COMPANY & ORIGIN

Latviski: Turn mathematics into
Latviski: software that works
Latviski: in the field.

Latviski: Finite Field is named after the mathematical structure known as a finite field. We organize complex conditions into consistent models and implement them as web and app systems people can use every day.

FOUNDED
Latviski: January 6, 2022
BASE
Latviski: Usa City, Oita Prefecture
FOCUS
Latviski: From mathematical models to web and apps
INTERACTIVE / PRIME FIELDF5
2 x 3 = 6F5: 1
Legal nameFinite Field, K.K.
Business focusLatviski: Mathematical systems development
Canonical pageLatviski: The new company profile is handled at /about/.

Latviski: For clarity, this demo shows prime fields Fp for prime p. General finite fields can also have p^n elements.

Mērķis

WHY WE EXIST

Latviski: Before building, make the problem solvable.

Latviski: Operational problems do not start as formulas. We first turn human judgment, exceptions, and implicit priorities into conditions and objectives that can be compared.

01 / OBSERVE

Latviski: Observe the field

Latviski: We collect decisions from spreadsheets, paper, conversations, and experienced staff. Exceptions and hidden priorities are part of the actual operation.

Latviski: INPUT / Current work
02 / MODEL

Latviski: Separate constraints and goals

Latviski: We separate hard constraints from indicators to improve, making contradictions and missing data visible before calculation.

Latviski: MODEL / Constraints and evaluation
03 / BUILD

Latviski: Implement a usable system

Latviski: We do not stop at a calculation result. Input, review, correction, and sharing are implemented as web and mobile apps.

Latviski: OUTPUT / Operating system
OUR PURPOSE

Latviski: We use mathematics to organize ambiguous judgment into systems that can be compared, explained, and used.

THE NAME

Latviski: Finite Field means a finite mathematical field.

Latviski: A finite field is a mathematical structure with a finite number of elements where addition, subtraction, multiplication, and division except by zero are defined. It is important in cryptography, error-correcting codes, and computer science.

DEFINITION / PLAIN LANGUAGE

Latviski: Limited elements. Consistent rules. Results that stay inside the set.

Latviski: In F5, the elements are 0, 1, 2, 3, and 4. After ordinary calculation, the remainder modulo 5 is used. That is why 2 × 3 becomes 1 rather than 6.

01Latviski: Finite elements

Latviski: The number of elements is a prime or a power of a prime.

02Latviski: Closed under operations

Latviski: Results return to elements in the same field.

03Latviski: Inverses exist

Latviski: Every nonzero element has a multiplicative inverse.

Latviski: Important

Latviski: This does not mean that business operations are literally finite fields. The connection here is a company metaphor for how we work.

INTERACTIVE / PRIME FIELD

Latviski: Try finite-field calculation

F5
Pirmskaitlis p
Operācija
0

Latviski: For clarity, this demo shows prime fields Fp for prime p. General finite fields can also have p^n elements.

FINITE RESOURCES

Latviski: See limited resources

Latviski: People, time, vehicles, machines, and budget. We search for plans that can actually run within real limits.

CONSISTENT RULES

Latviski: Make rules consistent

Latviski: We organize business rules including exceptions so contradictions and priorities can be reviewed.

REPRODUCIBLE RESULT

Latviski: Make results reproducible

Latviski: The path from inputs, constraints, and evaluation to the result should not depend only on one person’s intuition.

WHAT WE DO

Latviski: From mathematical models to business screens.

Latviski: We are not only a mathematical consulting team, and not only a general contract developer. We design the decision logic and the software used every day as one system.

01 / MODEL
MATHEMATICAL MODEL

Latviski: What must be kept and what should improve

Latviski: We organize constraints, objectives, priorities, exceptions, and feasibility.

01 / MODEL
02 / SOLVE
ALGORITHM

Latviski: Search and compare candidates

Latviski: Optimization, search, rules, and simulation are combined when appropriate.

02 / SOLVE
03 / BUILD
PRODUCT ENGINEERING

Latviski: Enter, adjust, and share in the field

Latviski: Web, iOS, Android, databases, permissions, and reports are implemented together.

03 / BUILD

OPERATING PRINCIPLES

Latviski: Be honest before being mathematical.

Latviski: We do not hide problems behind advanced terms or complex models. We separate what is unknown, not yet measured, and dependent on conditions.

01 / FIELD FIRST

Latviski: Start with field language

Latviski: We listen to actual work, decisions, and exceptions before applying terminology. A model is useful only when it explains the field.

Latviski: Field to conditions
02 / EXPLAIN

Latviski: Results with reasons

Latviski: We do not stop at “the AI decided.” We show why a plan was chosen and what could not be satisfied.

Latviski: Result to evidence
03 / VERIFY SMALL

Latviski: Verify small before growing

Latviski: Before production, we test the calculation on a small portion of real data. Reasons it cannot be solved are also findings.

Latviski: Hypothesis to verification
04 / USABLE

Latviski: Implement usability too

Latviski: We design for input, correction, smartphone use, and multilingual operation, not only calculation speed.

Latviski: Logic to adoption
WE SAYLatviski: Organize conditions and create comparable plans
WE SHOWLatviski: Inputs, constraints, evaluation, and unresolved points
WE DO NOT CLAIMLatviski: Absolutely no bugs or always one unique optimum

COMPANY JOURNEY

Latviski: Deepening from implementation strength into mathematics.

Latviski: Experience building business systems, mobile apps, and multilingual services connects to planning, assignment, search, and verification.

2022.01.06FOUNDATION
FOUNDATION

Latviski: Finite Field, K.K. established

Latviski: Established in Usa City, Oita Prefecture, with a foundation for planning, building, and operating web, app, and business systems.

BUILDIMPLEMENTATION
IMPLEMENTATION

Latviski: Complex operations into usable screens

Latviski: We have built systems that connect data and operations, including ordering, visit availability, and unmanned sales workflows.

NOWMATHEMATICAL SYSTEMS
MATHEMATICAL SYSTEMS

Latviski: Toward automation of planning and assignment

Latviski: Shift planning, visit scheduling, routing, production planning, and assignment matching are now presented as core mathematical-systems domains.

R&DVERIFY
VERIFY

Latviski: Researching ways to check correctness

Latviski: Theorem proving, formal verification, and inspectable calculation results are treated as research areas and clearly separated from production use.

COMPANY PROFILE

Finite Field, K.K.

Latviski: Based in Usa City, Oita Prefecture, we design and build mathematical models, algorithms, web systems, and mobile apps.

BASE / JAPANLatviski: Usa City, Oita Prefecture
FINITE FIELDLatviski: Usa City, Oita Prefecture
BASE / JAPAN

Latviski: From a regional base, we use software to address complex operational problems.

Latviski: Legal name
Finite Field, K.K. / 株式会社ファイナイトフィールド
Latviski: Japanese name
株式会社ファイナイトフィールド
Latviski: Address
879-0151 Oita, Usa, Miyaguma 550, Japāna
Latviski: Established
Latviski: January 6, 2022
Latviski: Capital
Latviski: JPY 3,000,000
Latviski: Officers
Pārstāvošais direktors Toshiya Kazuyoshi Vadītāja Yoshie Kazuyoshi Vadītājs Hikaru Ono
Latviski: Major client
Matsuhisa Japan Co., Ltd.
Latviski: Business domains
Latviski: Mathematical systems development Web and mobile app development Business systems and R&D
INFORMATION POLICY

Latviski: Only information aligned with official company facts is shown. Unconfirmed employee count, sales, certification status, and similar claims are not listed.

PAGE DATA REVIEWED / 2026.06

FAQ

Latviski: About the company and the name

Latviski: A short explanation of the relationship between a mathematical term and the actual service.

01Latviski: What is a finite field?

Latviski: A finite field is a mathematical structure with a finite number of elements. Addition, subtraction, multiplication, and division except by zero are defined, and the result stays inside the same set. This page visualizes prime fields Fp for prime p.

02Latviski: How does the name relate to business systems?

Latviski: It does not mean that business operations are literally finite fields. The name reflects how we work with limited resources, consistent rules, and reproducible results.

03Latviski: Can we start with a mathematical consultation only?

Latviski: Yes. We can begin by checking whether operational judgments, assignments, orders, and plans can be modeled. A small calculation prototype can verify the idea first.

04Latviski: Can you develop the actual system too?

Latviski: Yes. We design and build mathematical models, calculation logic, databases, web admin screens, and iOS and Android apps as one delivery path.

START WITH THE PROBLEM

Latviski: What does your team think through every time?

Latviski: Shifts, visits, routes, production, and assignments. We start from your current spreadsheets and rules to identify what can be modeled.