TY - JOUR
T1 - Correction to
T2 - On the use of adjoint gradients for time-optimal control problems regarding a discrete control parameterization (Multibody System Dynamics, (2023), 59, 3, (313-334), 10.1007/s11044-023-09898-5)
AU - Lichtenecker, Daniel
AU - Rixen, Daniel
AU - Eichmeir, Philipp
AU - Nachbagauer, Karin
N1 - Publisher Copyright:
© 2023 The Author(s).
PY - 2023/11
Y1 - 2023/11
N2 - Equations 62–64 were correct as the formula was deemed wrong. The updated equations are as follows: (Formula presented.) (Formula presented.) (Formula presented.) The symbol (Formula presented.) in the sentence just before Eq. (66) and in Eq. (66) is changed to (Formula presented.) to avoid misunderstanding. The following paragraph contains that symbol change. Introducing the generalized velocities (Formula presented.) as additional variables transforms the second-order differential equation for (Formula presented.) into a first-order system (Formula presented.).
AB - Equations 62–64 were correct as the formula was deemed wrong. The updated equations are as follows: (Formula presented.) (Formula presented.) (Formula presented.) The symbol (Formula presented.) in the sentence just before Eq. (66) and in Eq. (66) is changed to (Formula presented.) to avoid misunderstanding. The following paragraph contains that symbol change. Introducing the generalized velocities (Formula presented.) as additional variables transforms the second-order differential equation for (Formula presented.) into a first-order system (Formula presented.).
UR - http://www.scopus.com/inward/record.url?scp=85158031493&partnerID=8YFLogxK
U2 - 10.1007/s11044-023-09913-9
DO - 10.1007/s11044-023-09913-9
M3 - Comment/debate
AN - SCOPUS:85158031493
SN - 1384-5640
VL - 59
SP - 335
EP - 336
JO - Multibody System Dynamics
JF - Multibody System Dynamics
IS - 3
ER -