Environment - simulationEnvironment: startTime=0 stopTime=2.5 tolerance=1e-06 numberOfIntervals=1000 stepSize=0.0025 Regular simulation: ./ThermofluidStream_ThermofluidStream.Undirected.Processes.Tests.TransportDelay -abortSlowSimulation -alarm=1200 -s gbode -emit_protected -lv LOG_STATS LOG_STDOUT | warning | Numerical Jacobians without coloring are currently not supported by GBODE. Colored numerical Jacobian will be used. LOG_SUCCESS | info | The initialization finished successfully without homotopy method. LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | info | GBODE: Solution of NLS failed, Try with updated Jacobian at time 0.36489. LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = -2.00143e+10 | | | | fb = f(u_max) = -2.0007e+10 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | info | GBODE: Solution of NLS failed, Try with less accuracy. LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = -2.00143e+10 | | | | fb = f(u_max) = -2.0007e+10 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_STDOUT | warning | Need to output more then one event from spatialDistribution. Step size to big! | | | | | time: 0.621127, spatialDistribution index: 3, number of events: 2 LOG_ASSERT | debug | The arguments u_min and u_max provided in the function call | | | | solveOneNonlinearEquation(f,u_min,u_max) | | | | do not bracket the root of the single non-linear equation 0=f(u): | | | | u_min = 200 | | | | u_max = 6000 | | | | fa = f(u_min) = 200143 | | | | fb = f(u_max) = 7.5181e+06 | | | | fa and fb must have opposite sign which is not the case LOG_ASSERT | debug | New end position is not bigger then previous last node. LOG_STDOUT | error | x got reinitialized during an event at time 0.392500. OpenModelica can't handle that.