1,113 research outputs found
Shuji, Ichiro, Sadako, Hisako, and Toshio
A photograph of the Saito family's relatives in Japan, including Ichiro and Toshio Saito, taken at a photo studio. They wear kimono. A photo from: Saito and Ogawa family yellow photo album (csudh_sai_3001), page 43
Semi-purity for cycles with modulus
In this paper, we prove a form of purity property for the = (P 1 , ∞)-invariant replacement h 0 (X) of the Yoneda object Ztr(X) for a proper modulus pair X = (X, X∞) over a field k, consisting of a smooth proper k-scheme and an effective Cartier divisor on it. As application, we prove the analogue in the modulus setting of Voevodsky’s fundamental theorem on the homotopy invariance of the cohomology of homotopy invariant sheaves with transfers, based on a main result of [20]. This plays an essential role in the development of the theory of motives with modulus, and among other things implies the existence of a homotopy t-structure on the category MDMeff (k) of Kahn-Saito-Yamazaki
John H. Francis Polytechnic High School track and field coach with four varsity team members
Photograph of John H. Francis Polytechnic High School track and field coach with four varsity team members. From left to righ: Dubley Washington, Thaddeus "Dodo" Rountree, Coach Betts, Shuji Munemura, Richard Johnson. James Osamu Saito notes read: Dodo Rountree 1939 Class B broke record __ the 220, tied the 100 mark, Shuji Munemura fastest Nisei in 1940, and Richard Johnson was killed in 1939? in Florida for trying on a cap. He refused to buy
Cell Deformability Drives Fluid-to-Fluid Phase Transition in Active Cell Monolayers
<p>Datasets and resource codes for the study Saito-Ishihara2023 entitled "Cell Deformability Drives Fluid-to-Fluid Phase Transition in Active Cell Monolayers"</p><p> </p>
Cell Deformability Drives Fluid-to-Fluid Phase Transition in Active Cell Monolayers
<p>Datasets and resource codes for the study Saito-Ishihara2024 entitled "Cell Deformability Drives Fluid-to-Fluid Phase Transition in Active Cell Monolayers"</p>
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RELATIVE CYCLES WITH MODULI AND REGULATOR MAPS
Let
be a separated scheme of finite type over a field
and
a non-reduced effective Cartier divisor on it. We attach to the pair
a cycle complex with modulus, those homotopy groups – called higher Chow groups with modulus – generalize additive higher Chow groups of Bloch–Esnault, Rülling, Park and Krishna–Levine, and that sheafified on
gives a candidate definition for a relative motivic complex of the pair, that we compute in weight
. When
is smooth over
and
is such that
is a normal crossing divisor, we construct a fundamental class in the cohomology of relative differentials for a cycle satisfying the modulus condition, refining El Zein’s explicit construction of the fundamental class of a cycle. This is used to define a natural regulator map from the relative motivic complex of
to the relative de Rham complex. When
is defined over
, the same method leads to the construction of a regulator map to a relative version of Deligne cohomology, generalizing Bloch’s regulator from higher Chow groups. Finally, when
is moreover connected and proper over
, we use relative Deligne cohomology to define relative intermediate Jacobians with modulus
of the pair
. For
, we show that
is the universal regular quotient of the Chow group of
-cycles with modulus.</jats:p
Circulatory responses to baroreflexes, Valsalva maneuver, coughing, swallowing, and nasal stimulation during acute cardiac sympathectomy by epidural blockade in awake humans
筑波大学University of Tsukuba博士(医学)Doctor of Philosophy in Medical Sciences1986Offprint. Originally published in: The journal of anesthesiology, v. 63, no. 5, pp. 500-508, 1985Joint author: Shuji DohiIncludes supplementary treatisesdoctoral thesi
Cancellation theorems for reciprocity sheaves
We prove cancellation theorems for reciprocity sheaves and cube-invariant
modulus sheaves with transfers of Kahn--Saito--Yamazaki, generalizing
Voevodsky's cancellation theorem for -invariant sheaves with
transfers. As an application, we get some new formulas for internal hom's of
the sheaves of absolute K\"ahler differentials.Comment: 68 pages, minor changes. To appear in Algebraic Geometr
Bertini theorems and Lefschetz pencils over discrete valuation rings, with applications to higher class field theory
We show the existence of good hyperplane sections for schemes over discrete valuation rings with good or (quasi-)semi-stable reduction, and the existence of good Lefschetz pencils for schemes with good reduction or ordinary quadratic reduction. As an application, we prove that the reciprocity map introduced for smooth projective varieties over local fields K by Bloch, Kato and Saito is an isomorphism after l-adic completion, if the variety has good or ordinary quadratic reduction and l not equal char(K)
Ramification theory of reciprocity sheaves, I, Zariski-Nagata purity
We prove a Zariski-Nagata purity theorem for the motivic ramification
filtration of a reciprocity sheaf. An important tool in the proof is a
generalization of the Kato-Saito reciprocity map from geometric global class
field theory to all reciprocity sheaves. As a corollary we obtain cut-by-curves
and cut-by-surfaces criteria for various ramification filtrations. In some
cases this reproves known theorems, in some cases we obtain new results.Comment: Final version, accepted for publication in Crell
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