[過去ログ] 純粋・応用数学・数学隣接分野(含むガロア理論)13 (1002レス)
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922: 2023/07/30(日)19:25 ID:Rf2iGg9G(1/8) AAS
>>601
>一つの箱に確率pで数が入れられるとする。また、一つの同値類内で考える
>lemma 3:確率p=0で、可算有限長さ一点コンパクト化の数列 sN+において、決定番号ωの確率1、ω未満(つまり有限n)の確率0
>lemma 4:確率p=0で、可算有限長さの数列 sN = (s1,s2,s3 ,・・・)において、決定番号ω未満(つまり有限n)の確率0
>証明:lemma 3で、sN+からωを除いて、数列 sNとして適用すればよい
lemma3は正しいが、lemma4は誤り
sN+からΩを除いたら、決定番号ωとなる場合が存在しなくなる
省1
923: 2023/07/30(日)19:30 ID:IpiBUMr/(13/18) AAS
>>921
文盲に分からないのは当たり前
924: 2023/07/30(日)20:02 ID:Rf2iGg9G(2/8) AAS
p=0とする
nを自然数としたとき、snで尻尾同値な2列について、
n番目の項を除いても、s(n-1)で尻尾同値となる確率は0
sN+で尻尾同値な2列について、
ω番目の項を除いても、sNで尻尾同値となる確率は0
ただ、有限列の場合と異なるのは、
s(n-1)では、決定番号n-1となる確率は1だが
省10
925: 2023/07/30(日)20:07 ID:Rf2iGg9G(3/8) AAS
>>417
>”固定”なるものは確率論でいう一つの試行でしかない
箱入り無数目の確率計算ではそうなっていないので誤り
正解は>>632の言う通り
「 1〜100 のいずれかをランダムに選ぶ」
926: 2023/07/30(日)20:21 ID:Rf2iGg9G(4/8) AAS
「箱入り無数目」で、箱の中身は各試行ごとに入れ替えたりしない、とすれば
「箱の中身の確率分布」は全く考える必要がない
(実際、確率計算はそのような前提の上でなされている)
また、箱の数を非可算個にしてしまえば、100列用意する必要もない
ただ、非可算個の箱の中から1個選べばいい
箱の番号(注:中身に非ず)は[0,1]の実数とする
これで確率測度は定まった
省4
927(2): 2023/07/30(日)20:34 ID:Rf2iGg9G(5/8) AAS
関数 f,g∈(0,1]→X について
ある正の実数ε>0が存在して
0<x<=εなら、f(x)=g(x)となるとき
fとgは近傍同値とする
その場合、任意の近傍同値類の関数fについて、同値類の代表関数Fとの間に
ある正の実数Ε>0が存在して、0<x<=Εなら、f(x)=F(x)となる
したがって、いかなる関数fについても、
省4
928: 2023/07/30(日)20:37 ID:Rf2iGg9G(6/8) AAS
>>927で、Xはいかなる集合でもよい、というのがポイント
(自明でない問題とするためには、Xは2個以上の要素を持つとすればいい)
929: 2023/07/30(日)20:38 ID:Rf2iGg9G(7/8) AAS
>>927で、Xはいかなる集合もよい、というのがポイント
(自明でない問題とするためには、Xは2個以上の要素を持つとすればいい)
930: 2023/07/30(日)20:42 ID:Rf2iGg9G(8/8) AAS
今宵はこれまで
931(2): 2023/07/30(日)21:19 ID:esnUGRo8(10/11) AAS
結局724は問題の体をなしていないことが分かった
932: 2023/07/30(日)21:24 ID:IpiBUMr/(14/18) AAS
>>931
負け惜しみ乙
933(1): 2023/07/30(日)21:36 ID:2UJHJvqn(7/7) AAS
>>931
>結局724は問題の体をなしていないことが分かった
ご苦労さまです
スレ主です
724の出題者が、何にも分かってないってことでは、ないでしょうか?w
934(1): 2023/07/30(日)21:43 ID:esnUGRo8(11/11) AAS
こういう結論でよいようですね
935: 2023/07/30(日)21:50 ID:IpiBUMr/(15/18) AAS
>>934
問題の体をなしてないことにすれば自尊心保てるよねw
936: 2023/07/30(日)21:52 ID:IpiBUMr/(16/18) AAS
>>933
サルは誤答してるよね>>741
「問題の体をなしてない(キリッ)」にシレっと乗っかろうとしてるけどさw
やはりサル知恵だねw
937: 2023/07/30(日)22:00 ID:IpiBUMr/(17/18) AAS
まあ「どんな実数を入れるかはまったく自由」の意味も分からない方にとっては問題の体をなしてないのでしょうw
ご自分が理解できる・解ける問題じゃないと問題の体をなしてないようですねw
938(1): 2023/07/30(日)22:24 ID:IpiBUMr/(18/18) AAS
0897132人目の素数さん
2023/07/30(日) 08:34:02.46ID:esnUGRo8
>>895
例えば
n番目の箱にn回サイコロを振って出た目の数を入れる
というのは
許されるのかどうか
省10
939: 2023/07/31(月)01:15 ID:Cgy3PWyO(1) AAS
>>920
丸めて蕎麦屋酒と読み替える語彙も無いのか此のガキ爺は
(𓁹‿𓁹)ニチャァ
940(1): 2023/07/31(月)05:54 ID:jznoxopE(1/50) AAS
>>938
わかったからもういい
941: 2023/07/31(月)07:45 ID:KGw9oDo5(1) AAS
>>940
何を分かったの?
942: 2023/07/31(月)08:29 ID:jznoxopE(2/50) AAS
おまえの言いたいことは分かった
943(1): 2023/07/31(月)08:43 ID:4Almmw4D(1/10) AAS
本スレは以下のスレに統合します
ガロア第一論文と乗数イデアル他関連資料スレ5
2chスレ:math
944(1): 2023/07/31(月)08:43 ID:4Almmw4D(2/10) AAS
本スレは以下のスレに統合します
ガロア第一論文と乗数イデアル他関連資料スレ5
2chスレ:math
945(1): 2023/07/31(月)08:43 ID:4Almmw4D(3/10) AAS
本スレは以下のスレに統合します
ガロア第一論文と乗数イデアル他関連資料スレ5
2chスレ:math
946: 2023/07/31(月)08:45 ID:4Almmw4D(4/10) AAS
>>943-945
947: 2023/07/31(月)08:47 ID:4Almmw4D(5/10) AAS
現在数学板に複数ある「SET Aスレ」は統合化いたします
948: 2023/07/31(月)08:48 ID:4Almmw4D(6/10) AAS
御協力お願い致します
949: 2023/07/31(月)08:49 ID:4Almmw4D(7/10) AAS
現在数学板に複数ある「SET Aスレ」は一つに統合いたします
950: 2023/07/31(月)08:50 ID:4Almmw4D(8/10) AAS
御協力お願い致します
951(1): 2023/07/31(月)08:53 ID:jznoxopE(3/50) AAS
では埋めよう
952: 2023/07/31(月)08:54 ID:4Almmw4D(9/10) AAS
>>951 よろしくお願いします
953: 2023/07/31(月)08:57 ID:4Almmw4D(10/10) AAS
「SET Aスレ」統合化に御協力お願いします
SET A氏設立のスレッドは複数ありますが、
どこでも同様の展開となっているため
様々な無駄が発生しております
スレを1つにすることで無駄を削減できます
何卒、統合化に御協力お願いいたします
954: 2023/07/31(月)09:05 ID:jznoxopE(4/50) AAS
Abstract. A theorem asserting the existence of proper holomorphic maps
with connected fibers to an open subset of C
N from a locally pseudoconvex
bounded domain in a complex manifold will be proved under the negativity
of the canonical bundle on the boundary. Related results of Takayama on
the holomorphic embeddability and holomorphic convexity of pseudoconvex
manifolds will be extended under similar curvature conditions.
955: 2023/07/31(月)09:08 ID:jznoxopE(5/50) AAS
Abstract. A theorem asserting the existence of
proper holomorphic maps
with connected fibers to an open subset of C^N
from a locally pseudoconvex bounded domain
in a complex manifold will be proved under the
negativity of the canonical bundle on the
boundary. Related results of Takayama on
省3
956: 2023/07/31(月)09:13 ID:jznoxopE(6/50) AAS
This is a continuation of [Oh-5] where the following
was proved among other things.
Theorem 1.1. Let M be a complex manifold and let Ω be a proper
bounded domain in M with C^2-smooth pseudoconvex boundary
∂Ω. Assume that M admits a K¨ahler metric and the
canonical bundle K_M of M admits a fiber metric
whose curvature form is negative on a
省9
957: 2023/07/31(月)09:17 ID:jznoxopE(7/50) AAS
More precisely, the proof is an application of the finite-dimensionality
of L^2 ¯∂-cohomology groups on M with coefficients in line bundles whose
curvature form is positive at infinity. Recall that the idea of exploiting
the finite-dimensionality for producing holomorphic sections originates
in a celebrated paper [G] of Grauert. Shortly speaking, it amounts to
finding infinitely many linearly independent C^∞ sections s1, s2, . . . of
the bundle in such a way that some nontrivial linear combination of
省3
958: 2023/07/31(月)09:19 ID:jznoxopE(8/50) AAS
訂正
¯∂s1,¯∂s2, . . . , say ΣN_{k=1} c_k¯∂sk(ck ∈ C), is equal to ¯∂u for some u which
is more regular than ΣN_{k=1} cksk.
959: 2023/07/31(月)09:20 ID:jznoxopE(9/50) AAS
This works if one can attach mutually
different orders of singularities to sk for instance as in [G] where the
holomorphic convexity of strongly pseudoconvex domains was proved.
960: 2023/07/31(月)09:24 ID:jznoxopE(10/50) AAS
Although such a method does not directly work for the weakly pseudoconvex
cases, the method of solving the ¯∂-equation with L^2
estimates is available to produce a nontrivial holomorphic section of the form
Σ^N_{k=1} cksk −u by appropriately estimating u. More precisely speaking,
instead of specifying singularities of sk, one finds a solution u which
has more zeros than Σ^N_{k=1} ck¯∂sk. For that, finite-dimensionality of the
L^2 cohomology with respect to singular fiber metrics would be useful.
961: 2023/07/31(月)09:26 ID:jznoxopE(11/50) AAS
However, this part of analysis does not seem to be explored a lot. For
instance, the author does not know whether or not Nadel’s vanishing theorem
as in [Na] can be extended as a finiteness theorem with
coefficients in the multiplier ideal sheaves of singular fiber metrics under
an appropriate positivity assumption of the curvature current near infinity.
962: 2023/07/31(月)09:28 ID:jznoxopE(12/50) AAS
So, instead of analyzing the L^2
cohomology with respect to singular
fiber metrics, we shall avoid the singularities by simply removing them
from the manifold and consider the L^2
cohomology of the complement, which turns out to have similar
finite-dimensionality property because
of the L^2 estimate on complete Hermitian manifolds. Such an argument
省4
963: 2023/07/31(月)09:41 ID:jznoxopE(13/50) AAS
Once one has infinitely many linearly independent holomorphic sections
of a line bundle L → M, one can find singular fiber metrics of L
by taking the reciprocal of the sum of squares of the moduli of local
trivializations of the sections. Very roughly speaking, this is the main
trick to derive the conclusion of Theorem 0.1 from K_M|∂Ω < 0.
964: 2023/07/31(月)09:43 ID:jznoxopE(14/50) AAS
In fact,
for the bundles L with L|∂Ω > 0, the proof of
dim H^{n,0}(Ω, L^m) = ∞ for
m >> 1 will be given in detail here (see Theorem 1.4, Theorem 1.5 and
Theorem 1.6). The rest is acturally similar as in the case K_M < 0.
We shall also generalize the following theorems of Takayama.
965: 2023/07/31(月)09:45 ID:jznoxopE(15/50) AAS
Theorem 1.2. (cf. [T-1]) Weakly 1-complete manifolds with positive
line bundles are embeddable into CP^N
(N >> 1).
Theorem 1.3. (cf. [T-2]) Pseudoconvex manifolds with negative canonical bundles
are holomorphically convex.
966: 2023/07/31(月)09:58 ID:jznoxopE(16/50) AAS
Let M be a complex manifold. We shall say that M is a C^k
pseudoconvex manifold if M is equipped with a C^k plurisubharmonic
exhaustion function, say φ. C^∞ (resp. C^0) pseudoconvex manifolds are
also called weakly 1-complete (resp. pseudoconvex) manifolds. The
sublevel sets {x; φ(x) < c} will be denoted by Mc.
Theorem 0.2 and Theorem 0.3 are respectively a generalization of
Kodaira’s embedding theorem and that of Grauert’s characterization
省1
967: 2023/07/31(月)09:59 ID:jznoxopE(17/50) AAS
Our intension here is to draw similar conclusions by assuming the
curvature conditions only on the complement of a compact subset of
the manifold in quetion
968: 2023/07/31(月)10:01 ID:jznoxopE(18/50) AAS
Theorem 0.2 will be generalized as follows.
Theorem 1.4. Let (M, φ) be a connected and noncompact C^2
pseudoconvex manifold which admits a holomorphic Hermitian line bundle
whose curvature form is positive on M - Mc.
Then there exists a holomorphic embedding of M - Mc into CP^N which
extends to M meromorphically.
969: 2023/07/31(月)10:02 ID:jznoxopE(19/50) AAS
Theorem 0.3 will be extended to
Theorem 1.5. A C^2 pseudoconvex manifold (M, φ) is holomorphically
convex if the canonical bundle is negative outside a compact set.
This extends Grauert’s theorem asserting that strongly 1-convex
manifold are holomorphically convex.
970: 2023/07/31(月)10:05 ID:jznoxopE(20/50) AAS
The proofs will be done by combining the method of Takayama with
an L^2 variant of the Andreotti-Grauert theory [A-G] on complete Hermitian manifolds whose special form needed here will be recalled in§3.
In §4 we shall extend Theorem 0.4 for the domains Ω as in Theorem
0.1. Whether or not Ω in Theorem 0.1 is holomorphically convex is
still open.
971: 2023/07/31(月)10:05 ID:jznoxopE(21/50) AAS
The proof of the desired improvement of Theorem 0.1 will rely on
the following.
972: 2023/07/31(月)10:10 ID:jznoxopE(22/50) AAS
Theorem 2.1. (cf. [Oh-4, Theorem 0.3 and Theorem 4.1]) Let M be
a complex manifold, let Ω ⊊ M be a relatively compact pseudoconvex
domain with a C^2-smooth boundary and let B be a holomorphic line
bundle over M with a fiber metric h whose curvature form is positive
on a neighborhood of ∂Ω. Then there exists a positive integer m0 such
that for all m ≥ m0
dimH^{0,0}(Ω, B^m) = ∞ and that, for any compact
省4
973: 2023/07/31(月)10:12 ID:jznoxopE(23/50) AAS
We shall give the proof of Theorem 1.1 in this section for the convenience of the reader, after recalling the basic L^2
estimates in a general setting.
974: 2023/07/31(月)10:13 ID:jznoxopE(24/50) AAS
Let (M, g) be a complete Hermitian manifold of dimension n and let
(E, h) be a holomorphic Hermitian vector bundle over M.
Let C^{p,q}(M, E) denote the space of E-valued C^∞ (p, q)-forms on M
and letC^{p,q}_0(M, E) = {u ∈ C^{p,q}(M, E); suppu is compact}.
975: 2023/07/31(月)10:15 ID:jznoxopE(25/50) AAS
Given a C^2
function φ : M → R, let L^{p,q}_{(2),φ}(M, E) (= L^{p,q}_{(2),g,φ}(M, E))
be the space of E-valued square integrable measurable (p, q)-forms on
M with respect to g and he^{−φ}
.
976: 2023/07/31(月)10:17 ID:jznoxopE(26/50) AAS
The definition of L^{p,q}_{(2),φ}(M, E) will be
naturally extended for continuous metrics and continuous weights.
977: 2023/07/31(月)10:27 ID:jznoxopE(27/50) AAS
Recall that L^{p,q}_{(2),φ}(M, E) is identified with the completion of
C^{p,q}_0(M, E)
with respect to the L^2 norm
||u||φ := (∫_Me^{−φ}|u|^2_{g,h}dVg)1/2.
Here dVg := 1/n!ω^n
for the fundamental form ω = ω_g of g.
978: 2023/07/31(月)10:29 ID:jznoxopE(28/50) AAS
More explicitly, when E is given by a system of transition functions eαβ with
respect to a trivializing covering {Uα} of M and h is given as a system
of C∞ positive definite Hermitian matrix valued functions hα on Uα satisfying hα =t
eβαhβeβα on Uα ∩ Uβ, |u|2
g,hdVg is defined by tuαhα ∧ ∗uα,
where u = {uα} with uα = eαβuβ on Uα ∩ Uβ and ∗ stands for the
Hodge’s star operator with respect to g. We put ∗¯u = ∗u so that
省1
979: 2023/07/31(月)10:30 ID:jznoxopE(29/50) AAS
Let us denote by ¯∂ (resp. ∂) the complex exterior derivative of
type (0, 1) (resp. (1, 0)). Then the correspondence uα 7→ ¯∂uα defines
a linear differential operator ¯∂ : C
p,q(M, E) → C
p,q+1(M, E). The
Chern connection Dh is defined to be ¯∂ + ∂h, where ∂h is defined by
uα 7→ h
省31
980: 2023/07/31(月)10:32 ID:jznoxopE(30/50) AAS
Θ > 0 (resp. ≥0) for an E^∗ ⊗ E-valued (1,1)-form Θ will mean the positivity (resp.
semipositivity) in this sense.
981: 2023/07/31(月)10:32 ID:jznoxopE(31/50) AAS
Whenever there is no fear of confusion, as well as the Levi form ∂¯∂φ
of φ, Θ_h will be identified with a Hermitian form along the fibers of
E ⊗ TM, where TM stands for the holomorphic tangent bundle of M.
982: 2023/07/31(月)10:33 ID:jznoxopE(32/50) AAS
By an abuse of notation, ¯∂ (resp. ∂he−φ ) will also stand for the maximal closed extension of ¯∂|C
p,q
0
(M,E)
(resp. ∂he−φ |C
p,q
0
省32
983: 2023/07/31(月)10:34 ID:jznoxopE(33/50) AAS
We put
H
p,q
(2),φ
(M, E)(= H
p,q
(2),g,φ
省27
984: 2023/07/31(月)10:34 ID:jznoxopE(34/50) AAS
Let Λ = Λg denote the adjoint of the exterior multiplication by ω.
Then Nakano’s formula
(2.2) ¯∂
¯∂
∗ + ¯∂
∗ ¯∂ − ∂h∂
∗ − ∂
省24
985: 2023/07/31(月)10:35 ID:jznoxopE(35/50) AAS
Here (u, w)φ stands for the inner product of u and v with respect to
(g, he−φ
). The following direct consequence of (1.3) is important for
our purpose.
986: 2023/07/31(月)10:36 ID:jznoxopE(36/50) AAS
Proposition 2.1. Let M, E, g, h and φ be as above. Assume that there
exists a compact set K ⊂ M such that dωg = 0 holds on M \ K. Then
there exist a compact set K′
containing K and a constant C such that
K′ and C do not depend on the choice of φ and
(
√
省23
987: 2023/07/31(月)10:37 ID:jznoxopE(37/50) AAS
From Proposition 1.1 one infers
988: 2023/07/31(月)10:37 ID:jznoxopE(38/50) AAS
Proposition 2.2. Let (M, E, g, h, φ, K) and (K′
, C) be as above. Assume moreover that one can find a constant C0 > 0 such that C0(Θh +
IdE ⊗∂
¯∂φ)−IdE ⊗g ≥ 0 holds on M \K. Then there exists a constant
C
′ depending only on C, K′ and C0 such that
kuk
省24
989: 2023/07/31(月)10:38 ID:jznoxopE(39/50) AAS
By a theorem of Gaffney, the estimate in Proposition 1.2 implies the
following.
Proposition 2.3. In the situation of Proposition 1.2,
kuk
2
φ ≤ C
′
省23
990: 2023/07/31(月)10:38 ID:jznoxopE(40/50) AAS
Recall that the following was proved in [H] by a basic argument of
functional analysis.
991: 2023/07/31(月)10:39 ID:jznoxopE(41/50) AAS
Theorem 2.2. (Theorem 1.1.2 and Theorem 1.1.3 in [H]) Let H1 and
H2 be Hilbert spaces and let T : H1 → H2 be a densely defined closed
operator. Let H3 be another Hilbert space and let S : H2 → H3 be a
densely defined closed operator such that ST = 0. Then a necessary
and sufficient condition for the ranges RT , RS of T, S both to be closed
is that there exists a constant C such that
(2.4) kgkH2 ≤ C(kT
省13
992: 2023/07/31(月)10:40 ID:jznoxopE(42/50) AAS
Hence we obtain
993: 2023/07/31(月)10:40 ID:jznoxopE(43/50) AAS
Theorem 2.3. In the situation of Proposition 1.2, dimH
n,q
(2),φ
(M, E) <
∞ and H n,q
φ
(M, E) ∼= H
省3
994: 2023/07/31(月)10:41 ID:jznoxopE(44/50) AAS
It is an easy exercise to deduce from Theorem 1.3 that every strongly
pseudoconvex manifold is holomorphically convex (cf. [G] or [H]). We
are going to extend this application to the domains with weaker pseudoconvexity.
995: 2023/07/31(月)10:41 ID:jznoxopE(45/50) AAS
For any Hermitian metric g on M, a C
2
function ψ : M → R is called
g-psh (g-plurisubharmonic) if g + ∂
¯∂ψ ≥ 0 holds everywhere.
Then Theorem 1.3 can be restated as follows.
996: 2023/07/31(月)10:42 ID:jznoxopE(46/50) AAS
Theorem 2.4. Let (M, g) be an n-dimensional complete Hermitian
manifold and let (E, h) be a Hermitian holomorphic vector bundle over
M. Assume that there exists a compact set K ⊂ M such that
Θh − IdE ⊗ g ≥ 0 and dωg = 0 hold on M \ K. Then, for any g-psh
function φ on M and for any ε ∈ (0, 1),
dim H
n,q
省7
997: 2023/07/31(月)10:43 ID:jznoxopE(47/50) AAS
§2 Infinite dimensionality and bundle convexity theorems
By applying Theorem 1.4, we shall show at first the following.
Theorem 2.5. Let (M, E, g, h) be as in Theorem 1.4 and let xµ (µ =
1, 2, . . .) be a sequence of points in M without accumulation points.
Assume that there exists a (1 − ε)g-psh function φ on M \ {xµ}
∞
µ=1 for
省7
998: 2023/07/31(月)10:43 ID:jznoxopE(48/50) AAS
Proof. We put M′ = M \{xµ}
∞
µ=1 and let ψ be a bounded C
∞ ε
2
g-psh
function on M′
省51
999: 2023/07/31(月)10:44 ID:jznoxopE(49/50) AAS
Then take u ∈ L
n,0
(2),φ
(M′
, E)
satisfying ¯∂u = v and put s =
?cµsµ − u. Clearly s extends to a
省6
1000: 2023/07/31(月)10:45 ID:jznoxopE(50/50) AAS
This observation will be basic for the proofs of Theorems 0.4 and
0.5.
1001(1): 1001 ID:Thread(1/2) AAS
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