CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES FOR p = 2 SHIN HATTORI Abstract. Let p be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated Barsotti-Tate group of level n,

Source URL: www2.math.kyushu-u.ac.jp

CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES SHIN HATTORI Abstract. Let p > 2 be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated BarsottiTate group of level n, heigh

Source URL: www2.math.kyushu-u.ac.jp

• Algebra
• Abstract algebra
• Mathematics
• Group theory
• Divisor
• Morphism of schemes
• Vector bundle
• Sheaf
• Order
• Algebraic geometry
• Isomorphism theorem

ON A PROPERNESS OF THE HILBERT EIGENVARIETY AT INTEGRAL WEIGHTS: THE CASE OF QUADRATIC RESIDUE FIELDS SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field such that F is unramified over

Source URL: www2.math.kyushu-u.ac.jp

• Algebra
• Mathematics
• Abstract algebra
• Modular forms
• Field theory
• Analytic number theory
• Operator theory
• Algebraic geometry
• Eigenform
• P-adic modular form
• Elliptic curve
• Valuation

CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES FOR p = 2 SHIN HATTORI Abstract. Let p be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated Barsotti-Tate group of level n,

Source URL: www2.math.kyushu-u.ac.jp

• Algebra
• Abstract algebra
• Mathematics
• Ring theory
• Functions and mappings
• Algebraic number theory
• Matrix theory
• Unipotent
• Semilinear map
• Valuation ring
• Galois module
• Polar coordinate system

CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES FOR p = 2 SHIN HATTORI Abstract. Let p be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated Barsotti-Tate group of level n,

Source URL: www2.math.kyushu-u.ac.jp

• Algebra
• Abstract algebra
• Group theory
• Algebraic number theory
• Galois theory
• Frobenius group
• Galois module
• Order
• Free group
• Linear temporal logic

ON A PROPERNESS OF THE HILBERT EIGENVARIETY AT INTEGRAL WEIGHTS: THE CASE OF QUADRATIC RESIDUE FIELDS SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field such that F is unramified over

Source URL: www2.math.kyushu-u.ac.jp

• Algebra
• Mathematics
• Abstract algebra
• Operator theory
• Field theory
• Analytic number theory
• Modular forms
• Algebraic geometry
• Eigenform
• Elliptic curve
• Valuation
• Algebraic number field

RAMIFICATION CORRESPONDENCE OF FINITE FLAT GROUP SCHEMES OVER EQUAL AND MIXED CHARACTERISTIC LOCAL FIELDS SHIN HATTORI Abstract. Let p > 2 be a rational prime, k be a perfect field of characteristic p and K be a finite t

Source URL: www2.math.kyushu-u.ac.jp

• Algebra
• Abstract algebra
• Mathematics
• Algebraic structures
• Ring theory
• Linear algebra
• Commutative algebra
• Module theory
• Sheaf
• Ring
• Integral element
• Orthogonality

26 October 2015 KKE and NavVis to Form a Partnership for Indoor Mapping and Digitalization Services in Japan Kozo Keikaku Engineering Inc. (“KKE”- Head Office: Nakano-ku, Tokyo, President: Shota Hattori) announced

Source URL: www.kke.co.jp

• Software
• Digital media
• User interface techniques
• Communist Party of Greece
• Here
• Virtual reality
• Geographic information system

PDF Document

Source URL: www.hattori-cf.co.jp

Analysis of the effect of probiotics on shaping human gut microbiota Masahira HATTORI <> Center for Omics and Bioinformatics, The University of Tokyo

Source URL: hmpdacc.org

• Bacteria
• Microbiology
• Digestive system
• Bacteriology
• Lactobacillaceae
• Probiotics
• Firmicutes
• Gut flora
• Bifidobacterium
• Lactobacillus
• Lactobacillales
• Streptococcus thermophilus