b]Leitkreise[/b][/i][/color][/size][/size] sind orthogonal zur [math]y[/math]-Achse.[/size][/*][*][size=85]Die [color=#BF9000][i][b]Symmetrie[/b][/i][/color] zerlegt die 4 [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] in 2 Paare, und damit in 2 [color=#ff0000][i][b]elliptische Kreisbüschel[/b][/i][/color][sup]1[/sup]). [br]Durch jeden Punkt der [color=#ff7700][i][b]Quartik[/b][/i][/color] gehen aus jedem dieser [/size][size=85][size=85][color=#ff0000][i][b]Kreisbüschel[/b][/i][/color][/size] genau ein [/size][size=85][size=85][size=85][color=#ff0000][i][b]Kreis[/b][/i][/color][/size][/size]. [br]Die [/size][size=85][size=85][color=#ff7700][i][b]Quartik[/b][/i][/color][/size] selber und die doppelt-berührenden Kreise sind [br][/size][size=85][color=#999999][i][b]Winkelhalbierende[/b][/i][/color] [/size][size=85](Winkelsymmetrale) dieser beiden [i][b]"[color=#ff0000]Brenn-Kreise[/color]".[/b][/i][/size] [br][/*][/list][size=85] Die Konstruktion mit Hilfe des [color=#0000ff][i][b]Leitkreises[/b][/i][/color] gelingt auch für den Fall zweier nicht-reeller [color=#ff7700][i][b]Berührpunkte[/b][/i][/color]! [br]Der Schnitt der dazu gehörenden doppelt-berührenden Kugel mit der Cyclide kann dennoch aus reellen Kreisen bestehen! [br][/size][sup][/sup][size=50][sup]1[/sup]) Das Büschel aller Kreise durch 2 verschiedene Punkte wird meist "[color=#ff0000][i][b]elliptisch[/b][/i][/color]" genannt![/size]

[b]Wie konstruiert[icon]/images/ggb/toolbar/mode_circle3.png[/icon] man die [color=#ff0000][i]Kreise[/i][/color] auf der [color=#38761D][i]Cyclide[/i][/color]?[/b][br][size=85]Die [color=#666666][i][b]doppelt-berührenden [/b][/i][/color][color=#ff0000][i][b]Kreise[/b][/i][/color] werden erweitert zu [color=#ff0000][i][b]doppelt-berührenden[/b][/i][/color] [color=#ff0000][i][b]Kugeln[/b][/i][/color], orthogonal zur [math]xy[/math]-Ebene. [br]Diese [color=#ff0000][i][b]Kugeln[/b][/i][/color] schneiden oder berühren die [color=#ff7700][i][b]Quartiken[/b][/i][/color] in den [color=#BF9000][i][b]Koordinatenebenen[/b][/i][/color] in mehreren [color=#ff00ff][i][b]Punkten[/b][/i][/color]. [br]Mit ihnen kann man die beiden [color=#ff0000][i][b]Kreise[/b][/i][/color] auf der [color=#38761D][i][b]Cyclide[/b][/i][/color] konstruieren, wir unterscheiden die beiden [color=#ff0000][i][b]Kreise[/b][/i][/color] farblich! [br]Jede dieser beiden Kreisscharen überdeckt die [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] einfach: [b]StartAni[sub]Leit[/sub][/b].[br]Die zur [math]y[/math]-Achse symmetrischen [color=#ff0000][i][b]Kreise[/b][/i][/color] und die dazugehörenden [color=#ff0000][i][b]Kugeln[/b][/i][/color] werden oben nicht angezeigt: [br]sie haben mit der [color=#38761D][i][b]Cyclide[/b][/i][/color] nur die [color=#ff7700][i][b]Berührpunkte[/b][/i][/color] gemeinsam.[br][b]Kann es weitere [color=#ff0000][i]Kreise[/i][/color] auf der [/b][/size][size=85][b][size=85][color=#38761D][i]Cyclide[/i][/color][/size] geben?[/b][br]Die [color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color] in der [math]yz[/math]-Ebene, bzw. in der [math]zx[/math]-Ebene besitzen ebenfalls [color=#666666][i][b]doppelt-berührende[/b][/i][/color] [color=#ff0000][i][b]Kreise[/b][/i][/color] [br]und die dazugehörende [i][b]Kugeln[/b][/i].[br]Für die [math]zx[/math]-[color=#BF9000][i][b]Ebene[/b][/i][/color] haben wir exemplarisch diese [color=#666666][i][b]doppelt-berührenden[/b][/i][/color] [color=#ff0000][i][b]Kugeln[/b][/i][/color] konstruiert: [b]ConstrBiz[sub]zx[/sub][/b], bewege [color=#ff0000][b]px[sub]zx[/sub][/b][/color]. [br]Für [math]n_{zx}=1,n_{zx}=2[/math] berühren diese Kugeln nur in den [color=#ff7700][i][b]Berührpunkten[/b][/i][/color], für [math]n_{zx}=3[/math] erhält man zur [color=#0000ff][i][b]Einheitskugel[/b][/i][/color] [br]symmetrische [color=#ff0000][i][b]Schnittkreise[/b][/i][/color], für [math]n_{zx}=4[/math] ergeben sich [math]xyE[/math]-symmetrische [color=#ff0000][i][b]Kreise[/b][/i][/color]. [br]Man kann diese [color=#ff0000][i][b]Kreise[/b][/i][/color] mit den oben konstruierten [color=#ff0000][i][b]Kreisen[/b][/i][/color] vergleichen: die auf diese Weise konstruierten [color=#ff0000][i][b]Kreise[/b][/i][/color] [br]stimmen mit den oben konstruierten [color=#ff0000][i][b]Kreisen[/b][/i][/color] überein! [b][br]util [/b]zeigt einen zur Konstruktion nützlichen [color=#0000ff][i][b]Kreis[/b][/i][/color] auf der [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size]![/size]

[size=50][u][i][b]Nachtrag: [/b][/i][/u]Entsperrt man die [i][b]Fizierung[/b][/i] der [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] [b][f'sfix][/b], so lassen sich die Parameter [math]A_x\,,B_y\,,C_z[/math] ändern. [br]Möglicherweise werden die [color=#ff0000][i][b]Kreisscharen[/b][/i][/color] auf den entstehenden [color=#134F5C][i][b]Cycliden[/b][/i][/color] nicht mehr kontinuierlich dargestellt: viele Berechnungen sind [i][b]komplex[/b][/i]![/size]

[size=85][color=#0000ff][i][b][size=100]Zusammenhänge:[/size][/b][/i][/color][br][br]Der Beweggrund für dieses [color=#980000][i][b]book[/b][/i][/color] und diese Aktivität ist die Frage von [size=85][b]W. BLASCHKE [i](1938)[/i][/b][/size] nach allen [color=#ff7700][i][b]6-Eck-Netzen[/b][/i][/color] aus [color=#ff0000][i][b]Kreisen[/b][/i][/color].[br]Eine Frage, die unseres Wissens nach noch nicht beantwortet ist.[br]Im Applet oben kann man die 2*3, also [b]6[/b] [color=#ff0000][i][b]Kreisscharen[/b][/i][/color] erkunden, die auf einer 2-teiligen [color=#0C343D][i][b]DARBOUX Cyclide[/b][/i][/color] zu finden sind.[br]Aus diesen [color=#ff0000][i][b]Kreisen[/b][/i][/color] lassen sich [b]8[/b] verschiedene [color=#ff7700][i][b]6-Eck-Netze[/b][/i][/color] aus [color=#ff0000][i][b]Kreisen[/b][/i][/color] auf der [/size][size=85][size=85][color=#0C343D][i][b]Cyclide[/b][/i][/color][/size] erzeugen.[br][/size][size=85][size=85][color=#0C343D][i][b]DARBOUX Cycliden[/b][/i][/color][/size] sind die räumliche Fortsetzung von speziellen ebenen Kurven: den [color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color] in der [br]um [math]\infty[/math] ergänzten [b]GAUSS[/b]schen Zahlenebene [math]\mathbb{C}[/math].[br]Die Klasse der Flächen, welche [/size][size=85][size=85][size=85][color=#0C343D][i][b]DARBOUX Cycliden[/b][/i][/color][/size][/size] darstellen, ist invariant unter [color=#0000ff][i][b]räumlichen[/b][/i][/color] [color=#0000ff][i][b]Möbiustransformationen[/b][/i][/color].[br]Die Klasse der [color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color] ist invariant unter [color=#0000ff][i][b]ebenen Möbiustransformationen[/b][/i][/color].[br][br]Im Folgenden soll kurz und als Übersicht der Zusammenhang zwischen [/size][size=85][size=85][color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color][/size] und [/size][size=85][size=85][size=85][color=#0C343D][i][b]DARBOUX Cycliden[/b][/i][/color][/size][/size] [br]dargestellt werden. Dazu müssen einige [color=#0000ff][i][b]möbiusgeometrische[/b][/i][/color] Grundlagen ohne Begründungen zusammengetragen werden.[br][br][color=#4C1130][u][i][b]Lineare Vektorfelder in der Möbiusebene[/b][/i][/u][/color][br]In der [b]GAUSS[/b]schen Zahlenebene [math]\mathbb{C}[/math] nennen wir ein durch eine Differentialgleichung des folgenden Typs gegebenes Vektorfeld[br][/size][list][*][size=85][math]z'=c\cdot\left(z-f_1\right)\cdot\left(z-f_2\right)[/math] [/size][size=85]mit komplexen[/size] [math]c,f_1,f_2[/math] [size=85]ein [i][b]lineares Vektorfeld[/b][/i][/size]. [br][/*][/list][size=85]Die Integralkurven sind - abhängig von [math]c[/math] [br] - die [color=#ff0000][i][b]Kreise[/b][/i][/color] durch die beiden "[color=#00ff00][i][b]Brennpunkte[/b][/i][/color]" [math]f_1,f_2[/math], also das [color=#ff0000][b][i]elliptische Kreisbüschel[/i][/b][/color] durch [math]f_1,f_2[/math][br] - die dazu orthogonalen [color=#ff0000][i][b]Kreise[/b][/i][/color], also das [color=#ff0000][i][b]hyperbolische Kreisbüschel[/b][/i][/color] um [math]f_1,f_2[/math][br] - oder die Kurven, welche die [color=#ff0000][i][b]Kreise[/b][/i][/color] der beiden [color=#ff0000][i][b]Kreisbüschel[/b][/i][/color] jeweils unter [color=#6aa84f][i][b]konstantem[/b][/i][/color] Winkel schneiden; wie nennen diese [br] Kurven [color=#38761D][i][b]Loxodrome[/b][/i][/color] ("Winkelgleiche" nach [b]wikipedia[/b])[br]Fallen [math]f_1[/math] und [math]f_2[/math] zusammen, erhält man die [color=#ff0000][i][b]parabolischen Kreisbüschel[/b][/i][/color] durch den Berührpunkt [math]f_1=f_2[/math] als Lösungskurven.[br]Für den Spezialfall [math]f_1=0[/math] und [math]f_2=\infty[/math] ergeben sich die [color=#e06666][i][b]Ursprungsgeraden[/b][/i][/color], die [color=#ff0000][i][b]konzentrischen Kreise[/b][/i][/color] um 0 [br]und die [color=#38761D][i][b]logarithmischen Spialen[/b][/i][/color] um 0 als Lösungen.[br][br][color=#741B47][u][i][b]Quadratische Vektorfelder in der Möbiusebene[/b][/i][/u][/color][br]Gewöhnlich nennt man eine [i][b]Differentialgleichung[/b][/i] des folgenden Typs [i][b]elliptisch[/b][/i]:[br][/size][list][*][size=85] [math]\left(z'\right)^2=c\cdot\left(z-f_1\right)\cdot\left(z-f_2\right)\cdot\left(z-f_3\right)\cdot\left(z-f_4\right)[/math] mit komplexen [math]c,f_1,f_2,f_3,f_4[/math][/size][/*][/list][size=85]Wir nennen ein solches Vektorfeld [i][b]quadratisch[/b][/i]. Die Nullstellen [math]f_1,f_2,f_3,f_4[/math] erlauben wir uns als [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] zu bezeichnen.[br]Sind die 4 [/size][size=85][size=85][color=#00ff00][i][b]Brennpunkte[/b][/i][/color][/size] verschieden., so kann man aus ihnen auf 3 verschiedene Weisen 2 elliptische Kreisbüschel mit [br]diesen "[/size][size=85][size=85][color=#00ff00][i][b]Brennpunkte[/b][/i][/color][/size]" bilden. [br]Die Lösungskurven der [i][b]elliptischen Differentialgleichung[/b][/i] sind [color=#f1c232][i][b]Winkelhalbierende[/b][/i][/color] der [color=#ff0000][i][b]Kreise[/b][/i][/color] der beiden Büschel: [br]von den [/size][size=85][size=85][color=#00ff00][i][b]Brennpunkte[/b][/i][/color][/size] abgesehen gehen durch jeden Punkt der Ebene aus jedem [color=#ff0000][i][b]Kreisbüschel[/b][/i][/color] je ein Kreis.[br]Die Lösungskurven halbieren die Winkel zwischen den [color=#ff0000][i][b]Kreisen[/b][/i][/color].[br]Über die Form und die Art dieser Lösungskurve wissen wir nichts! Zumindest, wenn über die Lage der [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] [br]nichts weiter ausgesagt ist! [br]Komplex analytisch sind die Lösungsfunktionen [i][b]elliptische Funktionen[/b][/i]: [br]das sind [color=#ff00ff][i][b]dopplt-periodische[/b][/i][/color] [color=#900000][i][b]komplex-analytische[/b][/i][/color] Funktionen, die in [color=#980000][i][b]ge[/b][/i][/color][icon]/images/ggb/toolbar/mode_circle2.png[/icon][color=#980000][i][b]gebra[/b][/i][/color] leider nicht implementiert sind![/size]

[size=85][size=100][color=#00ff00][i][b]Konfokale[/b][/i][/color] [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color] als Lösungskurven [color=#980000][i][b]quadratischer Vektorfelder[/b][/i][/color][/size][br][br]Die [i][b]Lage[/b][/i] der [b]4[/b] [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] eines [/size][size=85][size=85][color=#980000][i][b]quadratischen Vektorfeldes[/b][/i][/color][/size] läßt sich mit Hilfe des [color=#ff00ff][i][b]komplexen Doppelverhältnisses[/b][/i][/color] [math]d[/math] [br]beschreiben. Das [color=#ff00ff][i][b]Doppelverhältnis[/b][/i][/color] [math]d[/math] ist abhängig von der Reihenfolge der [color=#00ff00][i][b]Punkte[/b][/i][/color]; [br]unabhängig von der Reihenfolge und aussagekräftiger ist die [b]absolute Invariante[/b] [math]J[/math] der [/size][size=85][size=85][b]4[/b] [color=#00ff00][i][b]Brennpunkte[/b][/i][/color][/size][br] - [math]J[/math] stimmt überein mit der [b]absoluten Invariante[/b] der [i][b]elliptischen Differentialgleichung[/b][/i].[br]Dazu das Kapitel [math]\hookrightarrow[/math] [url=https://www.geogebra.org/m/kCxvMbHb#chapter/168947]Lage von 4 Punkten[/url][br]Ist [math]J[/math] reell, so sind [color=#00ff00][i][b]konfokale[/b][/i][/color] [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color] Lösungen des [color=#980000][i][b]quadratischen Vektorfeldes[/b][/i][/color]! [br][/size][list][*][size=85][math]J>0[/math] : das [color=#ff00ff][i][b]Doppelverhältnis[/b][/i][/color] ist reell, die [b]4 [/b]verschiedenen [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] liegen auf einem [color=#ff0000][i][b]Kreis[/b][/i][/color]. [br]Die [color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color] sind 2-teilig. [br]Mit einer geeigneten [color=#0000ff][i][b]Möbiustransformation[/b][/i][/color] erhält man die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] [math]f,-f,\frac{1}{f},\frac{-1}{f};\; f>1[/math]. [br]Die [color=#ff7700][i][b]Quartiken[/b][/i][/color] sind [color=#BF9000][i][b]symmetrisch[/b][/i][/color] zu den [color=#BF9000][i][b]Koordinatenachsen[/b][/i][/color] und zum [color=#BF9000][i][b]Einheitskreis[/b][/i][/color].[/size][/*][*][size=85][math]0>J[/math] : bei geeigneter Reihenfolge ist [math]\left|d\right|=1[/math]. [br]Die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] liegen spiegelbildlich auf 2 [color=#ff0000][i][b]orthogonalen Kreisen[/b][/i][/color].[br]Die [color=#ff7700][i][b]Quartiken[/b][/i][/color] sind 1-teilig, mit einer geeigneten [/size][size=85][size=85][color=#0000ff][i][b]Möbiustransformation[/b][/i][/color][/size] sind [math]f,-f,\frac{i}{f},-\frac{i}{f};f\in\mathbb{R},f>1[/math] [br]die [i][b]Brennpunkte[/b][/i]. Die [color=#BF9000][i][b]Koordinatenachsen[/b][/i][/color] sind [color=#BF9000][i][b]Symmetrie-Achsen[/b][/i][/color].[/size][/*][*][size=85] Sonderfall [math]J=0[/math] und die [i][b]Brennpunkte[/b][/i] sind verschieden: sie besitzen [color=#0000ff][i][b]harmonische Lage[/b][/i][/color].[br]Lösungskurven sind [color=#00ff00][i][b]konfokale[/b][/i][/color] 2-teilige [color=#ff7700][i][b]Quartiken[/b][/i][/color], und im 45°-Winkel dazu [color=#00ff00][i][b]konfokale[/b][/i][/color] 1-teilige [color=#ff7700][i][b]Quartiken[/b][/i][/color].[/size][/*][*][size=85]Sonderfall [math]J=-1[/math]: [color=#BF9000][i][b]Tetraederfall[/b][/i][/color] - die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] sind auf der [color=#ff0000][i][b]Kugel[/b][/i][/color] die Ecken eines [color=#6aa84f][i][b]gleichseitigen Tetraeders[/b][/i][/color].[br]Lösungskurven sind 3 konfokale 1-teilige Quartikscharen, die sich unter Vielfachen von 30° schneiden.[/size][/*][*][size=85][math]J=0[/math], 2 der 4 [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] fallen zusammen: wählt man diesen als [math]\infty[/math], so sind [color=#00ff00][i][b]konfokale[/b][/i][/color] [color=#ff7700][i][b]Mittelpunktskegelschnitte[/b][/i][/color] Lösungskurven.[/size][/*][*][size=85][math]J=0[/math], ein [i][b]dreifacher[/b][/i] und ein einfacher [color=#00ff00][i][b]Brennpunkt[/b][/i][/color]: Lösungskurven sind [color=#ff7700][i][b]konfokale Parabeln[/b][/i][/color], [br]wenn man den 3-fachen [color=#00ff00][i][b]Brennpunkt[/b][/i][/color] als [math]\infty[/math] wählt.[/size][/*][*][size=85][math]J=0[/math], 2 doppelt-zählende bzw. ein 4-fach zählender [color=#00ff00][i][b]Brennpunkt[/b][/i][/color]: Lösungskurven sind doppelt-zählende [br][color=#ff0000][i][b]elliptisch/hyperbolische[/b][/i][/color] bzw. [color=#ff0000][i][b]parabolische Kreisbüschel[/b][/i][/color] als Grenzfälle von [color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color]![br][/size][/*][/list]

[table][tr][td] 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[/img] 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[/img][/td][/tr][tr][td] 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[/img][/td][td] 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[/img][/td][/tr][/table]

[i][b][color=#ff7700]Bizirkulare Quartiken[/color] auf der [color=#ff0000]Kugel[/color][/b][/i][br][br][size=85]Projiziert man eine [color=#ff7700][i][b]bizirkulare Quartik[/b][/i][/color] [color=#0000ff][i][b]stereographisch[/b][/i][/color] auf eine [color=#ff0000][i][b]Kugel[/b][/i][/color], so erhält man eine Kurve "[i][b]4.ter Ordnung 1.Art[/b][/i]"; [br]das sind - etwas geometrischer beschrieben - die Kurven, die entstehen, wenn man die [color=#ff0000][i][b]Kugel[/b][/i][/color] mit einer [color=#351C75][i][b]Quadrik[/b][/i][/color] schneidet.[br]Dazu das [math]\hookrightarrow[/math] [color=#980000][i][b]geogebrabook[/b][/i][/color] [url=https://www.geogebra.org/m/s2797fyc]Kugel-Kegelschnitte[/url] und die Aktivität [url=https://www.geogebra.org/m/mQgUFHZh#material/puPNa8gb]Kugel-Kegelschnitte[/url][br][br]Schneidet man eine [color=#38761D][i][b]DARBOUX Cyclide[/b][/i][/color] mit einer [color=#ff0000][i][b]Ebene[/b][/i][/color] oder einer [color=#ff0000][i][b]Kugel[/b][/i][/color], so erhält man eine [color=#ff7700][i][b]bizirkulare Quartik[/b][/i][/color], [br]bzw. den Schnitt der [color=#ff0000][i][b]Kugel[/b][/i][/color] mit einer [/size][size=85][size=85][color=#351C75][i][b]Quadrik[/b][/i][/color][/size].[br]Schaut man sich den Schnitt der [color=#0000ff][i][b]Einheitskugel[/b][/i][/color] mit der [/size][size=85][size=85][color=#38761D][i][b]Cyclide[/b][/i][/color][/size] im Applet in Richtung der Achsen an, so kann man [br]die zugehörigen [color=#351C75][i][b]Kegel[/b][/i][/color] oder [color=#351C75][i][b]Zylinder[/b][/i][/color] erahnen, welche dieselben Schnitte mit der [color=#ff0000][i][b]Kugel[/b][/i][/color] ergeben.[/size]