Abstract
This paper deals with the dimensional synthesis of the RSSR mechanism, also known as spatial four-bar linkage (R and S stand for revolute and spherical kinematic pairs respectively). To univocally describe the geometry of the RSSR mechanism a specific set of geometry parameters is necessary. Generally speaking, in a synthesis problem a subset of these parameters, defined as design parameters, is usually considered as assigned whereas the remaining ones, defined as design variables, have to be found by the synthesis procedure. That is, the goal of the synthesis procedure is to find the values of the design variables, while satisfying both functional requirements of the mechanism and constraints on the design parameters. In this paper each design parameter is assigned as variable within a given range rather than being assigned as a single value. In general, varying a design parameter means obtaining a different mechanism which has different functional performances as a consequence. This feature gives raise to a novel synthesis problem, which has not been treated in the literature yet. In particular, the RSSR mechanism synthesis presented in this paper takes the optimization of the force transmission as an objective function, while referring to a given range of values of each design parameter. In addition, prescribed constraints on given extreme angular positions for both the input and the output links, on the upper and lower bounds for the transmission ratio, and on the upper and lower bounds for the design variable values have to be satisfied. The synthesis problem, set as a constrained minimization problem, is solved numerically in two steps by means of a Genetic algorithm followed by a quasi-Newton algorithm. As an example of application, a dimensional synthesis of an RSSR mechanism used in a hand exoskeleton is reported.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Balli SS, Chand S (2002) Transmission angle in mechanisms (triangle in mech). Mech Mach Theory 37(2):175–195
Sutherland G, Roth B (1973) A transmission index for spatial mechanisms. J Eng Ind 95(2):589–597
Sutherland G (1981) Quality of motion and force transmission. Mech Mach Theory 16(3):221–225
Tsai MJ, Lee HW (1994) The transmissivity and manipulability of spatial mechanisms. J Mech Des 116(1):137–143
Chen C, Angeles J (2007) Generalized transmission index and transmission quality for spatial linkages. Mech Mach Theory 42(9):1225–1237
Nolle H (1969) Ranges of motion transfer by the R-G-G-R linkage. J Mech 4(2):145–157
Kazerounian K, Solecki R (1993) Mobility analysis of general bi-modal four bar linkages based on their transmission angle. Mech Mach Theory 28(3):437–445
Gupta KC, Kazerounian MK (1983) Synthesis of fully rotatable R-S-S-R linkages. Mech Mach Theory 18(3):199–205
Alizade RI, Sandor GN (1985) Determination of the condition of existence of complete crank rotation and of the instantaneous efficiency of spatial four-bar mechanisms. Mech Mach Theory 20(3):155–163
Rastegar J, Tu Q (1992) Approximated Grashof-type movability conditions for RSSR mechanisms with force transmission limitations. J Mech Des 114(1):74–81
Soylu R, Kanberoglu KA (1993) Analytical synthesis of mechanisms-part 2. Crank-rotatability synthesis. Mech Mach Theory 28(6):835–844
Söylemez E, Freudenstein F (1982) Transmission optimization of spatial 4-link mechanism. Mech Mach Theory 17(4):263–283
Söylemez E (1993) Transmission optimization of right-angled four-bar mechanisms. Mech Mach Theory 28(4):539–552
Soylu R (1993) Analytical synthesis of mechanisms-part 1. Transmission angle synthesis. Mech Mach Theory 28(6):825–833
Alizade RA, Freudenstein F, Pamidi PR (1976) Optimum path generation by means of the skew four-bar linkage. Mech Mach Theory 11(4):295–302
Sancibrian R, De-Juan A, Garcia P, Fernandez A, Viadero F (2007) Optimal synthesis of function generating spherical and RSSR mechanisms. 12th IFToMM world congress, Besancon (France), Hune, pp 18–21
Balaji Rao LV, Lakshminarayana K (1984) Optimal designs of the RSSR crank-rocker mechanism—I. General time ratio. Mech Mach Theory 19(4–5):431–441
Ziya Ş (1996) The RSSR mechanisms with partially constant transmission angle. Mech Mach Theory 31(6):763–769
Leonardis D, Barsotti M, Loconsole C, Solazzi M, Troncossi M, Mazzotti C, Parenti CV, Procopio C, Lamola G, Chisari C, Bergamasco M, Frisoli A (2015) An EMG-controlled robotic hand exoskeleton for bilateral rehabilitation. IEEE Trans Haptics 8(2):140–151
Loconsole C, Leonardis D, Barsotti M, Frisoli A, Solazzi M, Bergamasco M, Troncossi M, Mozaffari Foumashi M, Mazzotti C, Parenti Castelli V (2013) An EMG-based robotic hand exoskeleton for bilateral training of grasp. In: Proceedings of IEEE world haptics conference 2013, 5th joint eurohaptics conference and IEEE haptics symposium, 14–17 Apr Daejeon (Korea), pp 537–542
Buchholz B, Armstrong TJ, Goldstein SA (1992) Anthropometric data for describing the kinematics of the human hand. Ergonomics 35(3):261–273
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Mazzotti, C., Troncossi, M. & Parenti-Castelli, V. Dimensional synthesis of the optimal RSSR mechanism for a set of variable design parameters. Meccanica 52, 2439–2447 (2017). https://doi.org/10.1007/s11012-016-0584-y
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11012-016-0584-y