Mathematics in Robot Control for Theoretical and Applied Problems

Publikation: Bücher und AnthologienZeitschriftenhefteForschung

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Mathematics in Robot Control for Theoretical and Applied Problems. / Mercorelli, Paolo (Herausgeber*in); Sergiyenko, Oleg (Herausgeber*in); Tsymbal, Oleksandr (Herausgeber*in).
MDPI AG, 2024. (Mathematics; Band 12, Nr. 14).

Publikation: Bücher und AnthologienZeitschriftenhefteForschung

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Mercorelli P, (ed.), Sergiyenko O, (ed.), Tsymbal O, (ed.). Mathematics in Robot Control for Theoretical and Applied Problems. MDPI AG, 2024. (Mathematics; 14).

Bibtex

@book{803aa1825e9a43d0b4ada5f3bdd4fe42,
title = "Mathematics in Robot Control for Theoretical and Applied Problems",
abstract = "Technological development has not only boosted the use of mechanical systems for industrial uses but above all has made it possible for them to be used in areas and sectors unimaginable until a few years ago. Mechatronics is the neologism which now indicates in general modern robotic systems which are to be equipped with sophisticated electronic control devices. Such devices are capable of helping systems to achieve high performance and allowing their use and disparate aspects of our daily life. It is a synergy set which can radically change some aspects of the production world. A growing interest toward robots, a special class of mechanical systems, as well as fear and perplexity in relation to the impact that these systems have in the world of productivity, and then ultimately their social impact, has be witnessed in recent years. Future robotics represent a tremendous challenge in the field of mathematics because of the central role their control plays in the context of this field. In fact, robot control is one of the most important and challenging topics for mathematicians, engineers, physicians, and practitioners. Mathematical issues are the kernel of the design of control of movements and performance of robots. This Special Issue aims to collect the latest advancements of mathematical methods for solving not only theoretical but also applied problems of classical and also modern robot structures, such as robotic manipulators, walking robots, flexible robots, haptic robots, and any kind of old and new mechanisms with all possible tasks, in grasp, manipulation, and motion for any kind of their possible issues and applications.",
keywords = "Engineering, Mathematics",
editor = "Paolo Mercorelli and Oleg Sergiyenko and Oleksandr Tsymbal",
year = "2024",
month = jul,
language = "English",
series = "Mathematics",
publisher = "MDPI AG",
number = "14",
address = "Switzerland",

}

RIS

TY - BOOK

T1 - Mathematics in Robot Control for Theoretical and Applied Problems

A2 - Mercorelli, Paolo

A2 - Sergiyenko, Oleg

A2 - Tsymbal, Oleksandr

PY - 2024/7

Y1 - 2024/7

N2 - Technological development has not only boosted the use of mechanical systems for industrial uses but above all has made it possible for them to be used in areas and sectors unimaginable until a few years ago. Mechatronics is the neologism which now indicates in general modern robotic systems which are to be equipped with sophisticated electronic control devices. Such devices are capable of helping systems to achieve high performance and allowing their use and disparate aspects of our daily life. It is a synergy set which can radically change some aspects of the production world. A growing interest toward robots, a special class of mechanical systems, as well as fear and perplexity in relation to the impact that these systems have in the world of productivity, and then ultimately their social impact, has be witnessed in recent years. Future robotics represent a tremendous challenge in the field of mathematics because of the central role their control plays in the context of this field. In fact, robot control is one of the most important and challenging topics for mathematicians, engineers, physicians, and practitioners. Mathematical issues are the kernel of the design of control of movements and performance of robots. This Special Issue aims to collect the latest advancements of mathematical methods for solving not only theoretical but also applied problems of classical and also modern robot structures, such as robotic manipulators, walking robots, flexible robots, haptic robots, and any kind of old and new mechanisms with all possible tasks, in grasp, manipulation, and motion for any kind of their possible issues and applications.

AB - Technological development has not only boosted the use of mechanical systems for industrial uses but above all has made it possible for them to be used in areas and sectors unimaginable until a few years ago. Mechatronics is the neologism which now indicates in general modern robotic systems which are to be equipped with sophisticated electronic control devices. Such devices are capable of helping systems to achieve high performance and allowing their use and disparate aspects of our daily life. It is a synergy set which can radically change some aspects of the production world. A growing interest toward robots, a special class of mechanical systems, as well as fear and perplexity in relation to the impact that these systems have in the world of productivity, and then ultimately their social impact, has be witnessed in recent years. Future robotics represent a tremendous challenge in the field of mathematics because of the central role their control plays in the context of this field. In fact, robot control is one of the most important and challenging topics for mathematicians, engineers, physicians, and practitioners. Mathematical issues are the kernel of the design of control of movements and performance of robots. This Special Issue aims to collect the latest advancements of mathematical methods for solving not only theoretical but also applied problems of classical and also modern robot structures, such as robotic manipulators, walking robots, flexible robots, haptic robots, and any kind of old and new mechanisms with all possible tasks, in grasp, manipulation, and motion for any kind of their possible issues and applications.

KW - Engineering

KW - Mathematics

UR - http://www.scopus.com/inward/record.url?scp=85199871511&partnerID=8YFLogxK

M3 - Special Journal issue

AN - SCOPUS:85199871511

T3 - Mathematics

BT - Mathematics in Robot Control for Theoretical and Applied Problems

PB - MDPI AG

ER -