...
Đề tài: “SPIN and specifying and verifying in
concurrent systems, reactive systems”
Giảng viên: Đặng Đức Hạnh
Vũ Diệu Hương
Thành viên: Lê Đức Tiến
Nguyễn Lê Duẩn
SPIN and ... Analysis for Verifying Reactive
Systems”, 2.
SPIN and specifying and verifying of concurrent systems and reactive systems 1
TRƯỜNG ĐẠI HỌC CÔNG NGH...
... [LT] and the references
482 ALEXANDRU DIMCA AND STEFAN PAPADIMA
therein. Global polar curves in the study of the topology of polynomials is a
topic under intense investigations; see for instance ... localize at the origin of
n+1
in the standard way, see
[D1]. However, using geometric intuition, we find it easier to work with global
objects, and hence we adopt this viewpoint in the...
... end of my talk in Yau’s seminar, E. Klassen
MODULI SPACES OF SURFACES AND REAL STRUCTURES 591
and V. Kharlamov for a useful conversation, V. Kulikov and Sandro Manfre-
dini for pointing out some ... Observe that, given two points y,z of C, f
(y)=f
(z)ifand only if
z ∈ Ay and then the branching indices of y,z for f
are the same. On the other
hand, the branching index of y for f...
... Bergman and Szeg¨o kernels are determined by the finite jets of ρ,
dσ and dv at each boundary point. Thus, for a domain Ω with C
∞
defining
function ρ and the contact form θ = i(∂ρ−
∂ρ)on∂Ω, by taking ... heat kernel
can be expressed in terms of the curvature of the metric; by integrating the co-
efficients one obtains index theorems in various settings. For the Bergman and
Szeg¨o ker...
... the sum in (0.14) and compensating by adding the ζ-regularized value
outside the sum.
The same regularization can be obtained in a more elementary fashion by
summing the following generating series:
∞
i=1
∞
k=0
(−i ... from
the results of [12] and, more generally, from the line of research pursued in
532 A. OKOUNKOV AND R. PANDHARIPANDE
[11], [12]. Our interaction with S. Bloch...
... global normal
crossing union of four planes with five double lines and two E
3
points, P
123
and P
134
, both lying on the double line C
13
. Since the lines C
23
and C
34
(resp.
C
14
and C
12
) both ... E
ν
-point, and no other Zappatic singularity, the singular-
ities in codimension one being double lines.
Proof. (i) According to Remark 5.1 and Theorem 5.19, X is connected
in...
... OZSV
´
ATH, AND Z. SZAB
´
O
cylindrical-end manifold obtained by attaching cylinders R
−
×Y
0
and R
+
×Y
1
.
From a solution γ in M
loc
(W
∗
), we obtain paths ˇγ
0
: R
−
→B
σ
(Y
0
) and
ˇγ
1
: ... ξ is invariant under I;
MONOPOLES AND LENS SPACE SURGERIES
467
so bearing in mind the definition of the relation
s
∼, and using the additivity of
all the terms involved, we can reduce...
... the set of lines in
R
p
, parallel to some element of Θ and
not passing through 0.
The main result in this section is the following.
theorem 3.1. Let (T,A) be a locally constant integral uniform ... weakly mixing and every weakly mixing transformation is ergodic. A clas-
sical theorem states that any invertible measure-preserving transformation f
is weakly mixing if and only if it h...
... 303–311.
[40]
E. M. Stein, Singular Integrals and Differentiability Properties of Functions, Princeton
Math. Series 30, Princeton Univ. Press, Princeton, NJ, 1970.
[41]
———
, Harmonic Analysis, Princeton Math. ... all
derivatives rapidly decreasing in space; in practice, we can then extend the
formulae obtained here to more general situations by limiting arguments. We
begin by introducin...
... thimble over γ, and its boundary L
γ
is the vanishing cycle
associated to the critical point p
i
and to the arc γ.
Let γ
1
, ,γ
r
be a collection of arcs in C joining the reference point λ
0
to
the ... the
existence of a dualizing sheaf for smooth projective varieties. In this case the
dualizing sheaf is a line bundle and coincides with the sheaf of differential forms
Ω
n
X
of top de...