如何在任务引擎的流程“分流+合并”中实现“分流后新增参数”的合并?
在之前的DTD流程里,通过给task配置config.splitData来启动分流、配置events来合并分流的流程。但是也只是实现了流程层面的分流+合并,假如分流后,在每个并行流程里,往流程变数中塞入新的参数,这个新参数如何做到,在流程合并时,新参数也进行合并?
data:image/png;base64,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
data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZsAAABlCAIAAAAUFdlyAAAMg0lEQVR4Ae2dPY7iTBCG93pIQEaGCJbEkjOTLDHSks0JENHOAQjRZl9AvpIPMEfgBvuput1/xm5jBnZM80hoxdrun3qq+u3qbs/Mt9F4ygcCEIBAGgS+pWEGVkAAAhAYjacoGikqBCCQDgEULR1fMkVDAAIoGooGAQikQwBFS8eXzM8QgACKhqJBAALpEGhQtG25Pp3Xh/1stMlP5/XpnK+e/A2Pr7Uoe5v8/aM+7+nEDbkABIZJoEHRVkdRtN1mOsqWh/P6VC4H0fVsebi1J19rUfY2+XhDyyAAgX9BoEHRFvvidC622XQ0nu/O69Nx/uyK9rUWoWiDiJ8nX2fA8EoCbYqWLyQCZttSLT+9aFgdC7UUVSvTMl+J8MlHqYZcDPI79V+riW1l3fI2m+/Umvd0LiRJrNqVbthGqy+1fC1bmoLrU5nvSpVjmm6rvrVaZFqxzV18+TH5UMvGn98vbpkmIpWgaBE43ILAfQk0KFqkgcW+OBznC6tim+Wh9HfZZrtw023rKUtX2fnurHLDzUz0cbM8nAsrl9Kl2KpzthMFlILqyVlN0SIWXXULRbtCuK8iST0QeDCBXoo2rwmWBPEmtymYztTkSEF3OtCgzrKywvXysum21CtfkxYFtZmLFR1Rw61VtAcj6zt0ydH6EuN5CNxMoI+i6YMCvZD0/w0WgE65VkdPobrLuoLamD6KJsIqhxj6UxY7q6oDUDcU7ebopCAE+hLoo2jj+qKysbHVUW29qZRKbcbpfKqz7OcUzSnXbKE24/x0r7Gf/+wiivbPUNMQBHopmkqFyqXdRxuNZ6t94a86BaikY/nWT9C03GzyQ6zsFYp2NgcR+gDBHMLKxv/R61UmJwn3VDT20dyEUVvv818IDItAT0VTe/buVPFc7PYN73ao97/02WJg7WLjnUj6ZatXedfBWyNqCel25eQ41S4tg3bVmUOtZrOXd5ehiKLdBSOVQODxBHorGmltXwKsOvsS43kI3EwARQuyyJs5RgryU1ARONyCwH0JoGgPV7T7OozaIACBCAEUDUWDAATSIYCipePLyMTFLQi8CAEUDUWDAATSIYCipePLF5mEMRMCEQIoGooGAQikQwBFS8eXkYmLWxB4EQIoGooGAQikQ2CIivbf78nf3+kgfpG5ETMhMAQCg1M0ecOevzDy+B9/G0Lw0QcI3J3AEBWNvzNydzdTIQRehACKxvIWAhBIhwCKlo4vX2QSxkwIRAgMS9F+vctf6r3tTy5FjOQWBCDwIgSGpWij8ZTfJvYikYeZEHgEARSNVScEIJAOARQtHV8+YsajTgg8F4EhKhrvoz1XDNFbCAyHwOAUbTSe8jMDw4kPegKB5yIwREV7LoL0FgIQGA4BFI19NAhAIB0CKFo6vhzOPElPIPBVBFA0FA0CEEiHAIqWji+/alakXQgMhwCKhqJBAALpEEDR0vHlcOZJegKBryKAok235fp0Xh/2s9EmP53Xp3O+Mr9wcbEv5Eq5fIR7Iu0+ojlb5/XtuicNEFvJkL7Md+I148R6V+N3mc8GQcBF2sUY7BtpKNp0dZTBsNtMR9nycKlf2fLwGEXraLc+Mu8Web3aXewL0forO/MZVtl8p6YWNYXkq2y+86aWazoQ72r87jX1NzzTYq8en6dzvvC4VRcfE0sNffOaru5WYlGpv54Dqrn88uG7X2lhpfvWKybjxqJoU5WIFdtsOhqr+fw4D5BFPRE82TMIOtrtWdv1PenVbj8huJnVZnk4zheZkc5spsa/S5avsS7e1fjda+pveKbV3vnuXBxKlfhrP27yQ1k8aGps6Fhr8NTniYdgaWy9lZVM1b1iMm4viqZp6ulUBlI9JTGeUND1/KblTzyxOqplqV7ylPlKZFF/7GLHPKwTwPP6ZBRTVdjebmNY+Bd/TD7+3PLr5OLtLva5JKryKXb7WRDx2Xx7LOxd0SDXH61B4fzv5yMdZQ0lV2E49rKln8Gp6ceirr4EXXX1dNxt96AqKJmjdXGx2+dGleL2qs5LTlSlaavjercPkv1YuyaZ2m2mi03ljsNxaWk7H5X5VpJZwS6LDGV1rGaZs4N5wkLzwttbr+hIMBHbWrNdKrpEu7D9GY3jrKTb8Zg0Y6oyMP5fFK0Lk1U0mWZ9zRI3qMyiqmGxWcoDdiyJhIUDdZPfc0vuVkWLBERlUWXCbLUX/fIkfrZwkq1W675mjdWyvXbF0hi3l1WE7XBt6J6Qd+N5NJ6tjv6AMfyjC2Q7dP36Ozwo47/YbkzmOBYggQdNbPh1qu9aOMwEqQ30Hu5qVyyShVhZnMpcd2CxqeaPwEdVMuvCrKtmq2j2ix//s5rebUsnlFfUXJwMLhkL58Kb4OOx4ffhs99RtC6CEoi5zE7BoNJLVE+/9NDd5DYFM0FpTxUkvr2Jq6tdpwX/7MmGKF8dfUULe+IN0WpIX15ps8J/0v/e9Py2dCM20pAMufYtv6a7DfbK6ZBLSdpt1/1s7bmpWaVp26PJeiq5N3d9Y712tY2KfLgBIs9flA0mzou746lvUbWvUuXgF9GrciXHMLDuqpr98K57LagtDCSfw6e/o2hdcNVq8VC61aIbVFVktC+11MZc5eaLkK3q+bQL71ZPU8wFQhAswXQGYfVaYWyqweDyl29hWSHcMLqMXU1j6XJg10bjBdXAEH1XedZukLsvJs2UpaJZypnOhNHSaq/ts1pwlWrtaR/uale31dy6rcQZqBJJnTt312w7Zr+EFnlggw70qLmqEEWrkR3Mf00MrY61FKCeojcGvWwQSHI3qzvYReRgLPWi2dri5Wiz3bnYbWZueWjI2IflsNjIgbsolnaUjWevDeiaGmrQLA9y090OD3q2t/ioqRvK8Ca9cA93tKvRBYLiDLmoWbTG5rCdNV8UdzVXNlZWq946X4sHI7NOQ/JY95ozvwXmRU/CELq2FDlaFynnCVEll5OrfF72d9zWktpnMWsW4w/ZuN0d3VrGXO9qt9PB/3ofzcsFxtOF3gOu6ZeMLrPVqB+oaHSWlQwu3LFSu5Yagt5Hs5xl8+g++2ijWs16p8x6UIuF3UfLZis5NvG2h2L2Xox/F0iyEuyMnBZFM7u3mszFPlpXzReKlskpcxCTyqhqpewHYUef6zU3KFpzbHx6IPidHE9RtBjQ6gBIj1vxdLXAtLq22HhncHI4GAaHYq0qsbNorLkgsEI/Ndx6gKKpU6f6Wacsx1TQ23M3eYmpzFey+xu8kHxR3NHoLpvNtv7BsXe0J7a3n3VWPjKuqRaPZpTG70qH4x4MFtqFHDhaYa2c6+NS9npxYrfkzBtqcoKsD2oj7eqXs9wq+OIdyYuzziC6Wms2R6hBzca5foCpDlSntP71K2rWPbEH/cFGpOt2y0jx27r5O4p2P4lp0SBZ75gBdrOfKAiBFgJB/tvyzMODfDjtomiPdjYB92jCL13/Yi+vBHkbXi9NY8Sq83FzS23t0HFq1pLfPa571PzEBPyFbfiO5BMbdachQI726nMaYwACKRFA0VA0CEAgHQIoWjq+TGmmxRYI3EYARUPRIACBdAigaOn48rY5jVIQSIkAioaiQQAC6RBA0dLxZUozLbZA4DYCw1K0X78nf39Pft7pzZTbiFAKAhB4XgLDUrTRePrzffLfD/ImCEAAArcQGKKifbzdYsnzzir0HAIQuBcBFA31hAAE0iEwSEV7T4fvvWYe6oEABK4hMDhFG32fyp84+j3NOB+AAAQg0JPA4BTt5/vkgxytpxevmbt4BgKvQGCQisbJAIoGAQjcRABFY88OAhBIh8DgFO0X76PdNDW9woICGyHQSWBYisbPDHQ6jAcgAIEIgWEpWqSj3IIABCDQSQBFS2cHodPZPACB5AmgaCgaBCCQDgEULR1fJj/9YiAEOgmgaCgaBCCQDgEULR1fdk5fPACB5AmgaCgaBCCQDoEGRcveJn//yIffU5b8hIaBEEiMQIOiaQuzNxQtnYkrsajFHAi0EUDRkC0IQCAdAihaOr5sm7W4DoHXIYCioWgQgEA6BFC0dHz5OvMwlkKgjQCKhqJBAALpELhF0X6+q9c7+N3Z/CIzCEBgYARuUTT5LWZ/Jr++p6PrbRks1yEAgeci0F/R9N9qIkEb2NT0XGFHbyHwIAK9FU3/RAEJ2oP8QbUQgMBnCDQoWvynoGQTjQSNBA0CEBgkgQZF+4xAUhYCEIDAFxJA0TjfgAAE0iGAoqXjyy+cGGkaAgMhgKKhaBCAQDoEULR0fDmQSZJuQOALCaBoKBoEIJAOgf8BjdNDJNDChSwAAAAASUVORK5CYII=
本帖最后由 周云建 于 2025-3-31 13:48 编辑
目前不支持
1、不支持合并 参数
2、如果 两个分支中各新增了一个参数a 最终合并的时候只会取其中一个的流程参数 不会两个都返回
页:
[1]