Atlas: Isospectral flat Klein's bottles by Ruslan Isangulov

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Geometry and Applications
March 13-16, 2000
Sobolev Institute of Mathematics of the Siberian Branch of the Russian Academy of Sciences and Novosibirsk State University
Novosibirsk, Russia

Organizers
Yu.G. Rushetnyak (Chair of Program Committee; Russia), V.V. Vershinin (Chair of Organizing Committee; Russia), A.A. Borisenko (Ukraine), Yu.D. Burago (Russia), V.M. Gol'dshtein (Israel), M.L. Gromov (France), I.G. Nikolaev (USA/Russia), S.P. Novikov (USA/Russia), A.V. Pogorelov (Ukraine), I.Kh. Sabitov (Russia)

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Isospectral flat Klein's bottles
by
Ruslan Isangulov
Novosibirsk State University

Abstract Ýòà ðàáîòà ñâÿçàíà ñî ñïåêòðîì îïåðàòîðà Ëàïëàñà-Áåëüòðàìè íà êîìïàêòíîì ðèìàíîâîì ìíîãîîáðàçèè. Áóäåì ãîâîðèòü, ÷òî äâà ìíîãîîáðàçèÿ M è M' èçîñïåêòðàëüíû, åñëè ñîáñòâåííûå çíà÷åíèÿ îïåðàòîðà Ëàïëàñà ìíîãîîáðàçèé M è M' ñîâïàäàþò. Î÷åâèäíî, ÷òî åñëè ìíîãîîáðàçèÿ èçîìåòðè÷íû, òî îíè èçîñïåêòðàëüíû. Â 1964 ãîäó Äæ. Ìèëíîð [3] ïðèâåë ïðèìåð 16-ìåðíûõ èçîñïåêòðàëüíûõ íåèçîìåòðè÷íûõ òîðîâ, à â 1988 ãîäó Ð. Áðóêñ [1] äîêàçàë, ÷òî äâà ïëîñêèõ òîðà èçîñïåêòðàëüíû òîãäà è òîëüêî òîãäà, êîãäà îíè èçîìåòðè÷íû.

Â íàñòîÿùåå âðåìÿ èçâåñòíû ïðèìåðû èçîñïåêòðàëüíûõ íåèçîìåòðè÷íûõ ïîâåðõíîñòåé ðîäà g, ãäå g >= 4. Äëÿ ïîâåðõíîñòåé ðîäà g, ãäå g=2 èëè g=3, âîïðîñ îá èçîìåòðè÷íîñòè èçîñïåêòðàëüíûõ ïîâåðõíîñòåé ïîêà îñòàåòñÿ îòêðûòûì. Â äàííîé ðàáîòå äîêàçûâàåòñÿ ñëåäóþùèé ðåçóëüòàò:

Òåîðåìà. Äâå ïëîñêèå áóòûëêè Êëåéíà èçîñïåêòðàëüíû òîãäà è òîëüêî òîãäà, êîãäà îíè èçîìåòðè÷íû.

Äëÿ äîêàçàòåëüñòâà òåîðåìû ìû èñïîëüçóåì ôóíêöèþ ñëåäà tr(H_K) = \int_K H_K(x, x, t)dK, ãäå K - ïëîñêàÿ áóòûëêà Êëåéíà, H_K(x, y, t) - ôóíäàìåíòàëüíîå ðåøåíèå óðàâíåíèÿ òåïëîïðîâîäíîñòè íà ìíîãîîáðàçèè K, dK - ýëåìåíò îáúåìà, êîòîðàÿ, â ñèëó ([2], ñòð.187), â òî÷íîñòè îïðåäåëÿåòñÿ ñïåêòðîì ìíîãîîáðàçèÿ K.Â ðàáîòå ïîëó÷åíà ÿâíàÿ ôîðìóëà äëÿ ôóíêöèè ñëåäà:

tr(H_K)= area(K)
4 \pi t

å
l in \Lambda
e^-|l|²/4t + (\pi t )^1/2|l₁|
4\pi t

å
m in Z
e^{-(m+1/2)²|l₁|²/4t},

ãäå area(K) - ïëîùàäü áóòûëêè Êëåéíà, \Lambda = { l = m l₁+n l₂, m, n in Z} - ðåøåòêà äëÿ òîðà, íàêðûâàþùåãî áóòûëêó Êëåéíà, ãäå ìíîæåñòâî, íàòÿíóòîå íà ëèíåéíî íåçàâèñèìûå âåêòîðà l₁/2 è l₂, îáðàçóåò ôóíäàìåíòàëüíîå ìíîæåñòâî áóòûëêè Êëåéíà K. Äëÿ äîêàçàòåëüñòâà èçîìåòðè÷íîñòè èçîñïåêòðàëüíûõ áóòûëîê Êëåéíà ìû èñïîëüçóåì òîò ôàêò, ÷òî ïî ôóíêöèè tr(H_K) ìîæíî îäíîçíà÷íî îïðåäåëèòü ïëîùàäü áóòûëêè Êëåéíà area(K) è äëèíû |l₁| è |l₂|.

Âûðàæàþ áëàãîäàðíîñòü íàó÷íîìó ðóêîâîäèòåëþ À.Ä. Ìåäíûõ çà ïîñòàíîâêó çàäà÷è è äàëüíåéøåå åå îáñóæäåíèå, à òàêæå À.Â. Ïàâëîâó çà öåííûå çàìå÷àíèÿ.

References

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Brooks, R. Constructing isospectral manifolds. Amer.Math.Monthly 95 (1988), 823-839.

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Buser, P.Geometry and spectra of compact Riemann surfaces.Progress in Mathematics, v. 106, Birkhauser, Boston-Basel-Berlin.

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Milnor, J Eigenvalues of the Laplace operator on certain manifolds, Proc.Nat.Acad.Sci. U.S.A. 51 (1964), 542.

Date received: February 14, 2000