Abstract
The objective of this publication is the generalization of geometrically correct production of worm surfaces (e.g., turning, milling, and grinding) based on the results of kinematical geometry and toothing theory, the production geometry analysis of tools, and the mathematical defining of the geometric and connection relation. Our purpose is to be able to define every thread surface in one common system so that they could be produced in a modern manufacturing system.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Dudás I (1991) Manufacturing of helicoid surfaces in CAD/CAM system, International Conference on Motion and Power Transmissions, MPT '91. november 23–26. Japán, Hiroshima, pp.: 339–344
Kang SK, Ehmann KF, Lin C (1996) A CAD approach to helical groove machining—I. mathematical model and model solution. Int J Mach Tools Manuf 36(1):141–153
Dudás I (1988) Theory of production of helicoid surfaces, Academical Doctoral Dissertation /D.Sc./, Miskolc p. 250., Csavarfelületek gyártásának elmélete. Akadémiai doktori disszertáció, Miskolc p. 250
Bányai K (1977) Hengeres csigák gyártásgeometriája és ellenőrzése, Egyetemi doktori értekezés, Miskolc. Research Leader: Prof. Dr. Illés Dudás
Bodzás S (2014) Connection analysis of surfaces of conical worm, face gear and tool, Ph.D. dissertation, University of Miskolc p. 154, Research Leader: Prof. Dr. Illés Dudás, DOI 10.14750/ME.2014.006
Bercsey T, Horák P (2002) Modelling of the contact- and tribological conditions of spatial gearing. International Conference on Gears, March 13–15, 2002, Munich, Germany. VDI-Berichte Nr. 1665 pp. 91–105
Hegyháti J (1988) Untersuchugen zur Anwendung von Spiroidgetrieben. Diss. A. TU. Dresden
Litvin FL, Fuentes A (2004) Gear geometry and applied theory, Cambridge University Press, (ISBN 978 0 521 81517 8)
Balajti ZS (2007) Kinematikai hajtópárok gyártásgeometriájának fejlesztése, Ph.D. dissertation, University of Miskolc. Research Leader: Prof. Dr. Illés Dudás
Bányai K, Dudás I (2002) Analysis of the spiroid driving having new production geometry, Production Process and Systems, A publication of the University of Miskolc, Miskolc, volume 1, pp. 177–184
Dudás I (2007) Csigahajtások elmélete és gyártása, Budapest, Műszaki Könyvkiadó. (ISBN 978 963 16 6047 0)
Dudás I (2000) The theory and practice of worm gear drives. Penton Press, London, (ISBN 1 8571 8027 5)
Dudás I, Bodzás S, Dudás ISZ, Mándy Z (2012) Konkáv menetprofilú spiroid csigahajtópár és eljárás annak köszörüléssel történő előállítására, The day of the patent registration: 07.04., Patent number: 229 818
Dudás I, Bodzás S, Mándy Z (2013) Solving the pitch fluctuation problem during the manufacturing process of conical thread surfaces with lathe center displacement. Int J Adv Manuf Technol 69(5–8):1025–1031
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Dudás, I. The extension of the general mathematical model developed for helicoidal surfaces to the whole system of manufacturing technology and production geometry (ProMAT). Int J Adv Manuf Technol 86, 1557–1572 (2016). https://doi.org/10.1007/s00170-015-8233-5
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00170-015-8233-5